Last update: Fri Oct 18 02:02:45 MDT 2024
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Math
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$^*$, 61(8)081703
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$^{-1}$, 62(9)091509
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$-Harish-Chandra modules for $, 63(2)021701
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$1$, 61(3)031502, 61(5)051507, 61(9)091507, 61(10)101506,
62(6)061901, 62(7)072107, 62(9)091504, 62(10)101507,
62(12)121503, 63(1)012103
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$ 1 + 1 $, 61(8)082302
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$ 1 / N $, 62(7)073505
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$ 1 < p < 2 < q < 6 $, 63(5)051506
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$ 1 / r^2 $, 63(1)013504
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$2$, 61(1)013101, 61(2)021901, 61(6)061509, 61(7)073505,
61(8)081507, 61(10)101501, 61(10)102101, 61(11)111504,
62(5)051503, 62(6)061508, 62(7)072704, 62(9)092202,
62(11)113504, 62(12)121504, 63(4)041504
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$^2$, 61(9)092101, 62(9)092501
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$_2$, 63(12)122301, 64(3)032301
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$ (2 + 1)$, 65(9)093501
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$ (2 < p < 4) $, 61(7)071506
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$ 2 \times 2 $, 61(6)063504, 65(5)051902
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$3$, 61(1)011506, 61(2)021507, 61(11)111503, 61(11)112302,
62(2)021510, 62(5)053503, 62(9)092202, 62(12)121502,
63(1)011506
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$^3$, 61(11)111502
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$_3$, 64(10)101505
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$ (3 + 1) $, 65(9)091507
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$_{34}$, 64(10)101505
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$ 6 j $, 64(2)023504, 64(3)031703
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$ \alpha $, 61(7)072701, 62(3)031507
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$ \alpha - z $, 61(10)102201
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$ \alpha - z$, 65(4)042202
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$ \alpha \to 1 $, 62(9)092205
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$ A_n $, 62(10)101702, 63(9)091702
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$ A[\sech (\lambda x) + i \tanh (\lambda x)] $, 64(8)082101
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$B$, 63(11)113503
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$b$, 64(7)072703
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$ \bar {\partial } $, 62(9)093510
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$ \beta $, 62(7)073505, 63(2)022701, 63(12)123301, 65(8)083505
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$ B_n $, 64(5)053501
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$ C* $, 65(8)083501
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$ C^* $, 63(1)011902, 64(8)083506
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$ C^2 $, 65(7)072701
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$ C^5 \otimes C^5 $, 62(3)032203
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$ {\cal N} = 2 $, 62(3)032304
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$ \cal {O} $, 65(3)031701
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$ \cal P T $, 64(8)082101
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$ \cal R $, 64(10)101704
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$ \chi^3 $, 64(10)101506
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$ C^\infty $, 62(6)062703
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$ C_n(1) $, 64(8)081702
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$D$, 61(7)073501, 61(10)102301, 62(7)071503
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$d$, 61(8)082701, 62(7)072103, 62(8)083304, 62(10)102201,
65(1)013506
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$D^{1,p}(\mathbb{R}^3)$, 65(5)051512
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$ \ddot {x} + f(x) \dot {x}^2 + g(x) = 0 $, 54(5)053506,
55(5)059901, 57(2)024101, 61(4)044101, 61(4)044102
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$ \dot {B}^{-1}_{\infty, \infty }$, 62(9)091509
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$E$, 65(5)052704
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$ E^2 $, 64(1)012701
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$ E_6 $, 65(3)031702, 65(5)059903
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$ E_6$, 65(1)013501
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$ E_7 $, 65(3)031703
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$ E_{7( - 25)} $, 65(1)013501
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$ E_8 $, 63(8)081703, 65(3)031702, 65(3)031703, 65(5)059903
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$ E_{\tau, \eta }g l_3 $, 61(5)053507
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$ F(r) $, 63(11)112502
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$g$, 61(10)101502, 63(5)052701, 64(1)011512
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$ G_2 $, 65(7)071701
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$ g^{(2)} $, 65(5)051702
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$ G_2 / I_6 $, 65(5)051702
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$ g^{(3)} $, 65(5)051702
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$h$, 65(3)032103
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$ H^2 $, 63(6)062705
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$ \hat {\mathfrak {age}}(1) $, 65(4)041702
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$ H^s $, 62(7)071501
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$i$, 64(10)101703
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$_{IV}$, 62(6)063501
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$K$, 62(10)102201, 64(3)031902, 64(5)053504, 65(4)043502,
65(8)081904
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$k$, 64(3)033507
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$ k + 1 $, 62(5)051504
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$ K \prime_4 $, 63(9)091701
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$ (k, a)$, 64(7)073504
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$ L^1 $, 64(5)051507
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$ L^2 $, 61(5)051505, 61(7)071511, 62(9)091504, 65(7)071507
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$ \lambda $, 63(3)032504
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$ L^\infty $, 62(5)051502
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$ L_\infty $, 61(11)112502, 62(5)052302, 65(3)031701
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$ {L_\infty } $, 63(5)051703
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$ L^P $, 65(10)101501
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$ L^p $, 61(6)061516, 61(9)092106, 62(7)071507
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$M$, 62(4)041902
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$m$, 64(2)022502, 64(3)031505
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$ M_2 $, 63(9)092201
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$ \mathbb {C} $, 63(9)091706
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$ \mathbb {P}^1 $, 61(1)011704
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$ \mathbb {R}^+ \times \mathbb {R}^3 $, 63(9)092304, 65(2)022301
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$ \mathbb {R}^3 $, 63(9)091511
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$ \mathbb {R}^3$, 63(3)031503
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$ \mathbb {R}^6 $, 61(5)053506
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$ \mathbb {R}^d, d = 1, 2, 3 $, 61(9)092103
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$ \mathbb {R}^N $, 62(11)111506
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$ \mathbb {R}^n$, 63(2)022701
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$ \mathbb {R}^{n + 1} $, 63(7)072301
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$ \mathbb {R}^{n + 2} $, 63(7)072301
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$ \mathbb {Z}_2 \times \mathbb {Z}_2 $, 61(1)011702, 62(6)063512
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$ \mathbb {Z}_2^2 $, 62(4)043502
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$ \mathbb {Z}_2^n $, 61(5)052105
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$ \mathbb {Z}^d $, 63(11)113301, 64(1)013302
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$ \mathcal {D}^b(X) $, 61(6)061701
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$ \mathcal {N} = 2 $, 63(9)091704
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$ \mathcal {O} N $, 63(10)101701
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$ \mathcal {S}(N) $, 61(4)043508
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$ \mathcal {W}_{q, t}(\mathfrak {sl}(2 |1))$, 62(5)051702
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$ \mathfrak {gl}(1) $, 63(12)123301
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$ \mathfrak {osp}(1 |2 n)$, 63(6)061702
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$ \mathfrak {osp}(1 |2 n) \supset \mathfrak {gl}(n)$, 63(6)061702
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$ \mathfrak {sl}_2 $, 61(6)061506, 65(1)011701
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$ \mathfrak {sl}_n $, 63(9)092301
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$ \mathrm {SU}(2) $, 61(7)072103
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$ \mu $, 64(3)031507
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$N$, 61(7)071502, 62(7)072105, 63(5)051505, 63(8)081103,
63(8)083302, 64(5)053502, 64(6)062701, 64(6)063501
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$_n$, 63(7)072301
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$n$, 61(8)082103, 61(8)083102, 61(9)092901, 62(2)021503,
63(12)121502, 64(8)083503, 65(2)022701
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$ (n + 1)$, 63(1)011505
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$ n^2 + 3 $, 63(11)112205
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$ \natural_\alpha $, 63(7)072203, 64(7)079901
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$O$, 61(12)121701, 64(8)081701
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$ \Omega $, 64(10)101705
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$P$, 63(4)043302
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$p$, 61(5)051501, 62(2)022702, 62(5)051507, 62(6)069901,
62(7)071505, 62(12)121506, 62(12)123301, 63(3)031503,
63(6)061503, 63(7)072202, 63(12)121510, 63(12)122204,
64(5)053506, 64(8)082703, 64(10)101503, 64(10)102701,
64(11)113502, 65(9)091502
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$ p \cdot $, 62(11)111506
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$ (p, k) $, 63(4)043303
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$ (p, q) $, 63(11)112704
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$ \psi $, 62(8)082703, 63(10)102706
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$ p(x)$, 61(1)011505
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$q$, 61(4)041701, 61(6)063502, 62(1)013505, 62(3)033505,
62(11)113502, 64(3)032702, 64(5)051701
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$ Q(1) $, 64(8)081704
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$ q_{xx} $, 63(12)123501
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$R$, 63(1)011701, 63(3)032504, 65(5)051701
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$r$, 62(6)063508, 62(10)102302, 63(9)091702, 63(10)101701,
64(1)011702
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$ R^{1 + 1} $, 62(5)051502
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$ \rho $, 62(8)081702
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$ {\rm Cur}({\rm sl}_2 (\mathbb {C})) $, 64(1)011704
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$ {\rm gl}(n) \otimes {\rm gl}(n)$, 62(6)063508
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$ {\rm GL}_q(2) $, 62(7)073504
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$ {\rm O}(3) $, 63(8)081506
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$ {\rm osp}(1 |2) $, 62(4)043502
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$ {\rm SDiff}(S^2) $, 61(1)012301
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$ {\rm SL}_2 $, 62(7)071702
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$ {\rm SL}(2, \mathbb {R}) $, 65(8)081702
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$ {\rm SL}(2, \mathbb {R}) / {\rm U}(1) $, 65(8)081702
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$ {\rm {SO}(3)_p} $, 63(7)072202
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$ {\rm Sp}(N) $, 65(7)071701
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$ {\rm SU} (2) $, 64(3)032104
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$ {\rm SU}(N) $, 62(3)031701
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$ {\rm {SU}(N)} $, 64(2)023504
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$ {\rm U}(1) $, 64(3)032302
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$ {\rm U}(1)_{B - L} $, 62(1)012301
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$ {\rm U}(h) $, 63(6)061701
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$ {\rm U}_q(D^{(3)}_4) $, 63(12)121701
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$ {\rm VOA}[M_4] $, 61(1)012302
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$S$, 62(7)072103
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$s$, 62(2)021702
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$ s l_3 $, 64(11)111702
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$ S L_q^\ast (2) $, 61(6)063504
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$ S O (3) $, 64(11)111702
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$ S O(N) $, 64(10)101701
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$ S U(N) $, 64(10)101701
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$ S^2 $, 63(6)062705
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$ \sigma $, 62(3)033508
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$ sl(7) $, 62(7)072103
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$ (t_2, t_3) $, 63(9)093501
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$ \tau $, 62(1)013508, 64(1)013502
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$ \tilde {SL}(2, \mathbb {R}) $, 63(12)122301, 64(3)032301
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$ \times $, 65(1)013503
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$U$, 64(11)111505, 64(11)113501, 65(1)013501
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$ U(1)^N $, 62(3)032304
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$ (U_q(\mathfrak {su}(1, 1)), \mathfrak {o}_{q^{1 / 2}}(2 n)) $,
61(4)041701
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$ U_q(s l_2^\ast) $, 61(6)063504
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$_V$, 62(6)063501
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$ \varphi^{2 k} $, 61(9)092301
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$ \varphi^4 $, 62(4)042302
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$ \varphi^4_4 $, 65(2)022301
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$ \varphi_4^4 $, 61(11)112304, 63(9)092304
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$ V_D(x) = \min [(x + d)^2, (x - d)^2] $, 64(2)022102
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$ \vee $, 62(2)022301
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$ V_S(x) = \max [(x + d)^2, (x - d)^2] $, 64(2)022102
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$W$, 62(5)051702, 63(5)051701, 64(1)011703
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$ W_{1 + \infty } $, 62(6)063505
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$ W_3 $, 62(8)081701
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$X$, 64(2)022504
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$x$, 62(11)112703
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$ |x - y|^{-2} $, 65(2)023301
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$Z$, 62(4)042204
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$z$, 63(2)021501
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$ Z_2 $, 63(6)061901
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$ Z_2^2 $, 63(9)091704
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$ \zeta $, 63(12)123302
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$ Z_n $, 63(9)091702