Counting Spectral Radii of Matrices with Positive Entries
Abstract
The sum-product conjecture of Erd os and Szemer\'edi states that, given a finite set A of positive numbers, one can find asymptotic lower bounds for \|A+A|,|A· A|\ of the order of |A|1+δ for every δ <1. In this paper we consider the set of all spectral radii of n× n matrices with entries in A, and find lower bounds for the cardinality of this set. In the case n=2, this cardinality is necessarily larger than \|A+A|,|A· A|\.
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