Concrete Solution to the Nonsingular Quartic Binary Moment Problem

Abstract

Given real numbers β β ( 4) β00, β 10, β 01, β 20, β 11, β 02, β 30, β 21, β 12, β 03, β 40, β 31, β 22, β 13, β 04, with β 00 >0, the quartic real moment problem for β entails finding conditions for the existence of a positive Borel measure μ , supported in R2, such that β ij=∫ sitj\,dμ \;\;(0≤ i+j≤ 4) . Let M(2) be the 6 x 6 moment matrix for β(4), given by M(2)i,j:=βi+j, where i,j ∈ Z2+ and |i|,|j| 2. In this note we find concrete representing measures for β(4) when M(2) is nonsingular; moreover, we prove that it is possible to ensure that one such representing measure is 6-atomic.