Analysis of Voros criterion: what derivatives involving the logarithm of the Riemann xi-function at z=1/2 should be non-negative for the Riemann hypothesis holds true

Abstract

Recently, Voros has found the sums involving certain powers of z-1/2, which, when taken over Riemann xi-function zeroes /rho, must be positive for the Riemann hypothesis holds true and vice versa. Here we analyze these sums, write them as expressions involving only non-negative even powers of /rho-1/2, and show that the Riemann hypothesis is equivalent for the non-negativity of the derivatives (1/(2n-1)!)*d(2n)/dz(2n)(F(2n)(z)*ln(/xi(z))) at z=1/2 where F(2n)=4*Sum(k=0)(n-1)((n-k)*A(k,n)*(z-1/2)(2k) with the coefficients A(k,n)=a(2k-2n)*Sum(l=k)(n)(C(2n)(2l)*C(l)(k)), C(j)(m) are binomial coefficients, for any n=1, 2, 3... and any real a>1/14.