Index file section Math for cacm1980.bib
Last update: Sat Oct 21 02:02:10 MDT 2023
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Math
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$2^n$, 26(3)216--220
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$8$, 25(11)772--780
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$a \ge 1$, 25(1)47--54
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$a \ge 4$, 25(1)47--54
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$\alpha$, 23(7)389--394
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$\alpha>1$, 23(7)389--394
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$\alpha>1/n$, 23(7)389--394
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$C$, 27(4)384--387
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$\chi^2$, 29(11)1090--1092
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$d$, 26(1)96--99
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$e$, 26(1)96--99
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$e * d == 1(\mbox{mod}(p-1)*(q-1))$, 26(1)96--99
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$F$, 29(11)1090--1092
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$ F = \ i|1 \leq i \leq n - m + 1$, 35(10)83--91
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$f_0^{-1}(p)$, 26(5)590--594
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$f_0(x)$, 26(5)590--594
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$\gamma(p)=pd\ln=>f_0(f^{-1}(p))</dp$, 26(5)590--594
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$h$, 24(12)829--833
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$h(x) = (C/(Dx + E)) \bmod N$, 24(12)829--833
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$h(x)=(C\bmod{}p(x))$, 27(4)384--387
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\input bibnames.sty # \input path.sty # \def \TM {${}^{\sc TM}$} # \hyphenation{ al-pha-mer-ic Balz-er Blom-quist Bo-ta-fo-go Bran-din Brans-comb Bu-tera Chris-tina Christ-o-fi-des Col-lins Cor-dell data-base econ-omies Fletch-er flow-chart flow-charts Fry-styk ge-dank-en Gar-fink-el Ge-ha-ni Glush-ko Goud-reau Gua-dan-go Gui-ma-raes Har-i-di Haw-thorn Hem-men-ding-er Hor-o-witz Hour-vitz Hirsch-berg Ike-da Ka-chi-tvi-chyan-u-kul Kat-ze-nel-son Kitz-miller Ko-ba-yashi Le-Me-tay-er Ken-ne-dy Law-rence Mac-kay Mai-net-ti Mar-sa-glia Max-well Mer-ner Mo-ran-di Na-ray-an New-ell Nich-ols para-digm pat-ent-ed Phi-lo-kyp-rou Prep-a-ra-ta pseu-do-chain-ing QUIK-SCRIPT Rad-e-mach-er re-eval-u-a-tion re-wind Ros-witha Schwach-heim Schob-bens Schon-berg Sho-sha-ni Si-tha-ra-ma Skwa-rec-ki Ste-phens Streck-er Strin-gi-ni Tes-ler Te-zu-ka Teu-ho-la Till-quist Town-send Tsi-chri-tzis Tur-ski Vuille-min We-nig Za-bo-row-ski Za-mora }},
0(0)0--0
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$k$, 26(7)516--523, 29(6)471--483, 30(7)594--599
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$M$, 26(1)96--99
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$m$, 28(2)190--201
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${M}/{M}/s$, 24(4)206--217
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$n$, 13(2)94--102, 13(6)377--387, 23(7)389--394, 26(1)96--99
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$n \log(n)$, 23(4)214--229
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$n^2$, 13(2)94--102
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$n^3$, 13(2)94--102
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${O}(1)$, 31(10)1220--1227
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$O(n)$, 23(5)301
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$P$, 35(10)83--91
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$p$, 26(1)96--99
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$ P = p_1 p_2 \ldots {} p_m $, 35(10)83--91
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$P^2$, 28(10)1076--1085
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$p(x)$, 27(4)384--387
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$q$, 26(1)96--99
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$S$, 24(12)829--833
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$ \Sigma $, 35(10)83--91
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$T$, 35(10)83--91
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$t$, 5(2)238--239, 7(2)247--249, 7(2)250--251, 13(10)617--619,
13(10)619--620, 29(11)1090--1092
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$ T = t_1 t_2 \ldots {} t_n $, 35(10)83--91
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$ t_i t_i + 1 \ldots t_i + m - 1 = P \ $, 35(10)83--91
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$w_i=i(f_0(x_i)/f_0(x_{i+1}))$, 26(5)590--594
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$x$, 24(12)829--833, 27(4)384--387
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$x_1,\ldots,x_n$, 26(5)590--594