Recently, we have applied the generalized Littlewood theorem concerning contour integrals of the logarithm of the analytical function to find the sums over inverse powers of zeros for the incomplete gamma and Riemann zeta functions, polygamma functions, and elliptical functions. Here, the same theorem is applied to study such sums for the zeros of the Hurwitz zeta function zeta(s,z), including the sum over the inverse first power of its appropriately defined non-trivial zeros. We also study some related properties of the Hurwitz zeta function zeros. In particular, we show that, for any natural N and small real epsilon, when z tends to n = 0, -1, -2 horizontal ellipsis we can find at least N zeros of zeta(s,z) in the epsilon neighborhood of 0 for sufficiently small |z+n|, as well as one simple zero tending to 1, etc.