Another proofs of Zagier's formula for multiple zeta values and Murakami's formula for multiple t-values

Abstract

Let l 1 be an integer. For any multiple index s=(s1,s2,·s,sl)∈Z≥ 1l with sl>1, the multiple zeta value (MZV for short) is defined by align* ζ(s1,s2,·s,sl):=Σ1≤ k1<k2<·s<kl 1k1s1k2s2·s klsl align* and the multiple t-value is defined by align* t(s1,s2,...,sl):=Σ1≤ k1<k2<...<kl 1(2k1-1)s1(2k2-1)s2...(2kl-1)sl, align* where if the index is empty, then we define the value t():=1. We denote by \a1,·s,ak\d the sequence formed by repeating the sequence \a1,·s,ak\ exactly d times. Let H(r,s)=ζ(\2\r,3,\2\s) and T(r,s):=t(\2\r,3,\2\s). Zagier's formula for the multiple zeta values H(r,s) was an important and key ingredient in the proof of Hoffman's conjecture. In this paper, with the help of the Lei-Yu-Hong expressions for H(r,s) and T(r,s) as well as Lupu's identity about rational zeta series involving Riemann zeta values ζ(2n) and by establishing some identities about binomial coefficients and a result about Kronecker symbol and arithmetic functions, we present another proofs of Zagier's formula stating that for any nonnegative integers r and s, align* H(r,s)=2Σk=1r+s+1(-1)k[2k2r+2-(1-122k) 2k2s+1]ζ(2k+1)ζ(\2\r+s+1-k), align* and Murakami's formula for the multiple t-values T(r,s) asserting that align* T(r,s)=Σk=1r+s+1(-1)k-1 [2k2r+1+2k2s+1(1-122k)] 122kζ(2k+1) t(\2\r+s+1-k). align*