The paper introduces an infinite-dimensional analog of the randomized Nyström approximation to compute low-rank approximations of non-negative self-adjoint trace-class operators. The key contributions are:
Analysis of the finite-dimensional Nyström approximation with correlated Gaussian sketches: The authors derive expectation and probability bounds on the approximation error in the Frobenius, spectral, and nuclear norms. This generalizes existing results that assume standard Gaussian sketches.
Infinite-dimensional extension of the Nyström approximation: The authors present an infinite-dimensional analog of the Nyström approximation for Hilbert-Schmidt operators and provide an analysis of the approximation error.
Improved analysis of the infinite-dimensional randomized SVD: As a byproduct, the authors improve the existing bounds for the infinite-dimensional randomized SVD, making them match the finite-dimensional results.
The analysis relies on properties of Gaussian processes and Hilbert-Schmidt operators. Numerical experiments for simple integral operators validate the proposed framework.
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