Some sum-product estimates in matrix rings over finite fields

Abstract

We study some sum-product problems over matrix rings. Firstly, for A, B, C⊂eq Mn(Fq), we have |A+BC| qn2, whenever |A||B||C| q3n2-n+12. Secondly, if a set A in Mn(Fq) satisfies |A|≥ C(n)qn2-1 for some sufficiently large C(n), then we have \|A+A|, |AA|\ \|A|2qn2-n+14, qn2/3|A|2/3\. These improve the results due to The and Vinh (2020), and generalize the results due to Mohammadi, Pham, and Wang (2021). We also give a new proof for a recent result due to The and Vinh (2020). Our method is based on spectral graph theory and linear algebra.