An energy decomposition theorem for matrices and related questions
Abstract
Given A⊂eq GL2(Fq), we prove that there exist disjoint subsets B, C⊂eq A such that A = B C and their additive and multiplicative energies satisfying \[ \\,E+(B),\, E×(C)\,\ |A|3M(|A|), \] where equation* eqn:MAminBVPolyLSSS M(|A|) = \\,q4/3|A|1/3(|A|)2/3,\, |A|4/5q13/5(|A|)27/10\,\. equation* We also study some related questions on moderate expanders over matrix rings, namely, for A, B, C⊂eq GL2(Fq), we have \[|AB+C|, ~|(A+B)C| q4,\] whenever |A||B||C| q10 + 1/2. These improve earlier results due to Karabulut, Koh, Pham, Shen, and Vinh (2019).
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