| unit disc | 29 | 12 | 2.545 | 0.005663 | 1802.04312,1802.02443,etc |
| Hausdorff dimension | 93 | 11 | 9.0 | 0.005291 | 1802.03834,1802.00350,etc |
| curvature flow | 76 | 11 | 5.9 | 0.004748 | 1802.06304,1802.01423,etc |
| equilibrium state | 65 | 12 | 5.818 | 0.004615 | 1802.05509,1802.01965,etc |
| Lie algebra | 291 | 39 | 7.447 | 0.004484 | 1802.07150,1802.06487,etc |
| Lagrange multiplier | 126 | 32 | 4.032 | 0.004023 | 1802.06482,1802.02098,etc |
| invariant set | 42 | 11 | 4.1 | 0.003954 | 1802.04137,1802.05295,etc |
| general position | 36 | 14 | 2.538 | 0.003948 | 1802.00716,1802.00702,etc |
| compact metric space | 69 | 17 | 4.25 | 0.00383 | 1802.03834,1802.07125,etc |
| noindent Let | 70 | 25 | 2.167 | 0.003577 | 1802.03719,1802.03834,etc |
| inverse image | 51 | 17 | 3.0 | 0.003533 | 1802.00582,1802.04602,etc |
| unit circle | 72 | 30 | 2.448 | 0.003527 | 1802.06812,1802.01864,etc |
| velocity field | 87 | 16 | 5.533 | 0.003338 | 1802.06388,1802.03215,etc |
| rate function | 62 | 12 | 5.273 | 0.003127 | 1802.03960,1802.06434,etc |
| strong convexity | 43 | 12 | 3.727 | 0.00299 | 1802.04084,1802.02724,etc |
| optimal control problem | 76 | 18 | 4.353 | 0.002953 | 1802.04981,1802.04978,etc |
| bipartite graph | 54 | 16 | 2.333 | 0.002874 | 1802.07332,1802.03648,etc |
| residue field | 31 | 13 | 2.5 | 0.00285 | 1802.06904,1802.04999,etc |
| convex hull | 144 | 50 | 2.898 | 0.002824 | 1802.04860,1802.00619,etc |
| critical point | 309 | 62 | 4.82 | 0.002813 | 1802.02551,1802.05967,etc |
| permutation matrix | 40 | 12 | 3.182 | 0.002797 | 1802.00963,1802.01023,etc |
| periodic orbit | 61 | 14 | 4.615 | 0.002751 | 1802.05967,1802.06364,etc |
| linear map | 135 | 58 | 2.316 | 0.002748 | 1802.07150,1802.03648,etc |
| number field | 59 | 13 | 4.5 | 0.002675 | 1802.06923,1802.06904,etc |
| outage probability | 52 | 12 | 4.545 | 0.002649 | 1802.06543,1802.03809,etc |
| normal form | 73 | 12 | 6.455 | 0.002635 | 1802.05967,1802.06812,etc |
| long exact sequence | 39 | 17 | 2.312 | 0.002565 | 1802.00716,1802.06978,etc |
| singular point | 135 | 30 | 4.586 | 0.002551 | 1802.06487,1802.05557,etc |
| convex set | 57 | 14 | 3.231 | 0.002526 | 1802.06482,1802.06475,etc |
| Lie group | 136 | 23 | 5.591 | 0.002524 | 1802.07150,1802.04468,etc |
| elliptic curve | 94 | 13 | 7.583 | 0.002493 | 1802.06487,1802.04999,etc |
| Bessel function | 58 | 18 | 3.176 | 0.002437 | 1802.00321,1802.04357,etc |
| time slot | 99 | 17 | 5.25 | 0.002424 | 1802.02727,1802.00917,etc |
| modulus space | 234 | 32 | 7.419 | 0.002422 | 1802.04999,1802.04862,etc |
| phase space | 61 | 26 | 2.4 | 0.002342 | 1802.01965,1802.05295,etc |
| channel estimation | 66 | 16 | 4.267 | 0.002339 | 1802.00929,1802.00252,etc |
| second kind | 63 | 23 | 2.5 | 0.002311 | 1802.00716,1802.02641,etc |
| spectral sequence | 157 | 17 | 9.125 | 0.002252 | 1802.00716,1802.00732,etc |
| error probability | 26 | 12 | 2.273 | 0.00225 | 1802.07332,1802.01133,etc |
| bilinear form | 109 | 40 | 2.769 | 0.002175 | 1802.07150,1802.00963,etc |
| cost function | 109 | 32 | 3.323 | 0.00217 | 1802.06094,1802.04978,etc |
| invariant measure | 86 | 26 | 3.4 | 0.002115 | 1802.06364,1802.04436,etc |
| Poisson point process | 46 | 11 | 3.9 | 0.002088 | 1802.04046,1802.01132,etc |
| singular value | 85 | 31 | 2.733 | 0.002057 | 1802.02960,1802.04963,etc |
| diffusion term | 36 | 12 | 2.909 | 0.002037 | 1802.04039,1802.06268,etc |
| first kind | 53 | 24 | 2.174 | 0.001999 | 1802.02715,1802.00716,etc |
| positive solution | 38 | 17 | 2.25 | 0.001987 | 1802.05967,1802.00843,etc |
| boundary component | 82 | 17 | 5.0 | 0.001978 | 1802.00716,1802.05705,etc |
| extreme point | 46 | 11 | 4.4 | 0.001972 | 1802.03849,1802.01344,etc |
| homology group | 37 | 17 | 2.25 | 0.001939 | 1802.03655,1802.02551,etc |
| base station | 94 | 31 | 2.7 | 0.001936 | 1802.04206,1802.03809,etc |
| cohomology class | 51 | 19 | 2.722 | 0.001932 | 1802.00582,1802.00716,etc |
| condition number | 112 | 29 | 3.929 | 0.001901 | 1802.04981,1802.00602,etc |
| equivalence relation | 94 | 47 | 2.022 | 0.001894 | 1802.07588,1802.03834,etc |
| Galois group | 43 | 12 | 3.0 | 0.001866 | 1802.01023,1802.06107,etc |
| optimal solution | 333 | 63 | 5.323 | 0.001837 | 1802.06482,1802.00619,etc |
| Cartesian product | 39 | 16 | 2.533 | 0.001832 | 1802.05359,1802.04649,etc |
| dynamical system | 171 | 53 | 3.25 | 0.001828 | 1802.06364,1802.03187,etc |
| vector field | 316 | 68 | 4.701 | 0.001825 | 1802.00831,1802.05967,etc |
| tangent space | 98 | 28 | 3.37 | 0.001821 | 1802.07150,1802.06304,etc |
| basis function | 107 | 30 | 3.655 | 0.001818 | 1802.05242,1802.04981,etc |
| convex function | 107 | 49 | 2.208 | 0.001816 | 1802.06482,1802.01965,etc |
| linear code | 31 | 11 | 2.4 | 0.001809 | 1802.01133,1802.00148,etc |
| Euler-Lagrange equation | 34 | 14 | 2.538 | 0.001806 | 1802.04197,1802.01735,etc |
| real root | 36 | 12 | 3.182 | 0.001789 | 1802.05967,1802.02390,etc |
| convergence rate | 218 | 74 | 2.959 | 0.001785 | 1802.04079,1802.06388,etc |
| minimum distance | 32 | 15 | 2.214 | 0.00177 | 1802.04206,1802.00963,etc |
| item If | 290 | 105 | 2.779 | 0.001757 | 1802.00831,1802.00582,etc |
| Main Theorem | 29 | 13 | 2.333 | 0.001728 | 1802.04197,1802.01965,etc |
| mapping class group | 43 | 11 | 4.0 | 0.001728 | 1802.02715,1802.06376,etc |
| energy efficiency | 51 | 16 | 3.333 | 0.001724 | 1802.05968,1802.06543,etc |
| time step | 193 | 51 | 3.82 | 0.001713 | 1802.06388,1802.03559,etc |
| initial datum | 334 | 56 | 6.0 | 0.001689 | 1802.05509,1802.04981,etc |
| homotopy type | 59 | 16 | 3.133 | 0.001678 | 1802.03655,1802.00716,etc |
| tangent vector | 60 | 20 | 3.053 | 0.001676 | 1802.01952,1802.01165,etc |
| Cauchy problem | 71 | 23 | 3.091 | 0.001671 | 1802.04860,1802.06388,etc |
| Navier-Stokes equation | 51 | 12 | 4.545 | 0.001653 | 1802.06268,1802.02035,etc |
| adjacency matrix | 36 | 17 | 2.188 | 0.001644 | 1802.05359,1802.06482,etc |
| optimization problem | 296 | 87 | 3.395 | 0.001636 | 1802.06957,1802.06094,etc |
| line bundle | 55 | 18 | 3.176 | 0.001635 | 1802.04999,1802.06107,etc |
| topological space | 125 | 51 | 2.34 | 0.00163 | 1802.07588,1802.03655,etc |
| quadrature rule | 33 | 12 | 2.909 | 0.001621 | 1802.06388,1802.02035,etc |
| distribution function | 56 | 25 | 2.25 | 0.0016 | 1802.04355,1802.04590,etc |
| finite extension | 50 | 18 | 2.882 | 0.001572 | 1802.01023,1802.06668,etc |
| invariant subspace | 54 | 14 | 4.077 | 0.001552 | 1802.07150,1802.06812,etc |
| Theorem A | 30 | 11 | 2.8 | 0.001551 | 1802.06923,1802.06304,etc |
| stability analysis | 36 | 17 | 2.188 | 0.001547 | 1802.06388,1802.00825,etc |
| neural network | 32 | 12 | 2.818 | 0.001543 | 1802.04860,1802.04741,etc |
| group action | 38 | 17 | 2.312 | 0.001542 | 1802.06487,1802.00716,etc |
| inverse limit | 57 | 13 | 4.333 | 0.001542 | 1802.02440,1802.05398,etc |
| total variation | 60 | 19 | 3.278 | 0.001538 | 1802.06364,1802.07125,etc |
| infinite family | 44 | 19 | 2.389 | 0.001535 | 1802.05770,1802.01165,etc |
| linear system | 234 | 69 | 3.426 | 0.001524 | 1802.05242,1802.05359,etc |
| achievable rate | 70 | 26 | 2.76 | 0.001521 | 1802.01133,1802.01061,etc |
| step size | 105 | 36 | 2.943 | 0.001503 | 1802.06760,1802.00708,etc |
| eigenvalue problem | 86 | 22 | 4.048 | 0.001502 | 1802.06812,1802.01842,etc |
| nonlinear function | 34 | 15 | 2.357 | 0.001496 | 1802.04860,1802.01965,etc |
| linear programming | 26 | 12 | 2.273 | 0.001491 | 1802.07598,1802.02567,etc |
| exact solution | 136 | 52 | 2.627 | 0.001482 | 1802.06388,1802.04039,etc |
| conjugacy class | 123 | 26 | 4.88 | 0.001476 | 1802.06923,1802.05705,etc |
|