Last update: Thu Nov 9 02:31:51 MST 2023
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Math
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${}^*$, 49(3)033510
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$ - d^2 / d r^2 - 1 / (4 r^2) $, 47(4)043506
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$-component $, 46(7)072106
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$-deformed $, 48(10)102301
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$-quaternions and $, 48(10)102301
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$-topology on the $, 50(5)053515
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$1$, 49(10)103301
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$ (1 + 1)$, 47(9)092701
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$ 1 / 2 $, 46(3)032106, 47(4)042302, 47(6)062101
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$_1 F_1 (a, b, z)$, 49(6)063508
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$^1 S_3$, 47(2)022103
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$ 10 $, 48(5)053512, 49(9)099901
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$ 11 $, 48(5)053512, 49(9)099901
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$ 120 $, 46(5)052109
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$ 150 $, 49(6)062701, 50(6)062702
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$2$, 46(1)012502, 46(3)033513, 48(5)052502, 48(7)072110,
48(12)122102, 49(10)103301, 49(12)125212, 50(10)103507
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$ (2 + 1) $, 50(5)053524
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$ (2 + 1)$, 47(11)113508, 48(7)073508, 49(7)073504
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$ 2 + 1 $, 46(3)032103, 46(6)062706, 46(10)103509, 46(12)129901,
48(2)023515, 48(5)052503, 48(9)092901, 49(2)022702,
50(12)123504, 50(12)123505
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$ 2 \supset \otimes 2 \supset \otimes d $, 49(11)112102
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$ 2 \times 2 $, 49(10)103504, 50(10)103516
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$ (2, 0) $, 47(4)042301
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$ 2, 3, 5$, 47(6)062110
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$ 27 $, 46(1)013506
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$3$, 46(10)103516, 46(12)122301, 47(4)043514, 48(9)093507,
49(2)023504, 50(5)052702, 50(11)113514, 50(12)122702,
50(12)123521
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$ (3 + 1) $, 48(10)102503
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$ 3 / 2 $, 46(12)123505
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$ 3 \times 3 $, 47(8)083510
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$4$, 48(1)013513
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$5$, 48(1)013513
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$ 50 $, 50(5)050401
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$A$, 48(11)113515
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$a$, 49(6)063508
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$ A X - X A = C $, 50(8)083508
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$ A_2 $, 50(5)053519
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$ A_{2 n}^{(2)} $, 46(3)033515
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$ A_2^{(1)} $, 50(12)123516
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$ \alpha $, 48(6)065504
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$ \alpha^2$, 46(6)063504
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$b$, 49(6)063508
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$ b c$, 50(11)112305
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$ B F $, 49(3)032503
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$ B F C G $, 49(3)032503
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$ \beta $, 47(6)063302
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$ B(m, n) $, 50(2)023510
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$ \breve {\delta }^o(A) \colon \underline {\Sigma } \rightarrow \underline {\mathbb {R}}^\succeq $,
49(5)053517
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$ C^* $, 47(3)033512, 47(10)103512, 48(10)103304, 49(3)033519,
49(6)063507, 49(10)103507, 50(2)022102, 50(2)023516
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$C$, 46(10)102301, 49(5)053502, 49(6)062502
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$ c = 26 $, 48(12)122301
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$ C^0 $, 49(4)042502
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$ C^n $, 49(8)083503
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$D$, 46(11)112105, 47(5)052104, 47(9)092304, 47(10)103504,
48(4)042502, 48(8)082304, 48(10)102504, 49(7)074101
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$d$, 47(3)032901, 48(1)014101, 50(3)033511, 50(12)122106
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$ d = 1 $, 46(5)053305
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$ D < 2 $, 48(2)023303
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$ D = 2 + 1 $, 47(1)012301
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$ D(2, 1; \alpha) $, 48(10)103504
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$ \ddot {x} + 3 x \dot {x} + x^3 = 0 $, 50(7)073509
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$ \ddot {x} + f(x) \dot (x) + g(x) = 0 $, 50(10)102701
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$ \ddot {x} + f(x) \dot {x} + g(x) = 0 $, 50(8)082702
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$ deformations and $, 48(3)032107
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$ \delta $, 46(4)042703
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$ \Delta (3 n^2) $, 48(7)073501
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$ \Delta (6 n^2) $, 50(1)013524
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$ E_6 $, 46(1)013506, 46(7)073508, 49(1)012107
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$ e_6$, 48(10)103507
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$ E_7 $, 46(10)103505
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$ e_7$, 48(10)103507
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$ E_8 $, 47(11)112301, 48(7)073505
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$ \epsilon $, 46(6)063501
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$ E_{\tau, \eta }(A_2^{(2)}) $, 48(12)123515
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$F$, 46(12)123504
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$ F_L(\eta, \rho) $, 47(4)042104
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$ g \geq 2 $, 50(2)023513
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$ (G' / G) $, 50(1)013502, 50(1)013519
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$ G_2 $, 46(8)083512, 46(8)083520
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$ g_2 $, 46(10)103502
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$ \gamma $, 50(1)013525
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$H$, 46(10)103303, 47(7)073303
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$ H^{1 / 2} $, 50(1)013101
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$ H^2 $, 46(5)052702, 46(11)114101, 46(11)114102
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$ H^2$, 50(10)103507
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$ \hat {\mathbb {R}}(\theta) $, 46(6)063508
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$ \hat {\mathbb {sl}}_n$, 48(5)053502
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$ \hat {\mathbb {su}}_n$, 48(5)053502
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$ \hat {o}_N $, 47(12)123301
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$ \hat {\psi } \dagger (\vec {x}) $, 46(10)103302
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$ H^*(\mathbb {T}^2, \mathbb {R}) $, 48(11)112301
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$ H_n $, 46(7)072501
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$_i$, 46(6)063501
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$ (i z)^m $, 46(8)082110
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\ifx \undefined \bold \def \bold #1{{\bf#1}} \fi # \ifx \undefined \booktitle \def \booktitle #1{{{\em #1}}} \fi # \ifx \undefined \cprime \def \cprime {$\mathsurround=0pt '$} \fi # \ifx \undefined \Dbar \def \Dbar {\leavevmode\raise0.2ex\hbox{--}\kern-0.5emD} \fi # \ifx \undefined \dbar \def \dbar {\leavevmode\raise0.2ex\hbox{--}\kern-0.5emd} \fi # \ifx \undefined \frak \let \frak = \cal \fi # \ifx \undefined \germ \let \germ = \cal \fi # \ifx \undefined \hslash \let \hslash = \hbar \fi # \ifx \undefined \k \let \k = \c \fi # \ifx \undefined \mathbb \def \mathbb #1{{\bf #1}} \fi # \ifx \undefined \mathbf \def \mathbf #1{\hbox{\bf #1}} \fi # \ifx \undefined \mathcal \def \mathcal #1{{\cal #1}} \fi # \ifx \undefined \mathfrak \let \mathfrak = \mathcal \fi # \ifx \undefined \mathit \def \mathit #1{\hbox{\it #1\/}} \fi # \ifx \undefined \mathrm \def \mathrm #1{\hbox{\rm #1}} \fi # \ifx \undefined \mathscr \def \mathscr #1{{\cal #1}} \fi # \ifx \undefined \scr \let \scr = \cal \fi # \ifx \undefined \soft \def \soft {\relax} \fi},
0(0)0--0
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$j$, 48(11)113512, 49(6)063503
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$K$, 50(1)013101, 50(10)102303
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$k$, 46(5)052901, 46(6)062107, 46(12)122901
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$ K P $, 50(7)073506
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$ \kappa $, 47(6)062105, 48(8)082302, 48(10)102106, 50(6)063502,
50(10)102304
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$ K(m, n) $, 50(12)123513
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$L$, 46(6)063509
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$ L^2 $, 46(3)032107, 48(3)032702
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$ L_2 $, 46(12)123505
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$ \Lambda $, 49(11)112502
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$ (\lambda / 4 !) \varphi^4 $, 47(5)052303
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$ \lambda \phi^4 $, 46(1)012304
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$ \ln \tan $, 49(9)093508
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$ L^p $, 46(8)083513, 48(11)113304, 49(10)102705
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$ L_p $, 47(8)083506
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$ l_p$, 46(4)042105, 46(5)059902
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$ M + \lambda D $, 49(11)113508
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$ M / W $, 48(8)082701
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$ \mathbb {C} \mathbb {P}^1 $, 50(9)095215
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$ \mathbb {C} \mathbb {P}^n $, 50(12)122902
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$ \mathbb {C}^n / \mathbb {Z}_m $, 50(2)022304
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$ \mathbb {R} $, 49(7)072702
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$ \mathbb {R}^{1 + n} $, 48(8)083510
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$ \mathbb {R}^{2 + n} $, 47(1)013503, 47(6)069901
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$ \mathbb {R}^{2D} $, 47(1)012303
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$ \mathbb {R}^3 $, 46(10)102703, 48(2)022901, 48(12)122901,
49(3)032111, 49(11)113101
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$ \mathbb {R}^4 $, 46(3)032301
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$ \mathbb {s}_m $, 48(3)033502
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$ \mathbb {Z} $, 50(10)103508
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$ \mathbb {Z}_2 $, 48(1)012304
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$ \mathfrak {e}(2) $, 47(5)053506
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$ \mathfrak {gl}(1 | n) $, 49(7)073502
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$ \mathfrak {sl}_2 $, 46(10)102701
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$ \mathfrak {so}(3) $, 47(2)023507
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$ \mathfrak {so}(5) $, 47(2)023507
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$ \mathfrak {su}(3) $, 49(7)073506
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$ \mu $, 47(3)032101, 47(4)042103
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$N$, 46(3)032108, 46(10)102501, 46(11)112106, 47(10)102101,
47(10)103505, 47(12)123510, 48(1)012302, 48(5)053509,
48(8)083501, 49(2)022703, 49(7)073301, 49(9)092102,
50(5)052702, 50(6)062105
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$n$, 46(1)012503, 46(6)062104, 46(10)102106, 47(5)052301,
48(6)065404, 48(12)123506, 49(3)033514, 49(11)113509,
50(1)012104, 50(8)083501, 50(10)102901, 50(10)103523
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$ N + 1$, 46(10)102501
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$ N = 1 $, 46(10)103517, 48(5)053505
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$ (n + 1)$, 48(1)013504, 48(10)103509
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$ N = 2 $, 47(11)112304, 48(4)043508, 50(1)012704, 50(7)073508
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$ N = 3 $, 47(1)012104
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$ N = 6 $, 46(10)103504, 47(1)019901, 50(8)082104
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$ N K $, 48(8)083506, 50(4)043513
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$ \nu $, 49(8)083503
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$ O(1)$, 49(10)102111
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$ O_2 $, 46(7)073509, 49(4)043501, 49(10)103502, 50(1)012705,
50(3)033501, 50(5)053521
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$ O_\infty $, 48(9)093510, 50(3)033501
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$ O(p, q) $, 50(5)053512
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$ O^\star $, 49(5)053522
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$ O(\varepsilon^2) $, 47(7)072302
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$p$, 46(4)042105, 46(5)059902, 47(1)012502, 49(1)013504,
50(4)043506, 50(8)082301
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$ P T $, 46(3)032102, 46(6)062109, 46(10)102108, 50(12)122105
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$ P T$, 46(6)063504
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$ p, q$, 49(5)053504
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$ \Phi^4 $, 49(4)043509
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$ \phi^4 $, 47(9)092902, 48(1)012111
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$ \phi^6 $, 49(6)063301
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$Q$, 47(12)123511
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$q$, 46(6)062307, 46(6)063509, 46(12)123508, 47(1)013508,
47(11)112503, 48(2)023505, 48(4)043510, 48(8)083507,
50(6)063503
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$ q > 1$, 48(8)083507
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$ (q, \gamma) $, 48(12)123520
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$ Q^n $, 50(1)012701
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$R$, 46(4)042702, 48(10)103507, 49(1)013511, 49(2)023510
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$r$, 47(3)033511, 48(2)023506, 48(11)113521, 49(6)062903,
50(3)033504, 50(7)072701
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$ R^2 $, 50(10)103507
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$ R^4 $, 46(7)072304
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$ {\rm AdS} / {\rm CFT} $, 49(10)102302
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$ {\rm AdS}_2 $, 48(11)113508
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$ {\rm AdS}(3) / {\rm CFT}(2) $, 50(4)042304
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$ {\rm AdS}_{d + 1} \rightarrow {\rm AdS}_d $, 46(10)102304
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$ {\rm Aut}(F_4) $, 47(4)043507
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$ {\rm G}(2) $, 46(11)113506
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$ {\rm gl}(2 | 2) $, 46(1)013505
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$ {\rm GL}(2, \mathbb {F}_q) $, 48(12)123513
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$ {\rm gl}(m | n)_k $, 48(5)053514
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$ {\rm GL}(M, \mathbb {C}) $, 49(6)063502
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$ {\rm GL}_{q, j}(1 | 1) $, 49(2)023511
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$ {\rm ISL}(n, R) $, 46(6)063503
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$ {\rm o}(4, \mathbb {C}) $, 48(9)093503
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$ {\rm O}(5) $, 46(5)053514
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$ {\rm OSp}_q(1 / 2) $, 46(10)103510
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$ {\rm OSp}_q(1 / 2)$, 47(12)123511
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$ {\rm sl}(2) $, 48(4)043511, 48(9)093507
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$ {\rm SL}(2, \mathbb {F}_q) $, 48(12)123513
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$ {\rm sl}(2, \mathbb {R}) $, 48(2)023508
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$ {\rm sl}(3) $, 48(4)043511
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$ {\rm sl}(4, \mathbb {C}) $, 48(9)093503
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$ {\rm sl}(p^2, \mathbb {C}) $, 47(1)013512
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$ {\rm SO}_0 (1, d + 1) $, 47(3)033513
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$ {\rm SO}(10) $, 46(3)033505
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$ {\rm so}(2, 1) $, 45(7)2674--2693, 46(3)039901, 47(11)112103
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$ {\rm SO}(3) $, 48(5)052101
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$ {\rm Sp}(1) $, 50(7)072107
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$ {\rm sp}(4, \mathbb {C}) $, 48(9)093503
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$ {\rm SU}(1, 1) $, 46(11)112101
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$ {\rm su}(1, 1) $, 49(11)113511
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$ {\rm su}(1, 1)$, 50(5)052104
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$ {\rm SU}(2) $, 46(7)073506, 46(10)102303, 48(8)083505,
50(7)072902
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$ {\rm SU}(2)$, 50(3)033507
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$ {\rm SU}(2) \times {\rm SU}(2) $, 46(5)053514
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$ {\rm SU}(2^N) $, 46(8)082108
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$ {\rm SU}(3) $, 46(7)072103, 46(11)113506, 47(11)112902,
48(5)052101, 50(5)053503
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$ {\rm SU}(3) / {\rm SU}(2) $, 47(11)112902
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$ {\rm SU}(N) $, 46(3)033514, 46(10)102306, 47(4)043510,
50(4)043510
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$ {\rm su}(N) $, 46(10)103512
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$ {\rm su}_q(1, 1)$, 47(9)093502
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$ {\rm SU}_q(3) $, 47(7)073509
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$ {\rm U}(1) $, 48(2)023303
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$ {\rm U}(2 \Omega) \supset {\rm U}(\Omega) \supset \otimes {\rm SU}(2) $,
48(5)053304
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$ {\rm U}(3) $, 50(10)102703
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$ {\rm u}(3) $, 47(4)043511
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$ {\rm U}(8) \supset {\rm O}(8) \supset {\rm SU}(3) $, 47(6)063505
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$ {\rm U}(N) $, 49(7)073514
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$ {\rm U}(n) $, 46(4)043501
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$ {\rm U}_q \frak{su}_{(n, n)}$, 46(6)062307
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$ {\rm U}_{q, p} (\hat {\mathfrak {sl}}_2)_k $, 49(4)043513
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$ {\rm U}_q(D_4^{(3)}) $, 48(4)043509
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$ {\rm U}_q({\rm gl}(1 | 1)) $, 47(1)013302
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$ {\rm U}_q[{\rm osp}(m | n)] $, 46(12)123501
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$ {\rm U}_q({\rm so}_3)$, 46(12)123508
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$ {\rm U}_q({\rm so}_5)$, 46(12)123508
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$ R^{N^2 - 1} $, 48(11)113520
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$S$, 47(4)043513, 47(5)053508, 47(12)123301, 48(8)083501,
50(7)073511
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$ S^{1 | 2} $, 48(10)103504
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$ S^2 $, 46(5)052702, 46(11)114101, 46(11)114102, 48(11)113508
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$ S^2 \rightarrow C P^{N - 1} $, 48(11)113520
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$ S_3 $, 47(1)012104
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$ S^3 \times \mathbb {R} $, 46(1)012703
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$ \sigma $, 46(7)072307, 50(4)043508
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$ \sigma (M) $, 49(11)113508
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$ S_n $, 50(9)095208
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$ \sqrt {- \Delta + m^2} - m $, 47(3)033506
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$T$, 47(12)123511, 49(3)032301, 50(4)043504
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$ T^* \mathbb {T}^n $, 47(7)072701
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$ t_{1 x} = t + x + d(t, t_1) $, 50(10)102710
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$ T^2 $, 48(8)082501
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$ \tau $, 47(8)083512, 48(5)053502, 50(1)013529, 50(7)073506
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$ \vartheta $, 47(6)063507
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$W$, 47(4)043513, 47(10)102303, 49(7)073512, 49(11)113503,
50(4)043512, 50(10)102103
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$ W / M $, 47(11)112701
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$ W / M$, 50(2)024101
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$ W_{1 + \infty } $, 48(12)123520
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$ W(2, 2)$, 49(11)113503
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$ W(2, 2 p - 1) $, 48(7)073503
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$ X Y $, 49(12)125208
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$ |x| + |z| $, 46(6)063303
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$ (x, z) $, 46(6)063303
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$ y^2 = x^5 - x $, 50(10)103519
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$ Y(\mathfrak {gl}(n)) $, 50(1)013518
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$Z$, 46(5)052307, 47(2)022107
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$ Z^3 $, 49(2)023511