Fast Approximate Determinants Using Rational Functions

Abstract

We show how rational function approximations to the logarithm, such as z ≈ (z2 - 1)/(z2 + 6z + 1), can be turned into fast algorithms for approximating the determinant of a very large matrix. We empirically demonstrate that when combined with a good preconditioner, the third order rational function approximation offers a very good trade-off between speed and accuracy when measured on matrices coming from Mat\'ern-5/2 and radial basis function Gaussian process kernels. In particular, it is significantly more accurate on those matrices than the state-of-the-art stochastic Lanczos quadrature method for approximating determinants while running at about the same speed.

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