Mixed-Mean Inequality for Submatrix

Abstract

For a m× n matrix B=(bij)m× n with nonnegative entries bij and any k× l-submatrix Bij of B, let aBij and gBij denote the arithmetic mean and geometric mean of elements of Bij respectively. It is proved that if k is an integer in (m2, m] and l is an integer in (n2, n] respectively, then (Πi=k,j=l Bij⊂ BaBij)1Cmk· Cnl ≥1Cmk· Cnl(Σi=k,j=l Bij⊂ BgBij), with equality if and only if bij is a constant for every i,j.