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Zlamal %S Lecture Notes in Math. %V 1192 %D 1986 %I Springer %C Berlin %P 203-208 %A K.C. Chang %T Heat flow and boundary value problem for harmonic maps %J Ann. Inst. H. Poincar\'e. Anal. Non Lin\'eaire %V 6 %D 1989 %P 363-395 %A K.C. Chang %T Morse theory for harmonic maps %B Variational Methods %E H. Berestycki %E J.-M. Coron %E I. Ekeland %S Progr. Nonlinear Differential Equations Appl. %V 4 %I Birkh\"auser %C Boston %D 1990 %P 431-446 %M 93k:58068 %A K.C. Chang %T Infinite dimensional Morse theory and multiple solution problems %S Progr. Nonlinear Differential Equations Appl. %V 6 %I Birkh\"auser %C Boston %D 1993 %A K.C. Chang %A W.Y. Ding %T A result on the global existence of heat flows of harmonic maps from $D^2$ into $S^2$ %B Nematics: Mathematical and Physical Aspects %E J.-M. Coron %E J.-M. Ghidaglia %E F. H{\'e}lein %S NATO Adv. Sci. Inst. Ser. C: Math. Phys. Sci. %V 332 %I Kluwer %C Dordrecht %D 1991 %P 37-47 %A K.C. Chang %A W.Y. Ding %A R. Ye %T Finite-time blow-up of the heat flow of harmonic maps from surfaces %J J. Differential Geom. %V 36 %D 1992 %P 507-515 %A K.C. Chang %A J. Eells %T Unstable minimal surface coboundaries %J Acta Math. Sinica %V 2 %D 1986 %P 233-247 %A K.C. Chang %A J. Eells %T Harmonic maps and minimal surface coboundaries %B The Lefschetz centennial conference, Part III: proceedings on differential equations %E A. Verjovsky %S Contemp. Math. %V 58.3 %D 1987 %I Amer. Math. Soc. %C Providence, RI %P 11-18 %A S. Chang %T On minimal hypersurfaces with constant scalar curvatures in $S^4$ %J J. Differential Geom. %V 37 %D 1993 %P 523-534 %A S.P. Chang %T On polynomial k-forms between spheres %K incomplete: no details %A S.P. Chang %T On quadratic forms between spheres %K incomplete: no details %A J. Chargoy-Corona %A J.F. Glazebrook %T Nil-theta functions and harmonic maps of the $2$-torus to ${\bf C}P^2$ %K incomplete: no details %A J. Chargoy-Corona %A J.F. Glazebrook %T Nil-instantons associated with the classical torus $CP^2$ model %J Lett. Math. Phys. %V 15 %D 1988 %P 213-217 %A B. Charlet %T Le probl\`eme de Bernstein sph\'erique %D 1987 %P 221-243 %B Th\'eorie des vari\'et\'es minimales et applications %S Ast\'erisque %V 154/5 %K incomplete: no publisher %A I. Chavel %T On A. Hurwitz' method in isoperimetric inequalities %J Proc. Amer. Math. Soc. %V 71 %D 1978 %P 275-279 %A I. Chavel %T Eigenvalues in Riemannian geometry %I Academic Press %C New York, San Francisco, London %D 1984 %A J. Cheeger %T Spectral geometry of singular Riemmanian spaces %J J. Differential Geom. %V 18 %D 1983 %P 575-657 %A J. Cheeger %A D. Gromoll %T On the structure of complete manifolds of nonnegative curvature %J Ann. of Math. %V 96 %D 1972 %P 413-443 %A J. Cheeger %A W. M{\"u}ller %A R. Schrader %T On the curvature of piecewise flat spaces %J Comm. Math. Phys. %V 92 %D 1984 %P 405-454 %A B.Y. Chen %T On the total curvature of immersed manifolds, I %J Amer. J. Math. %V 93 %D 1971 %P 145-162 %A B.Y. Chen %T Submanifolds in a Euclidean hypersphere %J Proc. Amer. Math. Soc. %V 27 %D 1971 %P 627-628 %A B.Y. Chen %T On the total curvature of immersed manifolds, II %J Amer. J. Math. %V 94 %D 1972 %P 799-809 %A B.Y. Chen %T Geometry of submanifolds %I M. Dekker %D 1973 %K incomplete: no city %A B.Y. Chen %T An invariant of conformal mappings %J Proc. Amer. Math. Soc. %V 40 %D 1973 %P 563-564 %A B.Y. Chen %T On a variational problem in hypersurfaces %J J. London Math. Soc. %V 6 %D 1973 %P 321-325 %A B.Y. Chen %T On the surfaces with parallel mean curvature vector %J Indiana Univ. Math. J. %V 22 %D 1973 %P 655-666 %A B.Y. Chen %T On the total curvature of immersed manifolds, III %J Amer. J. Math. %V 95 %D 1973 %P 636-642 %A B.Y. Chen %T Some conformal invariants of submanifolds and their applications %J Boll. Un. Mat. Ital. %V 10 %D 1974 %P 380-385 %A B.Y. Chen %T Mean curvature vector of a submanifold %B Differential Geometry %E S.S. Chern %E R. Osserman %S Proc. Sympos. Pure Math. %I Amer. Math. Soc. %C Providence, RI %V 27 %D 1975 %P 119-123 %A B.Y. Chen %T Total mean curvature of immersed surfaces in $E^m$ %J Trans. Amer. Math. Soc. %V 218 %D 1976 %P 333-341 %A B.Y. Chen %T Total mean curvature and submanifolds of finite type %I World Scientific Pub. %C Singapore %D 1984 %A B.Y. Chen %T Finite type manifolds and generalizations %D 1985 %R Rome notes %A B.Y. Chen %A C.S. Houh %T On stable submanifolds with parallel mean curvature vector %J Quart. J. Math. Oxford %V 26 %D 1975 %P 229-236 %A B.Y. Chen %A P.F. Leung %A T. Nagano %T Totally geodesic submanifolds of symmetric spaces III %K incomplete: no details %A B.Y. Chen %A G.D. Ludden %T Surfaces with mean curvature vector parallel in the normal bundle %J Nagoya Math. J. %V 47 %D 1972 %P 161-167 %A B.Y. Chen %A J.-M. Morvan %T Sur la stabilit{\'e} des sous-vari{\'e}t{\'e}s minimales isotropes d'une vari{\'e}t{\'e} k{\"a}hl{\'e}rienne %J C. R. Acad. Sci. Paris %V 312 %D 1991 %P 685-688 %A B.Y. Chen %A J.M. Morvan %A T. Nore %T Energie, tension et ordre des applications \`a valeurs dans un espace euclidien %J C. R. Acad. Sci. Paris %V 301 %D 1985 %P 123-126 %A B.Y. Chen %A J.M. Morvan %A T. Nore %T Energy, tension and finite type maps %J Kodai Math. J. %V 9 %D 1986 %P 406-418 %M 87k:58067 %A B.Y. Chen %A T. Nagano %T Harmonic immersions and Gauss maps %K incomplete: no details %A B.Y. Chen %A T. Nagano %T Totally geodesic submanifolds of symmetric spaces, I %J Duke Math. J. %V 44 %D 1977 %P 745-755 %A B.Y. Chen %A T. Nagano %T Totally geodesic submanifolds of symmetric spaces, II %J Duke Math. J. %V 45 %D 1978 %P 405-425 %A B.Y. Chen %A T. Nagano %T Harmonic metrics, harmonic tensors and Gauss maps %J J. Math. Soc. Japan %V 36 %D 1984 %P 295-313 %A B.Y. Chen %A L. Vanhecke %T Differential geometry of geodesic spheres %J J. Reine Angew. Math. %V 325 %D 1981 %P 28-67 %A B.Y. Chen %A L. Vanhecke %T Isometric, holomorphic and symplectic reflections %J Geom. Dedicata %V 29 %D 1989 %P 259-277 %A B.Y. Chen %A S. Yamaguchi %T Classification of surfaces with totally geodesic Gauss image %J Indiana Univ. Math. J. %V 32 %D 1983 %P 143-154 %A B.Y. Chen %A S. Yamaguchi %T Submanifolds with totally geodesic Gauss image %J Geom. Dedicata %V 15 %D 1984 %P 313-322 %A C.C. Chen %T Total curvature and topological structure of complete minimal surfaces %J Chinese J. Math. %V 9 %D 1981 %P 23-38 %A C.C. Chen %T On the image of the generalized Gauss map of a complete minimal surface in ${\bf R}^4$ %J Pacific J. Math. %V 102 %D 1982 %P 9-14 %A C.C. Chen %A C.C. Goes %T Degenerate minimal surfaces in ${\bf R}^4$ %J Bol. Soc. Brasil. Mat. %V 14 %D 1983 %P 1-16 %A J.H. Chen %T Compact 2-harmonic hypersurface in $S^{n+1}(1)$ %J Acta Math. Sinica %V 36 %D 1993 %P 341-347 %A J.Y. Chen %T Stable harmonic maps into $S^2$ %B Geometry and Global Analysis %E T. Kotake %E S. Nishikawa %E R. Schoen %I T\^ohoku Univ. %C Sendai %D 1993 %P 431-436 %A J.Y. Chen %T On energy minimizing mappings between and into singular spaces %J Duke Math. J. %V 79 %D 1995 %P 77-99 %A J.Y. Chen %T Stable harmonic maps into the complex projective spaces %J J. Differential Geom. %V 43 %D 1996 %P 42-65 %A Q. Chen %A Y.L. Xin %T A generalized maximum principle and its applications in geometry %J Amer. J. Math. %V 114 %D 1992 %P 355-366 %A R. Chen %A X.W. Xu %T On the $m$-harmonic representatives of maps between ellipsoids %J Internat. J. Math. %K incomplete: no vol; no date; no pages %A W.H. Chen %T A class of generalized harmonic mappings %J Beijing Daxue Xuebao %D 1983 %P 10-21 %O (Chinese, English summary) %K incomplete: no vol %A W.H. Chen %T The geometry of Grassmann manifolds as submanifolds %J Adv. in Math. (Beijing) %V 16 %D 1987 %P 334-335 %A W.H. Chen %T The differential geometry of Grassmann manifolds as submanifolds %J Acta Math. Sinica %V 31 %D 1988 %P 46-53 %O (Chinese) %A W.H. Chen %T Indefinite K\"ahlerian manifolds and minimal surfaces %B Differential Geometry (Shanghai, 1991) %I World Sci. Publishing %C River Edge, NJ %D 1993 %P 7-22 %A W.H. Chen %A A. Zandi %T Notes on the classification theorem of certain harmonic maps %K incomplete: no details %A X.P. Chen %T Harmonic mappings and Gauss mappings %B Differential Geometry and Differential Equations, Shanghai--Hefei 1981 %P 51-53 %I Science Press %C Beijing %D 1981 %A X.P. Chen %T Harmonic mappings and Gauss mapping %J Chinese Ann. Math. Ser. A %V 4 %D 1983 %P 449-456 %t English summary %j Chinese Ann. Math. Ser. B %v 4 %d 1983 %p 401-402 %A X.P. Chen %T Harmonic mapping and Gauss mapping %P 51-53 %D 1984 %B Proc. 1981 Shanghai--Hefei Symp. Diff. Geom. Diff. Equ. %I Sc. Press %C Beijing %A X.P. Chen %T Some results on the Gauss mapping of an immersion and harmonic mappings %J J. Math. (Wuhan) %V 4 %D 1984 %P 121-126 %A X.P. Chen %A Y.L. Xin %T Hypersurfaces with relatively affine Gauss map into the sphere %J Acta Math. Sinica %K incomplete: no vol; no date; no pages %A Y.G. Chen %A Y. Giga %A S. Goto %T Uniqueness and existence of viscosity solutions of generated mean curvature flow equation %J J. Differential Geom. %V 33 %D 1991 %P 749-786 %A Y.M. Chen %T Evolution problems of harmonic maps in higher dimensions %B Qualitative aspects and applications of nonlinear evolution equations (Trieste, 1990) %I World Scientific %C Singapore %P 36-42 %A Y.M. Chen %T The weak solutions to the evolution problems of harmonic maps %J Math. Z. %V 201 %D 1989 %P 69-74 %A Y.M. Chen %T Dirichlet problems for heat flows of harmonic maps in higher dimensions %J Math. Z. %V 208 %D 1991 %P 557-565 %A Y.M. Chen %A W.Y. Ding %T Blow up and global existence for heat flows of harmonic maps %J Invent. Math. %V 99 %D 1990 %P 567-578 %A Y.M. Chen %A W.Y. Ding %T Blow-up analysis for heat flow of harmonic maps %B Nematics: Mathematical and Physical Aspects %E J.-M. Coron %E J.-M. Ghidaglia %E F. H{\'e}lein %S NATO Adv. Sci. Inst. Ser. C: Math. Phys. Sci. %V 332 %I Kluwer %C Dordrecht %D 1991 %P 49-64 %M 93k:58063 %A Y.M. Chen %A J. Gao %T Harmonic maps in three dimensional Minkowski space with image near geodesics %K incomplete: no details %A Y.M. Chen %A J.M. Gao %T A remark on harmonic maps in three-dimensional Minkowski space %J C. R. Math. Rep. Acad. Sci. Canada %V 15 %D 1993 %P 79-84 %A Y.M. Chen %A M.C. Hong %T Heat flow of $p$-harmonic maps with values into spheres %J Math. Z. %V 215 %D 1994 %P 25-35 %A Y.M. Chen %A J.Y. Li %A F.H. Lin %T Partial regularity for weak heat flows into spheres %K incomplete: no details %A Y.M. Chen %A F.H. Lin %T Evolution equations with a free boundary condition %K incomplete: no details %A Y.M. Chen %A F.H. Lin %T Evolution of harmonic maps with Dirichlet boundary conditions %J Comm. Anal. Geom. %V 1 %D 1993 %P 327-346 %A Y.M. Chen %A F.H. Lin %T Remarks on approximate harmonic maps %J Comment. Math. Helv. %V 70 %D 1995 %P 161-169 %A Y.M. Chen %A R. Musina %T Le flot d'applications harmoniques d'une vari\'et\'e compacte sur une vari\'et\'e \`a bord %J C. R. Acad. Sci. Paris %V 309 %D 1989 %P 499-501 %A Y.M. Chen %A R. Musina %T Harmonic mappings into manifolds with boundary %J Ann. Scuola Norm. Sup. Pisa Cl. Sci. %V 17 %D 1990 %P 365-392 %A Y.M. Chen %A M. Struwe %T Existence and partial regularity results for the heat flow for harmonic maps %J Math. Z. %V 201 %D 1989 %P 83-103 %A Y. Chen %A M.C. Hong %A N. Hungerb{\"u}hler %T Heat flow of $p$-harmonic maps with values into spheres %J Math. Z. %V 215 %D 1994 %P 25-35 %A Z.H. Chen %A S.Y. Cheng %A L.Q. Keng %T On the Schwarz lemma for complete K\"ahler manifolds %J Sci. Sinica %V 22 %D 1979 %P 1238-1247 %A Z.H. Chen %A H.C. Yang %T A Schwarz lemma for a complete manifold whose Ricci curvature is bounded from below %J Acta Math. Sinica %V 24 %D 1981 %P 945-952 %A Z.H. Chen %A H.C. Yang %T Estimations of decreasing coefficients on $K$-dilatation harmonic maps %J Kexue Tongbao %V 28 %D 1983 %P 879-882 %A Z.H. Chen %A H.C. Yang %T On the Schwarz lemma for complete Hermitian manifolds %B Several Complex Variables (Hangzhou 1981) %E J.J. Kohn %E Q.K. Lu %E R. Remmert %E Y.T. Siu %D 1984 %P 99-116 %I Birkh\"auser %C Boston %A Z.H. Chen %A H.C. Yang %T A class of Liouville theorems %J Acta Math. Sinica %V 28 %D 1985 %P 218-232 %A Q.M. Cheng %T Complete minimal hypersurfaces in $S^4(1)$ with constant scalar curvature %J Osaka J. Math. %V 27 %D 1990 %P 885-892 %A Q.M. Cheng %T Complete totally real minimal submanifolds in complex projective space %J Mem. Fac. Sci. Kyushu Univ. Ser. A %V 46 %D 1992 %P 93-103 %A Q.M. Cheng %A Q.R. Wan %T Hypersurfaces of space forms $M^4(c)$ with constant mean curvature %B Geometry and Global Analysis %E T. Kotake %E S. Nishikawa %E R. Schoen %I T\^ohoku Univ. %C Sendai %D 1993 %P 437-442 %A Q.M. Cheng %A Y.D. Wang %T Complete Riemannian manifold minimally immersed in a unit sphere $S^{n+p}(1)$ %J Tsukuba J. Math. %V 13 %D 1989 %P 107-112 %A Q.Y. Cheng %A Y.X. Dong %T On factorization theorems of pluriharmonic maps into the unitary group %R preprint %A Q.Y. Cheng %A Y.X. Dong %T Some remarks on harmonic morphisms %J Chinese Sci. Bull. %V 41 %D 1996 %P 1825-1828 %A S.Y. Cheng %T A characterization of the $2$-sphere by eigenfunctions %J Proc. Amer. Math. Soc. %V 55 %D 1976 %P 379-381 %A S.Y. Cheng %T Liouville theorem for harmonic maps %B Geometry of the Laplace Operator %E R. Osserman %E A. Weinstein %S Proc. Sympos. Pure Math. %V 36 %D 1980 %P 147-151 %I Amer. Math. Soc. %C Providence, R.I. %A S.Y. Cheng %T The Dirichlet problem at infinity for non-positively curved manifolds %J Comm. Anal. Geom. %V 1 %D 1993 %P 101-102 %A S.Y. Cheng %A P. Li %A S.T. Yau %T Heat equations on minimal submanifolds and their applications %J Amer. J. Math. %V 106 %D 1984 %P 1033-1065 %A S.Y. Cheng %A L.F. Tam %A T.Y.H. Wan %T Harmonic maps with finite total energy %J Proc. Amer. Math. Soc. %V 124 %D 1996 %P 275-284 %A S.Y. Cheng %A J. Tysk %T An index characterization of the catenoid and index bounds for minimal surfaces in $R^4$ %J Pacific J. Math. %V 134 %D 1988 %P 251-??? %A S.Y. Cheng %A S.T. Yau %T Differential equations on Riemannian manifolds and their geometric applications %J Comm. Pure Appl. Math. %V 28 %D 1975 %P 333-354 %A S.Y. Cheng %A S.T. Yau %T Maximal space-like hypersurfaces in the Lorentz--Minkowski space %J Ann. of Math. %V 104 %D 1976 %P 407-419 %A X. Cheng %T Estimate of the singular set of the evolution problem for harmonic maps %J J. Differential Geom. %V 34 %D 1991 %P 169-174 %A S.S. Chern %T Complex analytic mappings of Riemann surfaces, I %J Amer. J. Math. %V 82 %D 1960 %P 323-337 %A S.S. Chern %T Holomorphic mappings of complex manifolds %J Enseign. Math. %V 7 %D 1961 %P 179-187 %A S.S. Chern %T Minimal surfaces in an euclidean space of $N$ dimensions %B Differential and Combinatorial Topology, Symposium in Honor of Marston Morse %I Princeton Univ. Press %C Princeton %D 1965 %P 187-198 %A S.S. Chern %T On the curvature of a piece of hypersurface in Euclidean space %J Abh. Math. Sem. Univ. Hamburg %V 29 %D 1965 %P 77-91 %A S.S. Chern %T On holomorphic mappings of Hermitian manifolds of the same dimension %S Proc. Sympos. Pure Math. %V 11 %I Amer. Math. Soc. %C Providence, R.I. %D 1968 %P 157-170 %B Entire Functions and related parts of Analysis %E S.S. Chern %E L. Ehrenpreis %E J. Korevaar %E W.H.J. Fuchs %E L.A. Rubel %A S.S. Chern %T Simple proofs of two theorems on minimal surfaces %J Enseign. Math. %V 15 %D 1969 %P 53-61 %A S.S. Chern %T On minimal spheres in the four-sphere %B Studies and essays presented to Y.W. Chen, Taiwan %D 1970 %P 137-150 %K incomplete: no publisher %A S.S. Chern %T On the minimal immersions of the two-sphere in a space of constant curvature %B Problems in Analysis, Symposium in honor of Solomon Bochner %I Princeton Univ. Press. %C Princeton %D 1970 %P 27-40 %A S.S. Chern %A S.I. Goldberg %T On the volume decreasing property of a class of real harmonic mappings %J Amer. J. Math. %V 97 %D 1975 %P 133-147 %A S.S. Chern %A R. Osserman %T Complete minimal surfaces in Euclidean $n$-space %J J. Analyse Math. %V 19 %D 1967 %P 15-34 %A S.S. Chern %A R. Osserman %T Remarks on the Riemannian metric of a minimal submanifold %S Lecture Notes in Math. %V 894 %D 1981 %P 49-90 %I Springer %C Berlin, Heidelberg, New York %B Geom. Symp. Utrecht, 1980 %A S.S. Chern %A J.G. Wolfson %T Minimal surfaces by moving frames %J Amer. J. Math. %V 105 %D 1983 %P 59-83 %A S.S. Chern %A J.G. Wolfson %T Harmonic maps of $S^2$ into a complex Grassmann manifold %J Proc. Nat. Acad. Sci. U.S.A. %V 82 %D 1985 %P 2217-2219 %A S.S. Chern %A J.G. Wolfson %T Harmonic maps of the two-sphere into a complex Grassmann manifold. II %J Ann. of Math. %V 125 %D 1987 %P 301-335 %A L.F. Cheung %T The non-existence of some noncompact constant mean curvature surfaces %J Proc. Amer. Math. Soc. %V 121 %D 1994 %P 1207-1209 %A L.F. Cheung %A P.F. Leung %T Some results on stable $p$-harmonic maps %J Glasgow Math. J. %V 36 %D 1994 %P 77-80 %A L.F. Cheung %A P.F. Leung %T A remark on convex functions and p-harmonic maps %J Geom. Dedicata %V 56 %D 1995 %P 269-270 %A D.P. Chi %A G.H. Park %T Weak-stability of $x/\Vert x\Vert$ and symmetries of liquid crystals %J J. Korean Math. Soc. %V 29 %D 1992 %P 251-260 %A Q.-S. Chi %A L. Fernandez %A H. Wu %T Normalized potentials of minimal surfaces in spheres %R Preprint %D 1996 %A Q.S. 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Sinica %D 1987 %A M. Ji %T An apriori estimate for Douglas problem in Riemannian manifolds %D 1989 %P 235-249 %J Acta Math. Sinica (N.S.) %K incomplete: no vol %A M. Ji %T Minimal surfaces of Riemannian manifolds %J Chinese Sci. Bull. %V 34 %D 1989 %P 444-447 %A M. Ji %T A remark on perturbation method %D 1989 %P 628-631 %J Acta Math. Sinica %V 32 %A M. Ji %A G.Y. Wang %T Generalized Ljusternik--Schnirelmann theories for Lie group actions with an application to the Plateau problem %K incomplete: no details %A M. Ji %A G.Y. Wang %T Minimal surfaces in Riemannian manifolds %S Mem. Amer. Math. Soc. %I Amer. Math. Soc. %C Providence, RI %V 495 %D 1993 %A G.Y. Jiang %T Harmonic and totally geodesic mappings %J Chinese Ann. Math. Ser. A %V 4 %D 1983 %P 577-586 %O (Chinese) %t English summary %j Chinese Ann. Math. Ser. B %v 4 %d 1983 %p 526 %M 85i:53060 %A G.Y. Jiang %T Curvature restrictions on a minimal submanifold with constant curvature immersed in a manifold with constant positive curvature %J J. Fudan Univ. Natur. Sci. %V 23 %D 1984 %P 171-178 %M 86g:53067 %O (Chinese with English summary) %A G.Y. Jiang %T Relatively harmonic mappings and variations of smooth mappings %J Chinese Ann. Math. Ser. A %V 6 %D 1985 %P 103-114 %O (Chinese) %t English summary %j Chinese Ann. Math. Ser. B %v 6 %d 1985 %p 128-129 %M 87a:58050 %A G.Y. Jiang %T $2$-harmonic isometric immersions between Riemannian manifolds %J Chinese Ann. Math. Ser. A %V 7 %D 1986 %P 130-144 %O (Chinese) %t English summary %j Chinese Ann. Math. Ser. B %v 7 %d 1986 %p 255 %M 87k:53140 %A G.Y. Jiang %T $2$-harmonic maps and their first and second variational formulas %J Chinese Ann. Math. Ser. A %V 7 %D 1986 %P 389-402 %O (Chinese) %t English summary %j Chinese Ann. Math. Ser. B %v 7 %d 1986 %p 523 %M 88i:58039 %A G.Y. Jiang %T The conservation law for $2$-harmonic maps between Riemannian manifolds %J Acta Math. Sinica %V 30 %D 1987 %P 220-225 %M 88k:58028 %O (Chinese) %A G.Y. Jiang %T Some nonexistence theorems on $2$-harmonic and isometric immersions in Euclidean space %J Chinese Ann. Math. Ser. A %V 8 %D 1987 %P 377-383 %O (Chinese) %t English summary %j Chinese Ann. Math. Ser. B %v 8 %d 1987 %p 389 %M 89a:53071 %A G.Y. Jiang %T Identity maps and harmonic maps %O (Chinese) %J Chinese Ann. Math. Ser. A %V 17 %D 1996 %P 285--294 %A Z. Jin %T Liouville theorem for harmonic maps %J Invent. Math. %K incomplete: no vol; no date; no pages %A Z. Jin %A J.L. Kazdan %T On the rank of harmonic maps %J Math. Z. %V 207 %D 1991 %P 535-537 %A G.D. Johnson %T An intrinsic characterization of a class of minimal surfaces in constant curvature manifolds %J Pacific J. Math. %V 113 %D 1991 %P 1041-1044 %A P.W. Jones %T A complete bounded complex submanifold of ${\bf C}^3$ %J Proc. Amer. Math. Soc. %V 76 %D 1979 %P 305-306 %A L. Jorge %A W.H. Meeks %T The topology of complete minimal surfaces of finite total Gaussian curvature %J Topology %V 22 %D 1983 %P 203-221 %A L. Jorge %A F. Mercuri %T Minimal immersions into space forms with two principal curvatures %J Math. Z. %V 187 %D 1984 %P 325-333 %A L. Jorge %A F. Xavier %T A complete minimal surface in ${\bf R}^3$ between two parallel planes %J Ann. of Math. %V 12 %D 1980 %P 204-206 %A L. Jorge %A F. Xavier %T An inequality between the exterior diameter and the mean curvature of bounded immersion %J Math. Z. %V 178 %D 1981 %P 77-82 %A J. Jost %T Generalized harmonic maps between metric spaces %K incomplete: no details %A J. Jost %T Strings with boundary: A quantization of Plateau's problem %K incomplete: no details %A J. Jost %T Eine geometrische Bemerkung zur S\"atzen \"uber harmonische Abbildungen, die ein Dirichletproblem l\"osen %J Manuscripta Math. %V 32 %D 1980 %P 51-57 %A J. Jost %T Eindeutigkeit harmonischer Abbildungen zwischen Riemannschen Fl\"achen %S Bonner Math. Schriften %V 129 %I Univ. Bonn %C Bonn %D 1981 %A J. Jost %T Ein Existenzbeweis f\"ur harmonische Abbildungen, die ein Dirichletproblem l\"osen, mittels der Methode des W\"armeflusses %J Manuscripta Math. %V 34 %D 1981 %P 17-25 %A J. Jost %T Univalency of harmonic mappings between surfaces %J J. Reine Angew. Math. %V 324 %D 1981 %P 141-153 %A J. Jost %T A maximum principle for harmonic mappings which solve a Dirichlet problem %J Manuscripta Math. %V 38 %D 1982 %P 129-130 %A J. Jost %T Existence proofs for harmonic mappings with the help of a maximum principle %J Math. Z. %V 184 %D 1983 %P 489-496 %A J. Jost %T Harmonic mappings between Riemannian manifolds %I A.N.U. Press %C Canberra %B Proc. Centre Math. Analysis %D 1983 %A J. Jost %T The Dirichlet problem for harmonic maps from a surface with boundary onto a $2$-sphere with nonconstant boundary values %J J. Differential Geom. %V 19 %D 1984 %P 393-401 %A J. Jost %T Global Variationsmethoden in der Theorie der harmonischen und konformen Abbildungen in zwei Dimensionen nebst Anwendungen auf Minimalfl\"achers %R Bonn Habitat. Thesis %D 1984 %A J. Jost %T Harmonic maps between surfaces %S Lecture Notes in Math. %V 1062 %D 1984 %I Springer %C Berlin, Heidelberg, New York %A J. Jost %T Conformal mappings and the Plateau--Douglas problem in Riemannian manifolds %J J. Reine Angew. Math. %V 359 %D 1985 %P 37-54 %A J. Jost %T Lectures on harmonic maps %S Lecture Notes in Math. %V 1161 %D 1985 %I Springer %C Berlin, Heidelberg, New York %B Harmonic Mappings and Minimal Immersions, Montecatini 1984 %E E. Giusti %P 118-192 %A J. Jost %T A note on harmonic maps between surfaces %J Ann. Inst. H. Poincar\'e. Anal. Non Lin\'eaire %V 2 %D 1985 %P 397-405 %A J. Jost %T Existence results for embedded minimal surfaces of controlled topological type, I %J Ann. Scuola Norm. Sup. Pisa Cl. Sci. %V 13 %D 1986 %P 15-50 %A J. Jost %T Existence results for embedded minimal surfaces of controlled topological type, II %J Ann. Scuola Norm. Sup. Pisa Cl. Sci. %V 13 %D 1986 %P 401-426 %A J. Jost %T On the existence of harmonic maps from a surface into the real projective plane %J Compositio Math. %V 59 %D 1986 %P 15-19 %A J. Jost %T On the regularity of minimal surfaces with free boundaries in Riemannian manifolds %J Manuscripta Math. %V 56 %D 1986 %P 279-291 %A J. Jost %T Two-dimensional geometric variational problems %B Proc. Internat. Congress of Math. (Berkeley, Calif. 1986) %I Amer. Math. Soc. %C Providence RI %D 1986 %P 1180-1189 %M 89g:58045 %A J. Jost %T Continuity of minimal surfaces with piecewise smooth free boundaries %J Math. Ann. %V 276 %D 1987 %P 599-614 %A J. Jost %T Existence results for embedded minimal surfaces of controlled topological type, III %J Ann. Scuola Norm. Sup. Pisa Cl. Sci. %V 14 %D 1987 %P 165-167 %A J. Jost %T On the existence of embedded minimal surfaces of higher genus with free boundaries in Riemannian manifolds %B Variational methods for free surface interfaces %E P. Concus %E R. Finn %I Springer %C Berlin, Heidelberg, New York %D 1987 %P 65-75 %A J. Jost %T Embedded minimal disks with a free boundary on a polyhedron in ${\bf R}^3$ %J Math. Z. %V 199 %D 1988 %P 311-320 %A J. Jost %T Das Existenzproblem f\"ur Minimalfl\"achen %J J. Deutsch. Math. Verein. %V 91 %D 1988 %P 1-32 %A J. Jost %T The geometric calculus of variations: A short survey and a list of open problems %J Exposition. Math. %V 6 %D 1988 %P 111-143 %A J. Jost %T Harmonic maps -- Analytic theory and geometric significance %B Partial differential equations and the calculus of variations %E S. Hildebrandt %E R. Leis %S Lecture Notes in Math. %V 1357 %D 1988 %P 264-296 %K incomplete: no publisher %A J. Jost %T Nonlinear methods in Riemannian and K\"ahlerian geometry %S DMV Sem. %V 10 %D 1988 %I Birkh\"auser %K incomplete: no city %A J. Jost %T Embedded minimal surfaces in manifolds diffeomorphic to the three-dimensional ball or sphere %J J. Differential Geom. %V 30 %D 1989 %P 555-577 %A J. Jost %T A nonparametric proof of the theorem of Lusternik and Schnirelmann %J Arch. Math. (Basel) %V 53 %D 1989 %P 497-505 %O (Correction in Arch. Math. 56 (1991) 624) %A J. Jost %T Harmonic maps and curvature computations in Teichm\"uller theory %J Ann. Acad. Sci. Fenn. Ser. A I Math. %V 16 %D 1991 %P 13-46 %A J. Jost %T Two-dimensional geometric variational problems %I Wiley %D 1991 %K incomplete: no city %A J. Jost %T Minimal Surfaces and Teichm{\"u}ller Theory %D 1993 %S Vorlesungsreihe SFB 256 %V 1993:31 %I Universit{\"a}t Bonn %C Bonn %A J. Jost %T Unstable solutions of two dimensional geometric variational problems %B Differential Geometry %E R.E. Greene %E S.T. Yau %S Proc. Sympos. Pure Math. %V 54 %I Amer. Math. Soc. %C Providence RI %D 1993 %P 205-244 %A J. Jost %T Equilibrium maps between metric spaces %J Calc. Var. Partial Differential Equations %V 2 %D 1994 %P 173-204 %A J. Jost %T Convex functionals and generalized harmonic maps into spaces of non positive curvature %J Comment. Math. Helv. %V 70 %D 1995 %P 659-673 %A J. Jost %T Orientable and nonorientable minimal surfaces %B World Congress of Nonlinear Analysts '92, Vol. I-IV (Tampa, FL, 1992) %P 819-826 %I de Gruyter %C Berlin %D 1996 %A J. Jost %T Generalized Dirichlet forms and harmonic maps %J Calc. Var. Partial Differential Equations %V 5 %D 1997 %P 1--19 %A J. Jost %A H. Karcher %T Geometrische Methoden zur Gewinnung von a priori-Schranken f\"ur harmonische Abbildungen %J Manuscripta Math. %V 40 %D 1982 %P 27-77 %A J. Jost %A H. Karcher %T Almost linear functions and a priori estimates for harmonic maps %P 148-155 %B Global Riemannian Geometry %E T.J. Willmore %E N.J. Hitchin %S Ellis Horwood Ser. Math. Appl. %D 1984 %I E. Horwood %C Chichester %A J. Jost %A X.Q. Li-Jost %A X.W. Peng %T Correction to "Bifurcation of minimal surfaces in Riemannian manifolds" %J Trans. Amer. Math. Soc. %O (to appear) %K incomplete: no vol; no date; no pages %A J. Jost %A X.Q. Li-Jost %A X.W. Peng %T Bifurcation of minimal surfaces in Riemannian manifolds %J Trans. Amer. Math. Soc. %V 347 %D 1995 %P 51-62 %A J. Jost %A M. Meier %T Boundary regularity for minima of certain quadratic functionals %J Math. Ann. %V 262 %D 1983 %P 549-561 %A J. Jost %A X.W. Peng %T The geometry of moduli spaces of stable vector bundles over Riemann surfaces %R SFB237 Bochum %A J. Jost %A X.W. Peng %T Group actions, gauge transformations and the calculus of variations %R SFB237 Bochum %A J. Jost %A R. Schoen %T On the existence of harmonic diffeomorphisms between surfaces %J Invent. Math. %V 66 %D 1982 %P 353-359 %A J. Jost %A M. Struwe %T Morse--Conley theory for minimal surfaces of varying topological type %J Invent. Math. %V 102 %D 1990 %P 465-499 %A J. Jost %A C.J. Xu %T Subelliptic harmonic maps %J Trans. Amer. Math. Soc. %O (to appear) %K incomplete: no vol; no date; no pages %A J. Jost %A S.T. Yau %T Harmonic mappings and K\"ahler manifolds %J Math. Ann. %V 262 %D 1983 %P 145-166 %A J. Jost %A S.T. Yau %T A strong rigidity theorem for a certain class of compact complex analytic surfaces %J Math. Ann. %V 271 %D 1985 %P 143-152 %A J. Jost %A S.T. Yau %T The strong rigidity of locally symmetric complex manifolds of rank one and finite volume %J Math. Ann. %V 275 %D 1986 %P 291-304 %A J. Jost %A S.T. Yau %T On the rigidity of certain discrete groups and algebraic varieties %J Math. Ann. %V 278 %D 1987 %P 481-496 %A J. Jost %A S.T. Yau %T Harmonic maps and group representations %B Differential Geometry %S Pitman Monographs Surveys Pure Appl. Math. %V 52 %I Longman Sci. %C Harlow %D 1991 %P 241-260 %A J. Jost %A S.T. Yau %T Harmonic maps and K\"ahler geometry %B Prospects in complex geometry. Katata Symp. (1989) %S Lecture Notes in Math. %I Springer %C Berlin, Heidelberg, New York %V 1468 %D 1991 %P 340-370 %A J. Jost %A S.T. Yau %T Applications of quasilinear PDE to algebraic geometry and arithmetic lattices %B Algebraic geometry and related topics (Inchon, 1992) %S Conf. Proc. Lecture Notes Algebraic Geom. %V 1 %I Internat. Press %C Cambridge, MA %D 1993 %P 169-193 %A J. Jost %A S.T. Yau %T Harmonic mappings and algebraic varieties over function fields %J Amer. J. Math. %V 115 %D 1993 %P 1197-1227 %A J. Jost %A S.T. Yau %T Harmonic maps and superrigidity %P 245-280 %B Differential Geometry %E R.E. Greene %E S.T. Yau %S Proc. Sympos. Pure Math. %V 54 %I Amer. Math. Soc. %C Providence RI %D 1993 %A J. Jost %A S.T. Yau %T A nonlinear elliptic system for maps from Hermitian to Riemannian manifolds and rigidity theorems in Hermitian geometry %J Acta Math. %V 170 %D 1993 %P 221-254 %A J. Jost %A S.T. Yau %T A nonlinear elliptic system for maps from Hermitian to Riemannian manifolds and rigidity theorems in Hermitian geometry (correction) %J Acta Math. %V 173 %D 1994 %P 307 %A J. Jost %A K. Zuo %T Harmonic maps into Tits buildings and factorization of non rigid arithmetic representations of $\Pi_1$ of algebraic varieties %K incomplete: no details %A J. Jost %A K. Zuo %T Harmonic maps of infinite energy and rigidity results for archimedean and nonarchimedean representations of fundamental groups of quasiprojective varieties %R preprint %A J. Jost %A K. Zuo %T Harmonic maps of infinite energy and rigidity results for quasiprojective varieties %J Math. Res. Lett. %V 1 %D 1994 %P 631-638 %A J. Jost %A K. Zuo %T Harmonic maps and $Sl(r,{\bf C})$-representations of fundamental groups of quasiprojective manifolds %J J. Algebraic Geom. %V 5 %D 1996 %P 77-106 %A S.H. Jun %T Curvature estimates for minimal surfaces %J Proc. Amer. Math. Soc. %V 114 %D 1992 %P 527-533 %A W. 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Ann. %V 129 %D 1955 %P 330-344 %A K.Duggal %A S.Ianus %A A.M.Pastore %T Harmonic maps on $f$-manifold with semi-Riemannian metrics %B Proceedings of the Conference on Geometry and Topology, Sept.26-29, 1993, Cluj-Napoca Univ., Romania %D 1994 %P 47-55 %K incomplete: no publisher %A M. Kalka %T Deformation of submanifolds of strongly negatively curved manifolds %J Math. Ann. %V 251 %D 1980 %P 243-248 %A M. Kalka %T Harmonic maps in K\"ahler geometry and deformation theory %P 75-86 %B Harmonic Maps %E R.J. Knill %E M. Kalka %E H.C.J. Sealey %S Lecture Notes in Math. %V 949 %D 1982 %I Springer %C Berlin, Heidelberg, New York %A F.W. Kamber %A E.A. Ruh %A P. Tondeur %T Comparing Riemannian foliations with transversally symmetric foliations %R Preprint %A F.W. Kamber %A E.A. Ruh %A P. Tondeur %T Almost transversally symmetric foliations %P 184-189 %B Differential Geometry, Pe\~niscola 1985 %E A.M. Naveira %E A. Ferr{\'a}ndez %E F. Mascar{\'o} %S Lecture Notes in Math. %V 1209 %D 1986 %I Springer %C Berlin, Heidelberg, New York %A F.W. Kamber %A P. Tondeur %T The second variation formula for harmonic foliations %K incomplete: no details %A F.W. Kamber %A P. Tondeur %T Feuilletages harmoniques %J C. R. Acad. Sci. Paris %V 291 %D 1980 %P 409-411 %A F.W. Kamber %A P. Tondeur %T Dualit\'e de Poincar\'e pour les feuilletages harmoniques %J C. R. Acad. Sci. Paris %V 294 %D 1982 %P 357-359 %A F.W. Kamber %A P. Tondeur %T Harmonic foliations %P 87-121 %B Harmonic Maps %E R.J. Knill %E M. Kalka %E H.C.J. Sealey %S Lecture Notes in Math. %V 949 %D 1982 %I Springer %C Berlin, Heidelberg, New York %A F.W. Kamber %A P. Tondeur %T Infinitesimal automorphisms and second variation of the energy for harmonic foliations %J T\^ohoku Math. J. %V 34 %D 1982 %P 525-538 %A F.W. Kamber %A P. Tondeur %T Duality for Riemannian foliations %S Proc. Sympos. Pure Math. %B Singularities %E P. Orlik %I Amer. Math. Soc. %C Providence, R.I. %V 40 %D 1983 %P 609-618 %A F.W. Kamber %A P. Tondeur %T Foliations and metrics %B Proc. of the 1981-82 year in differential geometry, University of Maryland %I Birkh\"auser %S Progr. Math. %V 32 %D 1983 %P 103-152 %K incomplete: no city %A F.W. Kamber %A P. Tondeur %T The index of harmonic foliations on spheres %J Trans. Amer. Math. Soc. %V 275 %D 1983 %P 257-263 %A F.W. Kamber %A P. Tondeur %T Curvature properties of harmonic foliations %J Illinois J. Math. %V 28 %D 1984 %P 458-471 %A F.W. Kamber %A P. Tondeur %T Duality theorems for foliations %J Ast{\'e}risque %V 116 %D 1984 %P 108-116 %A F.W. Kamber %A P. Tondeur %T The Bernstein problem for foliations %B Global differential geometry and global analysis 1984 %E D. Ferus %E R.B. Gardner %E S. Helgason %E U. Simon %S Lecture Notes in Math. %V 1156 %D 1985 %C Berlin, Heidelberg, New York %I Springer %P 216-218 %A F.W. Kamber %A P. Tondeur %A G. Toth %T Transversal Jacobi fields for harmonic foliations %J Michigan Math. J. %V 34 %D 1987 %P 261-266 %A T.H. Kang %A J.S. Pak %T On the spectal geometry for the Jacobi operators of harmonic maps into a quaternionic projective space %J Geom. Dedicata %V 60 %D 1996 %P 153-161 %A N. Kapouleas %T Constant mean curvature surfaces in Euclidean three-space %J Bull. Amer. Math. Soc. %V 17 %D 1987 %P 318-320 %A N. Kapouleas %T Complete constant mean curvature surfaces in Euclidean three-space %J Ann. of Math. %V 131 %D 1990 %P 239-330 %A N. Kapouleas %T Compact constant mean curvature surfaces in Euclidean three-space %J J. Differential Geom. %V 33 %D 1991 %P 683-715 %A N. Kapouleas %T Constant mean curvature surfaces constructed by fusing Wente tori %J Invent. Math. %V 119 %D 1995 %P 443-518 %A H. Karcher %T Families of triply-periodic surfaces of constant mean curvature %K incomplete: no details %A H. Karcher %T New examples of periodic minimal surfaces %K incomplete: no details %A H. Karcher %T Embedded minimal surfaces derived from Scherk's examples %J Manuscripta Math. %V 62 %D 1988 %P 83-114 %A H. Karcher %T Construction of minimal surfaces %D 1989 %R Vorles. 12 Bonn %A H. Karcher %T The triply-periodic minimal surfaces of Alan Schoen and their constant mean curvature companions %J Manuscripta Math. %V 64 %D 1989 %P 291-357 %A H. Karcher %A U. Pinkall %A I. Sterling %T New minimal surfaces in $S^3$ %J J. Differential Geom. %V 28 %D 1988 %P 169-185 %A H. Karcher %A J.C. Wood %T Non-existence results and growth properties for harmonic maps and forms %J J. Reine Angew. Math. %V 353 %D 1984 %P 165-180 %A L. Karp %T On Stokes' theorem for noncompact manifolds %J Proc. Amer. Math. Soc. %V 82 %D 1981 %P 487-490 %A L. Karp %T Subharmonic functions, harmonic mappings, and isometric immersions %P 133-142 %B Seminar on Differential Geometry %E S.T. Yau %S Ann. of Math. Stud. %V 102 %D 1982 %I Princeton Univ. Press %C Princeton %A L. Karp %T Subharmonic functions on real and complex manifolds %J Math. Z. %V 179 %D 1982 %P 535-554 %A L. Karp %T The growth of harmonic functions and mappings %D 1983 %B Diff. Geo. Proc. Special Year 1981-2. Maryland %S Progr. Math. %V 32 %I Birkh\"auser %C Boston %P 153-161 %A L. Karp %T Differential inequalities on complete Riemannian manifolds and applications %J Math. Ann. %V 272 %D 1985 %P 449-459 %A A. Kasue %T Measured Hausdorff convergence of Riemannian manifolds %R preprint %A A. Kasue %T On Riemannian manifolds admitting certain convex functions %J Osaka J. Math. %V 18 %D 1981 %P 577-582 %A A. Kasue %T Estimates for solutions of Poisson equation and their applications to submanifolds %B Differential geometry of submanifolds %E K. Kenmotsu %S Lecture Notes in Math. %I Springer %C Berlin, Heidelberg, New York %V 1090 %D 1984 %P 1-14 %A A. Kasue %T Gap theorems for minimal submanifolds of Euclidean space %J J. Math. Soc. Japan %V 38 %D 1986 %P 473-492 %A A. Kasue %T A compactification of a manifold with asymptotically nonnegative curvature %J Ann. Sci. \'Ecole Norm. Sup. %V 21 %D 1988 %P 593-622 %A A. Kasue %T Harmonic functions with growth conditions on a manifold with asymptotically nonnegative curvature I %D 1988 %V 1339 %B Geometry and analysis on manifolds %E T. Sunada %S Lecture Notes in Math. %I Springer %C Berlin, Heidelberg, New York %P 158-181 %A A. Kasue %T Harmonic functions with growth conditions on a manifold with asymptotically nonnegative curvature II %J Adv. Stud. Pure Math. %D 1990 %V 18-I %P 283-301 %A A. Kasue %T Harmonic functions of polynomial growth on complete manifold %P 281-290 %B Differential geometry %E R.E. Greene %E S.T. Yau %S Proc. Sympos. Pure Math %I Amer. Math. Soc. %C Providence R.I. %V 54:1 %D 1993 %A A. Kasue %A T. Washio %T Growth of equivariant harmonic maps and harmonic morphisms %J Osaka J. Math. %V 27 %D 1990 %P 899-928 %A A. Kasue %A T. Washio %T Errata to Growth of equivariant harmonic maps and harmonic morphisms %J Osaka J. Math. %V 29 %D 1992 %P 419-420 %A Y. Katsurada %T Generalized Minkowski formulas for closed hypersurfaces in Riemann space %J Ann. Mat. Pura Appl. %V 57 %D 1962 %P 283-293 %A H. Kaul %T Ein Einschlossungssatz f\"ur $H$-Fl\"achen in Riemannschen Mannigfaltigkeiten %J Manuscripta Math. %V 5 %D 1971 %P 103-112 %A H. Kaul %T On minimal surfaces in a Riemannian manifold %J Math. J. Okayama Univ. %V 32 %D 1974 %P 19-38 %A H. Kaul %T Der Dirichletproblem f\"ur elliptische Differentialoperatoren mit Variationsstruktur auf Riemannschen Mannigfaltigkeiten %J Bonn. Math. Schriften %V 94 %D 1977 %K incomplete: no pages %A S. Kawai %T On the instability of a minimal surface in a $4$-manifold whose curvature lies in the interval $(1/4,1]$ %J Publ. Res. Inst. Math. Sci. %V 18 %D 1982 %P 1067-1075 %A S. Kawai %T A theorem of Bernstein type for minimal surfaces in ${\bf R}^4$ %J T\^ohoku Math. J. %V 36 %D 1984 %P 377-384 %A S. Kawai %A N. Nakauchi %A H. Takeuchi %T A remark on the existence of $n$-harmonic spheres %K incomplete: no details %A B. Kawohl %T From $p$-Laplace to mean curvature operator and related questions %B Progress in Partial Differential Equations: the Metz surveys %S Pitman Res. Notes Math. Ser. %V 249 %D 1991 %I Longman %C Harlow %P 40-56 %A J.L. Kazdan %T Some applications of partial differential equations to problems in geometry %B Surveys in Geometry %S University of Tokyo Lecture Notes %D 1983 %K incomplete: no publisher %A J.L. Kazdan %T Unique continuation in geometry %J Comm. Pure Appl. Math. %V 41 %D 1988 %P 667-681 %A G. Keller %A R. Silvotti %T Quantum measure and Weyl anomaly of two-dimensional bosonic nonlinear $\sigma$-models %J Ann. Physics %V 183 %D 1988 %P 269-308 %A J.B. Keller %A J. Rubenstein %A P. Sternberg %T Reaction-diffusion processes and evolution to harmonic maps %J SIAM J. Appl. Math. %V 49 %D 1989 %P 1722-1733 %A J. 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Zwiebach %T The plumbing of minimal area surfaces %R Preprint %D 1992 %A J.G. Wolfson %D 1982 %T Minimal surfaces in complex manifolds %R Univ. of California at Berkeley Ph.D Thesis %A J.G. Wolfson %T On minimal surfaces in K\"ahler manifolds of constant holomorphic sectional curvature %J Trans. Amer. Math. Soc. %V 290 %D 1985 %P 627-646 %A J.G. Wolfson %T On minimal two-spheres in K\"ahler manifolds of constant holomorphic sectional curvature %J Trans. Amer. Math. Soc. %V 290 %D 1985 %P 627-646 %A J.G. Wolfson %T Harmonic maps of the two-sphere into the complex hyperquadric %J J. Differential Geom. %V 24 %D 1986 %P 141-152 %A J.G. Wolfson %T Gromov's compactness of pseudo-holomorphic curves and symplectic geometry %J J. Differential Geom. %V 28 %D 1988 %P 283-405 %A J.G. Wolfson %T Harmonic sequences, harmonic maps and algebraic geometry %B Harmonic mappings, twistors and $\sigma$-models %E P. Gauduchon %I World Scientific %C Singapore %D 1988 %P 232-245 %A J.G. 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Wong %T Twistor spaces over $6$-dimensional Riemannian manifolds %J Illinois J. Math. %V 31 %D 1987 %P 274-311 %A G. Woo %T Pseudoparticle configuration in two-dimensional ferromagnets %J J. Math. Phys. %V 18 %D 1977 %P 1264-1266 %A C.M. Wood %T The amplitude of the Gauss section %K incomplete: no details %A C.M. Wood %T A class of harmonic almost product structures %R preprint %A C.M. Wood %T Harmonic reduction of fibre bundles %K incomplete: no details %A C.M. Wood %T Harmonic sections, Einstein's equation, and stress-energy %K incomplete: no details %A C.M. Wood %T Harmonic sections and equivariant harmonic maps %K incomplete: no details %A C.M. Wood %T Harmonic sections and gauge theory %K incomplete: no details %A C.M. Wood %T Harmonic symmetry breaking %R preprint %A C.M. Wood %T On the energy of a unit vector field %K incomplete: no details %A C.M. Wood %D 1983 %T Some energy-related functionals and their vertical variational theory %R Warwick Ph.D Thesis %A C.M. Wood %T The Gauss section of a Riemannian immersion %J J. London Math. Soc. %V 33 %D 1986 %P 157-168 %A C.M. Wood %T Harmonic sections and Yang--Mills fields %J Proc. London Math. Soc. %V 54 %D 1987 %P 544-558 %A C.M. Wood %T Harmonic sections, Yang--Mills fields and Einstein's equation %D 1988 %P 160-170 %B Fibre bundles: their use in physics %I World Sci. Press %C Singapore %A C.M. Wood %T $H$-structures and curvatures %B Proc. Workshop on Curvature Geometry U. Lancaster %D 1989 %P 151-164 %K incomplete: no publisher %A C.M. Wood %T An existence theorem for harmonic sections %J Manuscripta Math. %V 68 %D 1990 %P 69-75 %A C.M. Wood %T Instability of the nearly K\"ahler six-sphere %J J. Reine Angew. Math. %V 439 %D 1993 %P 205-212 %A C.M. Wood %T Harmonic almost-complex structures %J Compositio Math. %V 99 %D 1995 %P 183-212 %A J.C. Wood %T Harmonic maps and harmonic morphisms %B Proc. Lobachevsky Seminar %I World Sci. %C Singapore %O (to appear) %A J.C. Wood %D 1974 %T Harmonic mappings between surfaces %R Warwick Ph.D Thesis %A J.C. Wood %T Harmonic maps and complex analysis %B Complex Analysis and its Applications, Vol. III %D 1976 %I ICTP %C Trieste %P 289-308 %A J.C. Wood %T Singularities of harmonic maps and applications of the Gauss--Bonnet formula %J Amer. J. Math. %V 99 %D 1977 %P 1329-1344 %A J.C. Wood %T A note on the fundamental group of a manifold of negative curvature %J Math. Proc. Cambridge Philos. Soc. %V 83 %D 1978 %P 415-417 %A J.C. Wood %T Holomorphicity of certain harmonic maps from a surface to complex projective $n$-space %J J. London Math. Soc. %V 20 %D 1979 %P 137-142 %A J.C. Wood %T An extension theorem for holomorphic mappings %J Math. Proc. Cambridge Philos. Soc. %V 88 %D 1980 %P 125-127 %A J.C. Wood %T Conformality and holomorphicity of certain harmonic maps %R Leeds preprint %D 1981 %A J.C. Wood %T Non existence of solutions to certain Dirichlet problems for harmonic maps I %D 1981 %R Preprint, University of Leeds %A J.C. Wood %T On the holomorphicity of harmonic maps from a surface %B Global Differential Geometry and Global Analysis %S Lecture Notes in Math. %V 838 %P 239-242 %I Springer %C Berlin, Heidelberg, New York %D 1981 %A J.C. Wood %T An extension theorem for holomorphic mappings (correction) %J Math. Proc. Cambridge Philos. Soc. %V 94 %D 1983 %P 189 %A J.C. Wood %T Some aspects of harmonic maps from a surface to complex projective space %B Differential Geometry and Mathematical Physics %E M. Cahen %E M. de~Wilde %E L. Lemaire %E L. Vanhecke %S Math. Phys. Stud. %V 3 %I Reidel %C Dortrecht, Boston, London %D 1983 %P 177-186 %A J.C. Wood %T Holomorphic differentials and classification theorems for harmonic maps and minimal immersions %P 168-175 %B Global Riemannian Geometry %E T.J. Willmore %E N.J. Hitchin %S Ellis Horwood Ser. Math. Appl. %D 1984 %I E. Horwood %C Chichester %A J.C. Wood %T On the Gauss map of a harmonic morphism %P 149-155 %B Differential Geometry %S Pitman Res. Notes Math. Ser. %V 131 %D 1985 %E L.A. Cordero %I Pitman %C Boston, London, Melbourne %A J.C. Wood %T Harmonic morphisms, foliations and Gauss maps %B Complex differential geometry and nonlinear partial differential equations %E Y.T. Siu %S Contemp. Math. %V 49 %D 1986 %P 145-184 %I Amer. Math. Soc. %C Providence, R.I. %A J.C. Wood %T Twistor constructions for harmonic maps %D 1987 %P 130-159 %B Differential Geometry and Differential Equations %E C.H. Gu %E M. Berger %E R. Bryant %S Lecture Notes in Math. %V 1255 %I Springer %C Berlin %A J.C. Wood %T The explicit construction and parametrization of all harmonic maps from the two-sphere to a complex Grassmannian %J J. Reine Angew. Math. %V 386 %D 1988 %P 1-31 %A J.C. Wood %T On the explicit construction and parametrization of all harmonic maps from the two-sphere to a complex Grassmannian %B Harmonic mappings, twistors and $\sigma$-models %E P. Gauduchon %I World Scientific %C Singapore %D 1988 %P 246-260 %A J.C. Wood %T Explicit construction and parametrization of harmonic two-spheres in the unitary group %J Proc. London Math. Soc. %V 58 %D 1989 %P 608-624 %A J.C. Wood %T Harmonic morphisms, conformal foliations and Seifert fibre spaces %B Geometry of Low-Dimensional Manifolds, 1 %E S.K. Donaldson %E C.B. Thomas %S London Math. Soc. Lecture Note Ser. %V 150 %I C.U.P. %C Cambridge %D 1990 %P 247-259 %A J.C. Wood %T Lewy's theorem fails in higher dimensions %D 1991 %J Math. Scand. %V 69 %P 166 %A J.C. Wood %T Harmonic morphisms and Hermitian structures on Einstein $4$-manifolds %J Internat. J. Math. %V 3 %D 1992 %P 415-439 %A J.C. Wood %T Harmonic morphisms between Riemannian manifolds %B Geometry and Global Analysis %E T. Kotake %E S. Nishikawa %E R. Schoen %I T\^ohoku Univ. %C Sendai %D 1993 %P 413-422 %A J.C. Wood %T Harmonic maps into symmetric spaces and integrable systems %B Harmonic maps and integrable systems %E A.P. Fordy %E J.C. Wood %S Aspects of Math. %V 23 %I Vieweg %C Braunschweig, Wiesbaden %D 1994 %P 29-55 %A R. Wood %T A note on harmonic polynomial maps %R preprint %A R. Wood %T Polynomial maps from spheres to spheres %J Invent. Math. %V 5 %D 1968 %P 163-168 %A C.X. Wu %T Theorems on nonexistence of stable harmonic maps %J Adv. in Math. (Beijing) %V 19 %D 1990 %P 462-466 %A C.X. Wu %T Some results on stable harmonic maps %J Acta Math. Sinica %V 34 %D 1991 %P 27-32 %O (Chinese) %A D. Wu %T Harmonic diffeomorphisms between complete surfaces %J Anal. Global Anal. Geom. %V 15 %D 1997 %P 133--139 %A H. Wu %T Banach manifolds of minimal surfaces in the $4$-sphere %B Differential Geometry %E R.E. Greene %E S.T. Yau %S Proc. Sympos. Pure Math %V 54 %I Amer. Math. 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