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Дата изменения: Tue Aug 15 00:29:44 1995
Дата индексирования: Sat Dec 22 23:00:21 2007
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Using AMSFonts with the AASTeX Macros
May 1995
The more interesting American Mathematical Society fonts and symbols for
astronomical purposes are shown below. Authors are invited to use these fonts
and symbols in their AASTeX manuscripts. If the AMS fonts and symbols have
not been installed locally it is still possible to use them in manuscripts that will be
submitted electronically---the local copy of the manuscript will not contain these
fonts but the copies produced at the editorial offices and at the Production Offices
will be correct.
The AMS fonts and symbols may be obtained by anonymous FTP to the node
ftp.shsu.edu in the directory texarchive/fonts/ams. The fonts and symbols
displayed on these pages were extracted from the User's Guide to AMSFonts
Version 2.1.
There are four symbols that are normally used outside of math mode:
X ``checkmark r ``circledR
z ``maltese U ``yen
These symbols can also be used in math mode, and will change sizes correctly in
subscripts and superscripts.
There are four symbols that are ``delimiters'' (although there are no larger
versions obtainable with ``left and ``right), so they must be used in math mode:
p ``ulcorner q ``urcorner
x ``llcorner y ``lrcorner
There are two dashed arrows constructed from symbols in this family (note
that one of them has two names; it can be accessed by either one):
9 9 K ``dashrightarrow, ``dasharrow L99 ``dashleftarrow
Wider versions of ``widehat and ``widetilde are available.
Letters in the EUFM font can be accessed (in math mode) by typing, for
example, ``frak A ``frak g to get Ag. The complete Euler Fraktur upper and
lower case alphabet is listed here: A, B, C, D, E, F, G, H, I, J, K, L, M, N, O,
P, Q, R, S, T, U, V, W, X, Y, Z, and a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r,
s, t, u, v, w, x, y, z.
ffl Lowercase Greek letters
z 207A ``digamma -- 207B ``varkappa
ffl Hebrew letters
i 2069 ``beth j 206A ``gimel
k 206B ``daleth

2
ffl Miscellaneous symbols
~ 207E ``hbar (U) 8 1038 ``backprime
ќ 207D ``hslash ? 203F ``varnothing
M 134D ``vartriangle N 104E ``blacktriangle
O 104F ``triangledown H 1048 ``blacktriangledown
\Lambda 1003 ``square \Xi 1004 ``blacksquare
\Sigma 1006 ``lozenge \Upsilon 1007 ``blacklozenge
s 1073 ``circledS F 1046 ``bigstar
`` 105C ``angle (U) “ 105E ``sphericalangle
] 105D ``measuredangle
@ 2040 ``nexists -- 107B ``complement
f 2066 ``mho g 2067 ``eth
` 2060 ``Finv OE 231E ``diagup
a 2061 ``Game ь 231F ``diagdown
--- 207C ``Bbbk
ffl Binary operators
u 1275 ``dotplus n 226E ``ltimes
r 2272 ``smallsetminus o 226F ``rtimes
e 1265 ``Cap, ``doublecap h 1268 ``leftthreetimes
d 1264 ``Cup, ``doublecup i 1269 ``rightthreetimes
Z 125A ``barwedge f 1266 ``curlywedge
Y 1259 ``veebar g 1267 ``curlyvee
[ 125B ``doublebarwedge
fi 120C ``boxminus Ё 127F ``circleddash
\Theta 1202 ``boxtimes ~ 127E ``circledast
\Gamma 1200 ``boxdot ќ 127D ``circledcirc
\Delta 1201 ``boxplus \Pi 1205 ``centerdot
? 223E ``divideontimes --- 127C ``intercal
ffl Binary relations
5 1335 ``leqq = 133D ``geqq
6 1336 ``leqslant ? 133E ``geqslant
0 1330 ``eqslantless 1 1331 ``eqslantgtr
. 132E ``lesssim & 1326 ``gtrsim
/ 132F ``lessapprox ' 1327 ``gtrapprox
u 2375 ``approxeq
l 236C ``lessdot m 236D ``gtrdot
n 136E ``lll, ``llless o 136F ``ggg, ``gggtr
7 1337 ``lessgtr ? 133F ``gtrless
Q 1351 ``lesseqgtr R 1352 ``gtreqless
S 1353 ``lesseqqgtr T 1354 ``gtreqqless
+ 132B ``doteqdot, ``Doteq P 1350 ``eqcirc
: 133A ``risingdotseq $ 1324 ``circeq
; 133B ``fallingdotseq , 132C ``triangleq

3
v 1376 ``backsim s 2373 ``thicksim
w 1377 ``backsimeq t 2374 ``thickapprox
j 136A ``subseteqq k 136B ``supseteqq
b 1362 ``Subset c 1363 ``Supset
@ 1340 ``sqsubset A 1341 ``sqsupset
4 1334 ``preccurlyeq ! 133C ``succcurlyeq
2 1332 ``curlyeqprec 3 1333 ``curlyeqsucc
132D ``precsim % 1325 ``succsim
w 2377 ``precapprox v 2376 ``succapprox
C 1343 ``vartriangleleft B 1342 ``vartriangleright
E 1345 ``trianglelefteq D 1344 ``trianglerighteq
ffl 130F ``vDash fl 130D ``Vdash
ffi 130E ``Vvdash
` 1360 ``smallsmile p 2370 ``shortmid
a 1361 ``smallfrown q 2371 ``shortparallel
l 136C ``bumpeq G 1347 ``between
m 136D ``Bumpeq t 1374 ``pitchfork
— 135F ``varpropto Ё 237F ``backepsilon
J 134A ``blacktriangleleft I 1349 ``blacktriangleright
) 1329 ``therefore * 132A ``because
ffl Negated relations
\Xi 2304 ``nless \Pi 2305 ``ngtr
\Theta 2302 ``nleq \Lambda 2303 ``ngeq
\Omega 230A ``nleqslant ff 230B ``ngeqslant
џ 2314 ``nleqq – 2315 ``ngeqq
fi 230C ``lneq fl 230D ``gneq
\Phi 2308 ``lneqq \Psi 2309 ``gneqq
\Gamma 2300 ``lvertneqq \Delta 2301 ``gvertneqq
` 2312 ``lnsim ' 2313 ``gnsim
ae 231A ``lnapprox oe 231B ``gnapprox
\Sigma 2306 ``nprec \Upsilon 2307 ``nsucc
ffi 230E ``npreceq ffl 230F ``nsucceq
Ї 2316 ``precneqq љ 2317 ``succneqq
i 2310 ``precnsim j 2311 ``succnsim
ё 2318 ``precnapprox ъ 2319 ``succnapprox
Ь 231C ``nsim AE 231D ``ncong
. 232E ``nshortmid / 232F ``nshortparallel
232D ``nmid , 232C ``nparallel
0 2330 ``nvdash 2 2332 ``nvDash
1 2331 ``nVdash 3 2333 ``nVDash
6 2336 ``ntriangleleft 7 2337 ``ntriangleright
5 2335 ``ntrianglelefteq 4 2334 ``ntrianglerighteq
* 232A ``nsubseteq + 232B ``nsupseteq
'' 2322 ``nsubseteqq # 2323 ``nsupseteqq
( 2328 ``subsetneq ) 2329 ``supsetneq

4
/ 2320 ``varsubsetneq ! 2321 ``varsupsetneq
$ 2324 ``subsetneqq % 2325 ``supsetneqq
& 2326 ``varsubsetneqq ' 2327 ``varsupsetneqq
ffl Arrows
` 1312 ``leftleftarrows ' 1313 ``rightrightarrows
Ь 131C ``leftrightarrows AE 131D ``rightleftarrows
W 1357 ``Lleftarrow V 1356 ``Rrightarrow
j 1311 ``twoheadleftarrow i 1310 ``twoheadrightarrow
oe 131B ``leftarrowtail ae 131A ``rightarrowtail
'' 1322 ``looparrowleft # 1323 ``looparrowright
ff 130B ``leftrightharpoons
\Omega 130A ``rightleftharpoons (U)
x 2378 ``curvearrowleft y 2379 ``curvearrowright
\Psi 1309 ``circlearrowleft \Phi 1308 ``circlearrowright
OE 131E ``Lsh ь 131F ``Rsh
џ 1314 ``upuparrows – 1315 ``downdownarrows
ё 1318 ``upharpoonleft Ї 1316 ``upharpoonright, ``restriction
ъ 1319 ``downharpoonleft љ 1317 ``downharpoonright
( 1328 ``multimap / 1320 ``rightsquigarrow
! 1321 ``leftrightsquigarrow
ffl Negated arrows
8 2338 ``nleftarrow 9 2339 ``nrightarrow
: 233A ``nLeftarrow ; 233B ``nRightarrow
= 233D ``nleftrightarrow ! 233C ``nLeftrightarrow