| foreach x | 175 | 11 | 17.2 | 0.009848 | 1907.00192,1907.02367,etc |
| periodic orbit | 108 | 14 | 6.538 | 0.007307 | 1907.01161,1907.01178,etc |
| representation formula | 40 | 11 | 2.2 | 0.006234 | 1907.00091,1907.01410,etc |
| free boundary | 164 | 16 | 10.333 | 0.005656 | 1907.00833,1907.01148,etc |
| line width | 237 | 11 | 18.7 | 0.005058 | 1907.00192,1907.00347,etc |
| convex domain | 41 | 15 | 2.857 | 0.004268 | 1907.00303,1907.00739,etc |
| planar graph | 166 | 19 | 9.111 | 0.004246 | 1907.00210,1907.00351,etc |
| Ricci curvature | 49 | 13 | 3.917 | 0.004216 | 1907.00834,1907.01182,etc |
| achievable rate | 53 | 13 | 3.167 | 0.004105 | 1907.00386,1907.01133,etc |
| harmonic function | 86 | 21 | 4.25 | 0.003841 | 1907.01440,1907.01444,etc |
| universal property | 78 | 29 | 2.75 | 0.003778 | 1907.00229,1907.00375,etc |
| regular graph | 103 | 20 | 5.368 | 0.003684 | 1907.01605,1907.01685,etc |
| irreducible component | 170 | 23 | 7.5 | 0.003499 | 1907.00024,1907.00815,etc |
| line bundle | 136 | 24 | 5.87 | 0.003427 | 1907.00024,1907.00384,etc |
| step size | 104 | 26 | 2.12 | 0.003391 | 1907.00191,1907.00289,etc |
| gradient method | 50 | 11 | 3.7 | 0.003318 | 1907.00880,1907.01200,etc |
| gradient flow | 85 | 16 | 5.4 | 0.003293 | 1907.01194,1907.02152,etc |
| stochastic process | 146 | 38 | 3.919 | 0.003255 | 1907.00557,1907.00779,etc |
| approximate solution | 92 | 45 | 2.068 | 0.003144 | 1907.00191,1907.00447,etc |
| tangent bundle | 57 | 28 | 2.037 | 0.002977 | 1907.00066,1907.00092,etc |
| Euler equation | 40 | 13 | 3.167 | 0.002871 | 1907.01182,1907.01711,etc |
| first component | 53 | 26 | 2.08 | 0.002866 | 1907.00024,1907.00251,etc |
| singular value | 145 | 34 | 3.939 | 0.002862 | 1907.00138,1907.00393,etc |
| free group | 87 | 16 | 5.267 | 0.002812 | 1907.00243,1907.01440,etc |
| smooth manifold | 75 | 33 | 2.312 | 0.002742 | 1907.00066,1907.00373,etc |
| formal power series | 57 | 17 | 3.438 | 0.002629 | 1907.00099,1907.00188,etc |
| optimal control | 77 | 21 | 3.8 | 0.002623 | 1907.00017,1907.00667,etc |
| Markov chain | 145 | 31 | 4.633 | 0.002613 | 1907.00257,1907.00399,etc |
| spectral sequence | 123 | 14 | 9.154 | 0.002532 | 1907.01091,1907.01156,etc |
| optimal solution | 347 | 75 | 4.662 | 0.002497 | 1907.00138,1907.00255,etc |
| conjugacy class | 94 | 21 | 4.4 | 0.002467 | 1907.00933,1907.01438,etc |
| modular form | 43 | 11 | 3.9 | 0.002455 | 1907.00188,1907.01535,etc |
| simplicial complex | 49 | 12 | 2.091 | 0.002451 | 1907.00257,1907.01091,etc |
| Lie algebra | 183 | 43 | 4.333 | 0.002436 | 1907.00066,1907.00384,etc |
| intersection number | 55 | 14 | 3.923 | 0.002425 | 1907.01091,1907.02898,etc |
| positive semi-definite | 40 | 17 | 2.438 | 0.002378 | 1907.00191,1907.01027,etc |
| time slot | 139 | 16 | 8.867 | 0.00233 | 1907.01064,1907.01349,etc |
| diffusion process | 67 | 19 | 3.667 | 0.002328 | 1907.00017,1907.00254,etc |
| Lie group | 88 | 27 | 3.346 | 0.002286 | 1907.00375,1907.00732,etc |
| basis function | 108 | 28 | 3.963 | 0.002271 | 1907.00091,1907.00303,etc |
| complex structure | 141 | 16 | 8.467 | 0.002264 | 1907.00092,1907.00732,etc |
| matrix form | 28 | 14 | 2.077 | 0.00222 | 1907.00303,1907.00406,etc |
| confidence interval | 64 | 12 | 5.727 | 0.002209 | 1907.01110,1907.01781,etc |
| mutual information | 73 | 20 | 3.789 | 0.002154 | 1907.00365,1907.00527,etc |
| posterior distribution | 74 | 13 | 5.833 | 0.002135 | 1907.01358,1907.01781,etc |
| modulus space | 297 | 40 | 7.462 | 0.002115 | 1907.00024,1907.00188,etc |
| information theory | 36 | 14 | 2.692 | 0.002115 | 1907.00288,1907.00393,etc |
| finite type | 73 | 22 | 3.381 | 0.002108 | 1907.00384,1907.00826,etc |
| normal subgroup | 65 | 16 | 4.2 | 0.002084 | 1907.02898,1907.02922,etc |
| line segment | 95 | 36 | 2.686 | 0.00208 | 1907.00091,1907.00453,etc |
| orthogonal polynomial | 84 | 18 | 4.882 | 0.002079 | 1907.00091,1907.00407,etc |
| input datum | 42 | 11 | 4.0 | 0.002002 | 1907.00312,1907.00718,etc |
| number field | 46 | 12 | 4.091 | 0.001986 | 1907.01336,1907.02049,etc |
| heat kernel | 33 | 11 | 3.2 | 0.001948 | 1907.00453,1907.01410,etc |
| analytic solution | 40 | 17 | 2.438 | 0.001922 | 1907.00406,1907.00667,etc |
| neural network | 101 | 23 | 4.545 | 0.001905 | 1907.00718,1907.00806,etc |
| finite element method | 67 | 27 | 2.5 | 0.001871 | 1907.00084,1907.00303,etc |
| convergence rate | 300 | 74 | 4.041 | 0.00187 | 1907.00167,1907.00303,etc |
| weak topology | 26 | 11 | 2.1 | 0.001869 | 1907.00017,1907.00453,etc |
| cost function | 90 | 35 | 2.529 | 0.001821 | 1907.00191,1907.00316,etc |
| transition probability | 50 | 18 | 2.824 | 0.001803 | 1907.00655,1907.00928,etc |
| random field | 70 | 15 | 4.143 | 0.001787 | 1907.00349,1907.00806,etc |
| characteristic polynomial | 66 | 21 | 3.25 | 0.001786 | 1907.01009,1907.02465,etc |
| finite field | 98 | 29 | 3.429 | 0.001785 | 1907.00280,1907.00323,etc |
| value function | 80 | 20 | 4.105 | 0.001766 | 1907.02261,1907.02429,etc |
| regularity condition | 37 | 16 | 2.4 | 0.001745 | 1907.00257,1907.01306,etc |
| global existence | 51 | 14 | 3.846 | 0.00173 | 1907.01412,1907.02249,etc |
| Lyapunov function | 40 | 12 | 2.909 | 0.001724 | 1907.00655,1907.02414,etc |
| stationary solution | 51 | 15 | 3.5 | 0.001713 | 1907.00833,1907.01148,etc |
| nonlinear equation | 52 | 19 | 2.556 | 0.001698 | 1907.00406,1907.01498,etc |
| generic point | 39 | 11 | 3.2 | 0.001697 | 1907.00024,1907.00721,etc |
| continuous map | 146 | 42 | 3.537 | 0.001696 | 1907.00066,1907.00092,etc |
| asymptotic expansion | 131 | 26 | 5.12 | 0.001695 | 1907.00507,1907.01428,etc |
| partition function | 71 | 12 | 5.273 | 0.001685 | 1907.00407,1907.01054,etc |
| imaginary part | 76 | 30 | 2.414 | 0.001666 | 1907.00084,1907.00669,etc |
| ground state | 65 | 17 | 4.0 | 0.001659 | 1907.00447,1907.00926,etc |
| initial condition | 338 | 116 | 2.922 | 0.001656 | 1907.00084,1907.00138,etc |
| numerical method | 126 | 61 | 2.083 | 0.001655 | 1907.00167,1907.00200,etc |
| magnetic field | 88 | 14 | 6.538 | 0.001652 | 1907.00084,1907.00629,etc |
| error probability | 73 | 13 | 5.917 | 0.001614 | 1907.00386,1907.00393,etc |
| discrete scheme | 26 | 11 | 2.5 | 0.001606 | 1907.00167,1907.00406,etc |
| spectral efficiency | 69 | 11 | 6.8 | 0.001597 | 1907.00365,1907.02361,etc |
| Riemannian manifold | 134 | 40 | 3.179 | 0.001579 | 1907.00702,1907.00834,etc |
| time scale | 25 | 11 | 2.4 | 0.001579 | 1907.01530,1907.01799,etc |
| critical point | 290 | 67 | 4.379 | 0.001575 | 1907.00200,1907.00284,etc |
| complete graph | 115 | 43 | 2.69 | 0.001553 | 1907.00210,1907.00234,etc |
| boundary value problem | 56 | 23 | 2.5 | 0.001548 | 1907.01091,1907.02023,etc |
| geodesic distance | 24 | 11 | 2.3 | 0.001538 | 1907.00296,1907.01379,etc |
| finite element approximation | 32 | 15 | 2.214 | 0.001536 | 1907.00406,1907.00440,etc |
| lattice point | 50 | 15 | 3.5 | 0.001523 | 1907.00105,1907.01080,etc |
| decay rate | 51 | 17 | 3.125 | 0.001516 | 1907.00349,1907.00806,etc |
| rational function | 114 | 30 | 3.897 | 0.001513 | 1907.00024,1907.00347,etc |
| simplicial set | 46 | 13 | 2.75 | 0.001504 | 1907.00257,1907.00702,etc |
| homotopy equivalent | 37 | 13 | 3.0 | 0.001495 | 1907.00066,1907.00092,etc |
| covariance matrix | 107 | 35 | 3.029 | 0.001489 | 1907.00386,1907.00723,etc |
| free energy | 58 | 14 | 4.385 | 0.001482 | 1907.00167,1907.00453,etc |
| Brownian motion | 93 | 34 | 2.576 | 0.001474 | 1907.00446,1907.00806,etc |
| notag & | 99 | 20 | 5.158 | 0.001459 | 1907.00387,1907.00393,etc |
| spectral radius | 52 | 19 | 2.833 | 0.001456 | 1907.00229,1907.00234,etc |
| integral representation | 34 | 14 | 2.538 | 0.001453 | 1907.01217,1907.02492,etc |
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