On a singular integral equation with Weierstrass kernel

The singular integral equation 1/pi integral(L00) phi(t)zeta(t - t(0))dt = f(t(0)), t(0) is an element of L-00, where L-00 is the union of smooth arcs, zeta(t - t(0))is the Weierstrass 'zeta-function', f(t(0)) is given and phi(t) is an unknown function, is considered. It is proved that the solution of the equation in a Holder class always exists. The effective solutions are obtained by means of boundary value problems for sectionally holomorphic doubly quasi-periodic functions in latticed domains.