Estimating the matrix p → q norm
Abstract
The matrix p → q norm is a fundamental quantity appearing in a variety of areas of mathematics. This quantity is known to be efficiently computable in only a few special cases. The best known algorithms for approximately computing this quantity with theoretical guarantees essentially consist of computing the p q norm for p,q where this quantity can be computed exactly or up to a constant, and applying interpolation. We analyze the matrix 2 q norm problem and provide an improved approximation algorithm via a simple argument involving the rows of a given matrix. For example, we improve the best-known 2 4 norm approximation from m1/8 to m1/12. This insight for the 2 q norm improves the best known p q approximation algorithm for the region p 2 q, and leads to an overall improvement in the best-known approximation for p q norms from m25/128 to m3 - 2 2.
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