| homogeneous space | 41 | 14 | 3.0 | 0.012653 | 1612.00059,1612.01146,etc |
| weak equivalence | 141 | 13 | 11.5 | 0.00625 | 1612.00541,1612.00548,etc |
| possible case | 56 | 12 | 5.0 | 0.006241 | 1612.00178,1612.00242,etc |
| rational map | 58 | 13 | 4.5 | 0.005938 | 1612.00154,1612.00191,etc |
| regular graph | 91 | 15 | 6.286 | 0.005268 | 1612.00316,1612.00622,etc |
| Galois group | 142 | 17 | 2.625 | 0.004785 | 1612.01164,1612.01328,etc |
| time slot | 162 | 25 | 6.625 | 0.004708 | 1612.00226,1612.01069,etc |
| equilibrium state | 59 | 12 | 4.273 | 0.004523 | 1612.00798,1612.01004,etc |
| linear model | 45 | 13 | 3.5 | 0.004169 | 1612.00136,1612.00564,etc |
| point process | 110 | 13 | 9.083 | 0.004079 | 1612.00692,1612.00722,etc |
| channel capacity | 72 | 14 | 5.385 | 0.003945 | 1612.00564,1612.01313,etc |
| equivariant map | 34 | 11 | 3.2 | 0.003615 | 1612.01134,1612.01144,etc |
| free energy | 202 | 15 | 12.429 | 0.003523 | 1612.01015,1612.01427,etc |
| harmonic function | 61 | 15 | 4.214 | 0.003359 | 1612.00075,1612.00587,etc |
| minimum size | 103 | 11 | 10.2 | 0.003323 | 1612.00532,1612.00622,etc |
| rational point | 55 | 16 | 3.6 | 0.003278 | 1612.00191,1612.00208,etc |
| analytic function | 79 | 27 | 3.0 | 0.003268 | 1612.00279,1612.00337,etc |
| random number | 44 | 14 | 3.308 | 0.003186 | 1612.00211,1612.00498,etc |
| energy efficiency | 61 | 13 | 4.333 | 0.003186 | 1612.00552,1612.02320,etc |
| mutual information | 109 | 25 | 4.25 | 0.003126 | 1612.00130,1612.00211,etc |
| spectral sequence | 90 | 11 | 8.6 | 0.003097 | 1612.00541,1612.00548,etc |
| first entry | 37 | 13 | 3.0 | 0.00309 | 1612.00059,1612.01169,etc |
| convex hull | 126 | 44 | 2.907 | 0.003046 | 1612.00059,1612.00102,etc |
| stability condition | 74 | 19 | 4.056 | 0.003031 | 1612.00187,1612.00652,etc |
| heat kernel | 73 | 12 | 6.182 | 0.002995 | 1612.00075,1612.00514,etc |
| modulus space | 330 | 35 | 9.647 | 0.002894 | 1612.00354,1612.00652,etc |
| conjugacy class | 199 | 35 | 5.794 | 0.002831 | 1612.00191,1612.00354,etc |
| quadratic form | 99 | 30 | 3.379 | 0.002824 | 1612.00279,1612.00719,etc |
| Green' function | 42 | 11 | 4.1 | 0.002784 | 1612.01127,1612.01244,etc |
| elliptic curve | 115 | 17 | 7.062 | 0.002748 | 1612.01184,1612.01292,etc |
| heat equation | 39 | 13 | 2.583 | 0.002745 | 1612.00075,1612.00321,etc |
| iterative method | 46 | 11 | 3.6 | 0.002676 | 1612.00090,1612.00131,etc |
| spectral efficiency | 65 | 22 | 3.0 | 0.00267 | 1612.00131,1612.01069,etc |
| transfer function | 55 | 12 | 4.909 | 0.00267 | 1612.02174,1612.02925,etc |
| normal form | 94 | 13 | 7.417 | 0.002664 | 1612.00432,1612.00577,etc |
| Hausdorff dimension | 146 | 19 | 8.056 | 0.002638 | 1612.00139,1612.00209,etc |
| Cayley graph | 60 | 12 | 5.182 | 0.00262 | 1612.00903,1612.01360,etc |
| error bound | 55 | 15 | 3.714 | 0.002615 | 1612.00054,1612.00661,etc |
| binary tree | 68 | 12 | 2.091 | 0.002603 | 1612.01352,1612.02385,etc |
| dynamical system | 138 | 41 | 3.4 | 0.00257 | 1612.00073,1612.00090,etc |
| boundary component | 81 | 21 | 3.75 | 0.002544 | 1612.00432,1612.00665,etc |
| adjacency matrix | 52 | 19 | 2.667 | 0.002504 | 1612.00145,1612.00201,etc |
| base station | 111 | 30 | 3.759 | 0.0025 | 1612.00131,1612.00552,etc |
| critical point | 203 | 48 | 4.298 | 0.002489 | 1612.00093,1612.00321,etc |
| step size | 98 | 29 | 3.464 | 0.002483 | 1612.00078,1612.00150,etc |
| random graph | 142 | 18 | 8.0 | 0.002476 | 1612.00622,1612.00650,etc |
| lattice point | 47 | 18 | 2.706 | 0.002448 | 1612.01144,1612.02581,etc |
| Dirichlet boundary condition | 75 | 31 | 2.033 | 0.002443 | 1612.00066,1612.00187,etc |
| vector bundle | 169 | 29 | 5.75 | 0.002419 | 1612.00208,1612.00652,etc |
| singular value | 137 | 28 | 5.037 | 0.002406 | 1612.00564,1612.00823,etc |
| greedy algorithm | 46 | 13 | 3.75 | 0.002373 | 1612.01189,1612.01980,etc |
| polynomial time | 46 | 11 | 4.4 | 0.002303 | 1612.00622,1612.01189,etc |
| initial value problem | 65 | 21 | 3.15 | 0.002291 | 1612.00175,1612.00358,etc |
| spectral radius | 61 | 16 | 4.0 | 0.00226 | 1612.00090,1612.00207,etc |
| channel estimation | 70 | 14 | 5.308 | 0.002244 | 1612.01114,1612.02113,etc |
| fundamental solution | 38 | 15 | 2.571 | 0.002218 | 1612.00337,1612.00358,etc |
| Neumann boundary condition | 47 | 13 | 3.5 | 0.002183 | 1612.00066,1612.01004,etc |
| gradient flow | 44 | 12 | 3.909 | 0.002174 | 1612.00354,1612.00514,etc |
| central limit theorem | 61 | 26 | 2.4 | 0.002166 | 1612.01520,1612.01980,etc |
| holomorphic function | 59 | 16 | 3.867 | 0.002157 | 1612.00597,1612.00925,etc |
| Euler-Lagrange equation | 44 | 11 | 4.3 | 0.002133 | 1612.00803,1612.01427,etc |
| planar graph | 50 | 14 | 3.769 | 0.002116 | 1612.00622,1612.02158,etc |
| wave equation | 110 | 15 | 7.786 | 0.00209 | 1612.00332,1612.00358,etc |
| Lipschitz function | 49 | 15 | 3.357 | 0.002078 | 1612.00077,1612.00869,etc |
| complete graph | 105 | 40 | 2.231 | 0.002078 | 1612.00102,1612.00316,etc |
| ground state | 84 | 11 | 8.1 | 0.002037 | 1612.00358,1612.00682,etc |
| geodesic flow | 43 | 11 | 4.0 | 0.002016 | 1612.01911,1612.02457,etc |
| objective function | 197 | 65 | 3.062 | 0.002014 | 1612.00136,1612.00150,etc |
| medskip noindent | 50 | 14 | 3.615 | 0.002004 | 1612.00798,1612.01882,etc |
| wireless network | 41 | 15 | 2.857 | 0.002 | 1612.00552,1612.01114,etc |
| weak solution | 121 | 32 | 3.839 | 0.001984 | 1612.00175,1612.00798,etc |
| tubular neighborhood | 82 | 11 | 8.1 | 0.001982 | 1612.01813,1612.01962,etc |
| finite graph | 57 | 21 | 2.8 | 0.001949 | 1612.00145,1612.00435,etc |
| Lyapunov function | 42 | 18 | 2.412 | 0.001932 | 1612.00936,1612.01427,etc |
| partial order | 84 | 31 | 2.767 | 0.001921 | 1612.00097,1612.00252,etc |
| linear regression | 27 | 13 | 2.167 | 0.001917 | 1612.01430,1612.02099,etc |
| achievable rate | 85 | 25 | 3.375 | 0.001916 | 1612.00211,1612.00552,etc |
| finite extension | 31 | 12 | 2.727 | 0.00189 | 1612.00208,1612.01077,etc |
| finite group | 116 | 34 | 3.424 | 0.00189 | 1612.00284,1612.00792,etc |
| integral operator | 58 | 13 | 4.583 | 0.001877 | 1612.00727,1612.01747,etc |
| fundamental group | 107 | 31 | 3.5 | 0.001868 | 1612.00145,1612.00432,etc |
| unitary matrix | 40 | 11 | 3.9 | 0.00186 | 1612.00131,1612.02202,etc |
| singular point | 95 | 28 | 3.407 | 0.001856 | 1612.00337,1612.00577,etc |
| function field | 29 | 13 | 2.333 | 0.001849 | 1612.01077,1612.01098,etc |
| Fourier coefficient | 61 | 16 | 4.0 | 0.001847 | 1612.00925,1612.01004,etc |
| local coordinate | 55 | 19 | 3.0 | 0.001822 | 1612.00059,1612.00354,etc |
| tangent space | 85 | 37 | 2.333 | 0.00182 | 1612.00354,1612.00564,etc |
| affine transformation | 23 | 11 | 2.2 | 0.0018 | 1612.00238,1612.01882,etc |
| inverse problem | 56 | 14 | 4.231 | 0.001789 | 1612.01419,1612.01459,etc |
| Theorem A | 43 | 12 | 3.818 | 0.001786 | 1612.00093,1612.00785,etc |
| Riemannian manifold | 73 | 28 | 2.667 | 0.001781 | 1612.00279,1612.00514,etc |
| projective space | 54 | 19 | 2.944 | 0.001771 | 1612.00154,1612.01098,etc |
| commutative ring | 35 | 17 | 2.125 | 0.001744 | 1612.00541,1612.01924,etc |
| stochastic differential equation | 37 | 15 | 2.571 | 0.00174 | 1612.00077,1612.00722,etc |
| asymptotic behaviour | 74 | 32 | 2.323 | 0.001732 | 1612.00196,1612.00512,etc |
| global solution | 29 | 13 | 2.333 | 0.001725 | 1612.00798,1612.02302,etc |
| relative error | 92 | 23 | 4.136 | 0.001721 | 1612.00127,1612.00150,etc |
| periodic orbit | 74 | 14 | 5.615 | 0.001702 | 1612.00093,1612.00187,etc |
| Poisson point process | 49 | 12 | 4.364 | 0.001691 | 1612.00238,1612.00692,etc |
| Galois extension | 77 | 12 | 6.727 | 0.001663 | 1612.01164,1612.01821,etc |
|