Algebraic independence of the Carlitz period and the positive characteristic multizeta values at n and (n,n)

Abstract

Let k be the rational function field over the finite field of q elements and k its fixed algebraic closure. In this paper, we study algebraic relations over k among the fundamental period π of the Carlitz module and the positive characteristic multizeta values ζ(n) and ζ(n,n) for an "odd" integer n, where we say that n is "odd" if q-1 does not divide n. We prove that either they are algebraically independent over k or satisfy some simple relation over k. We also prove that if 2n is "odd" then they are algebraically independent over k.