/libussfMIenc[%
/Gamma % '0
/Delta1 % '1
/Theta % '2
/Lambda % '3
/Xi % '4
/Pi % '5
/Sigma % '6
/Upsilon % '7
/Phi % '10
/Psi % '11
/Omega % '12
/alpha % '13
/beta % '14
/gamma % '15
/delta % '16
/epsilon1 % '17
/zeta % '20
/eta % '21
/theta % '22
/iota % '23
/kappa % '24
/lambda % '25
/mu % '26
/nu % '27
/xi % '30
/pi % '31
/rho % '32
/sigma % '33
/tau % '34
/upsilon % '35
/phi % '36
/chi % '37
/psi % '40
/omega % '41
/epsilon % '42
/theta1 % '43
/pi1 % '44
/rho1 % '45
/sigma1 % '46
/phi1 % '47
/gradient
/partialdiff % partialdiff italic
/aleph
/uni2136
/uni2137
/uni2138
/uni22B3
/uni22B2
/zero
/one
/two
/three
/four
/five
/six
/seven
/eight
/nine
/period
/comma
/less
/hslash
/greater
/uni22C6
/uni2268
/A % '101
/B % '102
/C % '103
/D % '104
/E % '105
/F % '106
/G % '107
/H % '110
/I % '111
/J % '112
/K % '113
/L % '114
/M % '115
/N % '116
/O % '117
/P % '120
/Q % '121
/R % '122
/S % '123
/T % '124
/U % '125
/V % '126
/W % '127
/X % '130
/Y % '131
/Z % '132
/uni266D
/uni266E
/uni266F
/uni2323
/uni2322
/hbar
/a % '141
/b % '142
/c % '143
/d % '144
/e % '145
/f % '146
/g % '147
/h % '150
/i % '151
/j % '152
/k % '153
/l % '154
/m % '155
/n % '156
/o % '157
/p % '160
/q % '161
/r % '162
/s % '163
/t % '164
/u % '165
/v % '166
/w % '167
/x % '170
/y % '171
/z % '172
/i.dtls % '173
/j.dtls % '174
/uni2269
/uni226A
/uni2040 % tie
/gravecomb
/acutecomb
/uni0302
/tildecomb
/uni0304
/uni0306
/uni0307
/uni0308
/hookabovecomb
/uni030A
/uni030C
/uni0310
/uni0312
/uni0315
/uni031A
/uni20D0
/uni20D1
/uni20D6
/uni20D7
/uni20DB
/uni20DC
/uni20E1
/uni20E7 % combining annuity
/uni20E9 % should be /uni20E9
/uni20F0
/uni20D6.ex
/uni0302.size1
/uni0303.size1
/uni030C.size1
/uni0302.size2
/uni0303.size2
/uni030C.size2
/uni0302.size3
/uni0303.size3
/uni030C.size3
/uni0302.size4
/uni0303.size4
/uni030C.size4
/uni0302.size5
/uni0303.size5
/uni030C.size5
/uni23DE.lt
/uni23DE.rt
/uni23DF.lt
/uni23DF.rt
/uni23DE.ex
/uni23DE.md
/uni23DF.md
/uni23DC.lt
/uni23DC.rt
/uni23DD.lt
/uni23DD.rt
/uni23B4.lt
/uni23B4.rt
/uni23B5.lt
/uni23B5.rt
/uni226B
/uni226C
/uni226D
/uni226E
/uni226F
/uni2270
/uni2271
/uni2272
/uni2273
/uni2274
/uni2275
/uni2276
/uni2277
/uni2278
/uni2279
/uni227A
/uni227B
/uni227C
/uni227D
/uni227E
/uni227F
/uni2280
/uni2281
/propersubset
/propersuperset
/notsubset
/uni2285
/reflexsubset
/reflexsuperset
/uni2288
/uni2289
/uni228A
/uni228B
/uni228C
/uni228D
/uni228E
/uni228F
/uni2290
/uni2291
/uni2292
/uni2293
/uni2294
/circleplus
/uni2296
/circlemultiply
/uni2298
/uni2299
/uni229A
/uni229B
/uni229C
/uni229D
/uni229E
/uni229F
/uni22A0
/uni22A1
/uni22A2
/uni22A3
/uni22A4
/perpendicular
/uni22A6
/uni22A7
/uni22A8
/uni22A9
/uni22AA
/uni22AB
/uni22AC
/uni22AD
/uni22AE
/uni22AF
/uni22B0
/kappa1 % was /uni22B1
/uni22B4
] def