Ramanujan's trigonometric sums and para-orthogonal polynomials on the unit circle

Abstract

Ramanujan's trigonometric sum cq(n) can be interpreted as a set of trigonometric moments of a finite measure concentrated at primitive q-th roots of unity with equal masses. This gives rise to sets of corresponding polynomials orthogonal on the unit circle. We present explicit expressions of these polynomials for special values of q, e.g. when q=p or q=2p or q=pk, where p is a prime number. We generalize this procedure taking the Kronecker polynomial instead of cyclotomic one. In this case the moments are expressed as finite sums of cq(n) with different q.