4.8 AMS relations

$\leqq$, $\eqslantless$, $\lesssim$, $\approxeq$, $\lessdot$, $\lll$,
$\lessgtr$, $\doteqdot$, $\risingdotseq$, $\fallingdotseq$,
$\backsimeq$, $\Subset$, $\sqsubset$, $\curlyeqprec$,
$\trianglelefteq$, $\vDash$, $\Vvdash$, $\smallsmile$, $\smallfrown$,
$\bumpeq$, $\Bumpeq$, $\geqq$, $\eqslantgtr$, $\gtrsim$, $ \gtrdot$,
$\ggg$, $\gtrless$, $\eqcirc$, $\circeq$, $\triangleq $, $\Supset$,
$\sqsupset$, $\curlyeqsucc$, $ \trianglerighteq$, $\Vdash$,
$\pitchfork$, $\therefore$, $\because$, $\varpropto$, $\backepsilon$

$\leqq $, $\eqslantless $, $\lesssim $, $\approxeq $, $\lessdot $, $\lll $, $\lessgtr $, $\doteqdot $, $\risingdotseq $, $\fallingdotseq $, $\backsimeq $, $\Subset $, $\sqsubset $, $\curlyeqprec $, $\trianglelefteq $, $\vDash $, $\Vvdash $, $\smallsmile $, $\smallfrown $, $\bumpeq $, $\Bumpeq $, $\geqq $, $\eqslantgtr $, $\gtrsim $, $ \gtrdot $, $\ggg $, $\gtrless $, $\eqcirc $, $\circeq $, $\triangleq $, $\Supset $, $\sqsupset $, $\curlyeqsucc $, $ \trianglerighteq $, $\Vdash $, $\pitchfork $, $\therefore $, $\because $, $\varpropto $, $\backepsilon $

AMS negated relations

$\nless$, $ \lneqq$, $\lnsim$, $ \precnsim$, $\nsim$, $ \nvdash$,
$\nvDash$, $\ntriangleleft$, $\ntrianglelefteq$, $\subsetneq$, $
\ngtr$, $ \gneqq$, $ \gnsim$, $\ncong$, $ \nparallel$, $\nvDash$,
$\nVDash$, $\ntriangleright$, $\ntrianglerighteq$, $\supsetneq$,
$\nprec$, $\nmid$, $\nleqslant$, $\ngeqslant$, $\nsucc$, $\succnsim$

$\nless $, $ \lneqq $, $\lnsim $, $ \precnsim $, $\nsim $, $ \nvdash $, $\nvDash $, $\ntriangleleft $, $\ntrianglelefteq $, $\subsetneq $, $ \ngtr $, $ \gneqq $, $ \gnsim $, $\ncong $, $ \nparallel $, $\nvDash $, $\nVDash $, $\ntriangleright $, $\ntrianglerighteq $, $\supsetneq $, $\nprec $, $\nmid $, $\nleqslant $, $\ngeqslant $, $\nsucc $, $\succnsim $