On a Waring's problem for integral quadratic and hermitian forms

Abstract

For each positive integer n, let g Z(n) be the smallest integer such that if an integral quadratic form in n variables can be written as a sum of squares of integral linear forms, then it can be written as a sum of g Z(n) squares of integral linear forms. We show that as n goes to infinity, the growth of g Z(n) is at most an exponential of n. Our result improves the best known upper bound on g Z(n) which is in the order of an exponential of n. We also define an analogous number g O*(n) for writing hermitian forms over the ring of integers O of an imaginary quadratic field as sums of norms of integral linear forms, and when the class number of the imaginary quadratic field is 1, we show that the growth of g O*(n) is at most an exponential of n. We also improve results of Conway-Sloane and Kim-Oh on s-integral lattices.