ContHutch++: Stochastic trace estimation for implicit integral operators
Abstract
Hutchinson's estimator is a randomized algorithm that computes an ε-approximation to the trace of any positive semidefinite matrix using O(1/ε2) matrix-vector products. An improvement of Hutchinson's estimator, known as Hutch++, only requires O(1/ε) matrix-vector products. In this paper, we propose a generalization of Hutch++, which we call ContHutch++, that uses operator-function products to efficiently estimate the trace of any trace-class integral operator. Our ContHutch++ estimates avoid spectral artifacts introduced by discretization and are accompanied by rigorous high-probability error bounds. We use ContHutch++ to derive a new high-order accurate algorithm for quantum density-of-states and also show how it can estimate electromagnetic fields induced by incoherent sources.
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