On algebraic differential equations concerning the Riemann-zeta function and the Euler-gamma function

Abstract

In this paper, we prove that ζ is not a solution of any non-trivial algebraic differential equation whose coefficients are polynomials in , (n), (l) over the ring of polynomials in C, l>n≥ 1 are positive integers. We extended the result that ζ does not satisfy any non-trivial algebraic differential equation whose coefficients are polynomials in , ', '' over the field of complex numbers, which is proved by Li and Ye[7].