| lattice point | 124 | 14 | 8.769 | 0.010117 | 1810.01567,1810.04300,etc |
| inner sep | 227 | 15 | 16.0 | 0.007975 | 1810.04617,1810.00774,etc |
| foreach x | 144 | 11 | 7.6 | 0.006452 | 1810.03580,1810.04909,etc |
| random matrices | 62 | 19 | 3.333 | 0.005516 | 1810.05244,1810.00412,etc |
| Lie algebra | 264 | 48 | 5.596 | 0.005322 | 1810.05562,1810.05114,etc |
| degree sequence | 122 | 12 | 11.0 | 0.004195 | 1810.02693,1810.07518,etc |
| outage probability | 108 | 15 | 6.286 | 0.003571 | 1810.06475,1810.02167,etc |
| optimal control problem | 113 | 21 | 5.35 | 0.003522 | 1810.01181,1810.06064,etc |
| original system | 50 | 23 | 2.182 | 0.003445 | 1810.07723,1810.02763,etc |
| time slot | 110 | 16 | 7.133 | 0.003421 | 1810.05891,1810.04408,etc |
| neural network | 38 | 11 | 3.6 | 0.003365 | 1810.00774,1810.05664,etc |
| prime number | 89 | 28 | 3.259 | 0.002946 | 1810.05244,1810.02922,etc |
| free group | 61 | 18 | 3.412 | 0.002941 | 1810.02692,1810.04235,etc |
| modular form | 130 | 18 | 7.588 | 0.002927 | 1810.02048,1810.07381,etc |
| Theorem A | 64 | 15 | 4.429 | 0.002893 | 1810.03580,1810.07562,etc |
| linear program | 28 | 13 | 2.167 | 0.002779 | 1810.00425,1810.03562,etc |
| total variation distance | 62 | 14 | 4.692 | 0.002668 | 1810.02692,1810.02881,etc |
| periodic solution | 36 | 11 | 3.5 | 0.002623 | 1810.02993,1810.03021,etc |
| item When | 76 | 23 | 3.409 | 0.002595 | 1810.02060,1810.06017,etc |
| large deviation | 82 | 20 | 4.263 | 0.00259 | 1810.02538,1810.01090,etc |
| modulus space | 239 | 35 | 6.853 | 0.002554 | 1810.07027,1810.00961,etc |
| quotient space | 45 | 14 | 3.308 | 0.002523 | 1810.03139,1810.07723,etc |
| compact metric space | 49 | 14 | 3.692 | 0.002455 | 1810.05008,1810.07688,etc |
| initial position | 28 | 11 | 2.7 | 0.002409 | 1810.02886,1810.01324,etc |
| metric space | 169 | 38 | 4.432 | 0.002407 | 1810.02692,1810.01203,etc |
| value function | 139 | 22 | 6.333 | 0.002399 | 1810.01181,1810.06064,etc |
| central limit theorem | 88 | 29 | 3.107 | 0.002335 | 1810.00425,1810.04617,etc |
| weak solution | 145 | 35 | 4.235 | 0.002327 | 1810.01181,1810.02221,etc |
| nonzero element | 90 | 20 | 4.684 | 0.00232 | 1810.05562,1810.02693,etc |
| finite graph | 60 | 24 | 2.565 | 0.002268 | 1810.00246,1810.01558,etc |
| first kind | 51 | 24 | 2.13 | 0.0022 | 1810.03757,1810.03038,etc |
| parabolic subgroup | 75 | 12 | 4.182 | 0.002141 | 1810.04198,1810.06020,etc |
| tangent line | 30 | 11 | 2.7 | 0.002125 | 1810.04909,1810.04343,etc |
| unit interval | 42 | 15 | 2.857 | 0.002073 | 1810.06924,1810.06806,etc |
| spectral radius | 55 | 17 | 2.938 | 0.002037 | 1810.00491,1810.03757,etc |
| large deviation principle | 37 | 11 | 3.5 | 0.002029 | 1810.02538,1810.03580,etc |
| same color | 42 | 11 | 4.0 | 0.002027 | 1810.04390,1810.05580,etc |
| gradient method | 54 | 13 | 4.0 | 0.002017 | 1810.02060,1810.03930,etc |
| feasible solution | 75 | 25 | 3.083 | 0.002007 | 1810.06475,1810.07222,etc |
| symmetric function | 62 | 13 | 4.583 | 0.002003 | 1810.04806,1810.03502,etc |
| point process | 87 | 15 | 4.286 | 0.001966 | 1810.06095,1810.04692,etc |
| singular value | 121 | 37 | 3.306 | 0.001924 | 1810.02807,1810.00412,etc |
| channel estimation | 57 | 13 | 4.583 | 0.001924 | 1810.06938,1810.06150,etc |
| product measure | 33 | 11 | 3.2 | 0.001902 | 1810.07761,1810.01558,etc |
| number field | 99 | 28 | 3.556 | 0.001876 | 1810.05244,1810.04942,etc |
| global solution | 37 | 12 | 3.273 | 0.001873 | 1810.01614,1810.02057,etc |
| elliptic curve | 119 | 19 | 5.889 | 0.001868 | 1810.03632,1810.07381,etc |
| recurrence relation | 57 | 18 | 3.235 | 0.001828 | 1810.07067,1810.02134,etc |
| finite group | 139 | 39 | 3.605 | 0.001827 | 1810.04965,1810.03632,etc |
| finite index | 60 | 18 | 3.471 | 0.001823 | 1810.04965,1810.03632,etc |
| binary tree | 43 | 13 | 3.5 | 0.001822 | 1810.00544,1810.03580,etc |
| Brownian motion | 223 | 41 | 5.45 | 0.001816 | 1810.02538,1810.05629,etc |
| function value | 41 | 13 | 3.167 | 0.001797 | 1810.03930,1810.01285,etc |
| basis element | 52 | 25 | 2.125 | 0.001778 | 1810.00716,1810.07302,etc |
| Gibbs measure | 67 | 14 | 4.923 | 0.001768 | 1810.07761,1810.03580,etc |
| line bundle | 155 | 23 | 7.0 | 0.001768 | 1810.00649,1810.06513,etc |
| symmetry group | 35 | 15 | 2.357 | 0.001758 | 1810.01674,1810.06091,etc |
| unit square | 59 | 19 | 3.222 | 0.001749 | 1810.03139,1810.01028,etc |
| nonlinear system | 54 | 21 | 2.15 | 0.001704 | 1810.04411,1810.04236,etc |
| computational complexity | 128 | 53 | 2.442 | 0.001703 | 1810.02060,1810.00425,etc |
| main term | 23 | 11 | 2.1 | 0.001702 | 1810.01521,1810.01558,etc |
| transmission rate | 50 | 12 | 2.909 | 0.001669 | 1810.06475,1810.06017,etc |
| holomorphic map | 65 | 14 | 4.692 | 0.001663 | 1810.00025,1810.03926,etc |
| optimal solution | 259 | 57 | 4.607 | 0.00166 | 1810.00425,1810.04300,etc |
| direct product | 51 | 21 | 2.5 | 0.001659 | 1810.02692,1810.04965,etc |
| Weyl group | 104 | 24 | 4.0 | 0.001657 | 1810.02703,1810.03396,etc |
| stability condition | 61 | 16 | 3.8 | 0.001652 | 1810.00754,1810.07732,etc |
| spectral gap | 63 | 16 | 2.933 | 0.001642 | 1810.04204,1810.01324,etc |
| complex structure | 157 | 29 | 5.429 | 0.001638 | 1810.07027,1810.04617,etc |
| real root | 37 | 13 | 2.917 | 0.001636 | 1810.05562,1810.05114,etc |
| complete intersection | 44 | 12 | 3.818 | 0.001594 | 1810.00716,1810.00025,etc |
| strong solution | 83 | 16 | 5.333 | 0.00158 | 1810.03585,1810.05098,etc |
| dual problem | 64 | 16 | 4.133 | 0.001573 | 1810.01614,1810.01181,etc |
| local solution | 42 | 16 | 2.667 | 0.00157 | 1810.00491,1810.01614,etc |
| stationary distribution | 53 | 21 | 2.5 | 0.001552 | 1810.03757,1810.02881,etc |
| irreducible representation | 129 | 28 | 2.926 | 0.00155 | 1810.03396,1810.04198,etc |
| gradient descent | 76 | 20 | 3.263 | 0.001548 | 1810.03233,1810.01181,etc |
| convex domain | 32 | 13 | 2.583 | 0.001546 | 1810.06091,1810.01779,etc |
| feasible point | 41 | 12 | 3.636 | 0.00154 | 1810.06475,1810.02057,etc |
| Sobolev space | 132 | 52 | 2.569 | 0.001539 | 1810.04204,1810.02221,etc |
| bipartite graph | 108 | 27 | 3.808 | 0.001536 | 1810.06017,1810.03994,etc |
| source term | 88 | 23 | 3.909 | 0.001524 | 1810.04390,1810.03144,etc |
| boundary value problem | 60 | 30 | 2.034 | 0.001514 | 1810.07027,1810.03144,etc |
| finite element approximation | 31 | 12 | 2.727 | 0.001511 | 1810.04857,1810.02415,etc |
| sufficient condition | 392 | 166 | 2.37 | 0.001509 | 1810.07027,1810.00491,etc |
| Cayley graph | 51 | 14 | 3.769 | 0.001507 | 1810.05114,1810.00544,etc |
| Hecke algebra | 44 | 13 | 3.083 | 0.001501 | 1810.04198,1810.02048,etc |
| functional equation | 68 | 22 | 3.19 | 0.001498 | 1810.05244,1810.06172,etc |
| random matrix | 52 | 15 | 3.643 | 0.001494 | 1810.00412,1810.02881,etc |
| boundary condition | 415 | 107 | 3.887 | 0.001485 | 1810.07027,1810.04390,etc |
| function field | 51 | 11 | 4.0 | 0.001483 | 1810.01219,1810.02637,etc |
| free boundary | 55 | 11 | 5.4 | 0.00148 | 1810.01490,1810.07257,etc |
| basis function | 114 | 35 | 3.265 | 0.001443 | 1810.03144,1810.06806,etc |
| regularization parameter | 33 | 16 | 2.067 | 0.001425 | 1810.02060,1810.06316,etc |
| rational map | 27 | 11 | 2.6 | 0.001404 | 1810.05008,1810.00981,etc |
| formal power series | 36 | 17 | 2.188 | 0.001398 | 1810.07027,1810.02843,etc |
| loss function | 104 | 26 | 4.12 | 0.001383 | 1810.02060,1810.00425,etc |
| convergence rate | 259 | 80 | 3.215 | 0.001368 | 1810.00491,1810.02060,etc |
| dynamical system | 169 | 61 | 2.783 | 0.001365 | 1810.00972,1810.04235,etc |
| conjugacy class | 80 | 23 | 3.227 | 0.001362 | 1810.03396,1810.04732,etc |
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