Joint denseness of Hurwitz zeta functions with algebraic irrational parameters (Q2176568)

The Hurwitz zeta function, which is an interpolation function of the Bernoulli polynomials at negative integers, has many applications in analytic number theory. The authors study on the Dirichlet \(L\)-functions, and also Hurwitz zeta functions with algebraic irrational parameters. The also investigate the joint denseness of not only the Riemann zeta function, but also the Hurwitz zeta functions with certain algebraic irrational and transcendental parameters on $s=x+iy$ with $x>1$. They provide evidence for the denseness of these functions with an algebraic irrational parameter on $1/2 < x < 1$. They also study the denseness of the Hurwitz zeta function in the critical strip, with convergent sets of the Dirichlet series. They give many results and remarks on the Riemann zeta function, Dirichlet \(L\)-functions, and Hurwitz zeta functions.