The Hilbert space basis and Hilbert's eighth problem

Abstract

The paper considers the Hilbert space Hr of real functions summable with the square L2(a,b)r on any interval \(a,b)r\r=1∞∈ R. It is shown on the basis of the theorem on zeros of real orthogonal polynomials if in Hr there exists a complete orthonormal basis \f(x)k\k=1∞ and the function f(x)∈\f(x)k\k=1∞ has zeros, then these zeros are simple and real. The generalized Hardy function Z(σ,t)=ζ(σ+it)eiθ(t) is considered. It is shown that in the Hilbert space Hr there exists a complete basis \Z(λk,t\k=1∞ where λk∈Q and Z(t)∈\Z(λk,t\k=1∞ when λk=1/2, hence the Hardy function Z(t)=ζ(1/2+it)eiθ(t) has all simple and real zeros.