The quintic complex moment problem

Abstract

Let γ(m) \ γij \0 ≤ i +j ≤ m be a given complex-valued sequence. The truncated complex moment problem (TCMP in short) involves determining necessary and sufficient conditions for the existence of a positive Borel measure μ on C (called a representing measure for γ(m)) such that γij = ∫ zi zj dμ for 0 ≤ i +j ≤ m. The TCMP has been completely solved only when m= 1, 2, 3, 4. We provide in this paper a concrete solution to the quintic TCMP (that is, when m = 5). We also study the cardinality of the minimal representing measure. Based on the bivariate recurrences sequences's properties with some Curto-Fialkow's results, our method intended to be useful for all odd-degree moment problems.