I am attempting to understand the behavior of Hurwitz Zeta Functions and for what $a$ do they have an analytic continuation. Is it possible to write any Hurwitz Zeta as an Euler product or are there conditions on $a$?

I am attempting to understand the behavior of Hurwitz zeta functions and for what $a$ do they have an analytic continuation. Is it possible to write any Hurwitz zeta as an Euler product or are there conditions on $a$?

I am attempting to understand the behavior of Hurwitz Zeta Functions and for what $a$ do they have an analytic continuation. Is it possible to write any Hurwitz Zeta as an euler product or are they conditions on $a$?

I am attempting to understand the behavior of Hurwitz Zeta Functions and for what $a$ do they have an analytic continuation. Is it possible to write any Hurwitz Zeta as an Euler product or are there conditions on $a$?