| 1 | .EQ |
| 2 | tdefine ciplus % "\o'\(pl\(ci'" % |
| 3 | ndefine ciplus % O\b+ % |
| 4 | tdefine citimes % "\o'\(mu\(ci'" % |
| 5 | ndefine citimes % O\bx % |
| 6 | tdefine =wig % "\(eq\h'-\w'\(eq'u-\w'\s-2\(ap'u/2u'\v'-.4m'\s-2\z\(ap\(ap\s+2\v'.4m'\h'\w'\(eq'u-\w'\s-2\(ap'u/2u'" % |
| 7 | ndefine =wig % =\b"~" % |
| 8 | tdefine bigstar % "\o'\(pl\(mu'" % |
| 9 | ndefine bigstar % X\b|\b- % |
| 10 | tdefine =dot % "\z\(eq\v'-.6m'\h'.2m'\s+2.\s-2\v'.6m'\h'.1m'" % |
| 11 | ndefine =dot % = dot % |
| 12 | tdefine orsign % "\s-2\v'-.15m'\z\e\e\h'-.05m'\z\(sl\(sl\v'.15m'\s+2" % |
| 13 | ndefine orsign % \e/ % |
| 14 | tdefine andsign % "\s-2\v'-.15m'\z\(sl\(sl\h'-.05m'\z\e\e\v'.15m'\s+2" % |
| 15 | ndefine andsign % /\e % |
| 16 | tdefine =del % "\v'.3m'\z=\v'-.6m'\h'.3m'\s-1\(*D\s+1\v'.3m'" % |
| 17 | ndefine =del % = to DELTA % |
| 18 | tdefine oppA % "\s-2\v'-.15m'\z\e\e\h'-.05m'\z\(sl\(sl\v'-.15m'\h'-.75m'\z-\z-\h'.2m'\z-\z-\v'.3m'\h'.4m'\s+2" % |
| 19 | ndefine oppA % V\b- % |
| 20 | tdefine oppE %"\s-3\v'.2m'\z\(em\v'-.5m'\z\(em\v'-.5m'\z\(em\v'.55m'\h'.9m'\z\(br\z\(br\v'.25m'\s+3" % |
| 21 | ndefine oppE % E\b/ % |
| 22 | tdefine incl % "\s-1\z\(or\h'-.1m'\v'-.45m'\z\(em\v'.7m'\z\(em\v'.2m'\(em\v'-.45m'\s+1" % |
| 23 | ndefine incl % C\b_ % |
| 24 | tdefine nomem % "\o'\(mo\(sl'" % |
| 25 | ndefine nomem % C\b-\b/ % |
| 26 | tdefine angstrom % "\fR\zA\v'-.3m'\h'.2m'\(de\v'.3m'\fP\h'.2m'" % |
| 27 | ndefine angstrom % A to o % |
| 28 | tdefine star %{ roman "\v'.5m'\s+3*\s-3\v'-.5m'"}% |
| 29 | ndefine star % * % |
| 30 | tdefine || % \(or\(or % |
| 31 | tdefine <wig % "\z<\v'.4m'\(ap\v'-.4m'" % |
| 32 | ndefine <wig %{ < from "~" }% |
| 33 | tdefine >wig % "\z>\v'.4m'\(ap\v'-.4m'" % |
| 34 | ndefine >wig %{ > from "~" }% |
| 35 | tdefine langle % "\s-3\b'\(sl\e'\s0" % |
| 36 | ndefine langle %<% |
| 37 | tdefine rangle % "\s-3\b'\e\(sl'\s0" % |
| 38 | ndefine rangle %>% |
| 39 | tdefine hbar % "\zh\v'-.6m'\h'.05m'\(ru\v'.6m'" % |
| 40 | ndefine hbar % h\b\u-\d % |
| 41 | ndefine ppd % _\b| % |
| 42 | tdefine ppd % "\o'\(ru\s-2\(or\s+2'" % |
| 43 | tdefine <-> % "\o'\(<-\(->'" % |
| 44 | ndefine <-> % "<-->" % |
| 45 | tdefine <=> % "\s-2\z<\v'.05m'\h'.2m'\z=\h'.55m'=\h'-.6m'\v'-.05m'>\s+2" % |
| 46 | ndefine <=> % "<=>" % |
| 47 | tdefine |< % "\o'<\(or'" % |
| 48 | ndefine |< % <\b| % |
| 49 | tdefine |> % "\o'>\(or'" % |
| 50 | ndefine |> % |\b> % |
| 51 | tdefine ang % "\v'-.15m'\z\s-2\(sl\s+2\v'.15m'\(ru" % |
| 52 | ndefine ang % /\b_ % |
| 53 | tdefine rang % "\z\(or\h'.15m'\(ru" % |
| 54 | ndefine rang % L % |
| 55 | tdefine 3dot % "\v'-.8m'\z.\v'.5m'\z.\v'.5m'.\v'-.2m'" % |
| 56 | ndefine 3dot % .\b\u.\b\u.\d\d % |
| 57 | tdefine thf % ".\v'-.5m'.\v'.5m'." % |
| 58 | ndefine thf % ..\b\u.\d % |
| 59 | tdefine quarter % roman \(14 % |
| 60 | ndefine quarter % 1/4 % |
| 61 | tdefine 3quarter % roman \(34 % |
| 62 | ndefine 3quarter % 3/4 % |
| 63 | tdefine degree % \(de % |
| 64 | ndefine degree % nothing sup o % |
| 65 | tdefine square % \(sq % |
| 66 | ndefine square % [] % |
| 67 | tdefine circle % \(ci % |
| 68 | ndefine circle % O % |
| 69 | tdefine blot % "\fB\(sq\fP" % |
| 70 | ndefine blot % H\bI\bX % |
| 71 | tdefine bullet % \(bu % |
| 72 | ndefine bullet % o\bx\be % |
| 73 | tdefine -wig % "\(~=" % |
| 74 | ndefine -wig % - to "~" % |
| 75 | tdefine wig % \(ap % |
| 76 | ndefine wig % "~" % |
| 77 | tdefine prop % \(pt % |
| 78 | ndefine prop % oc % |
| 79 | tdefine empty % \(es % |
| 80 | ndefine empty % O\b/ % |
| 81 | tdefine member % \(mo % |
| 82 | ndefine member % C\b- % |
| 83 | tdefine cup % \(cu % |
| 84 | ndefine cup % U % |
| 85 | define cap % \(ca % |
| 86 | define subset % \(sb % |
| 87 | define supset % \(sp % |
| 88 | define !subset % \(ib % |
| 89 | define !supset % \(ip % |
| 90 | .EN |