Let A:D(A)\to E be an infinitesimal generator either of an analytic compact
semigroup or of a contractive C_0-semigroup of linear operators acting in a
Banach space E. In this paper we give both necessary and sufficient conditions
for bifurcation of T-periodic solutions for the equation x'=Ax+f(t,x)+e
g(t,x,e) from a k-parameterized family of T-periodic solutions of the
unperturbed equation corresponding to e=0. We show that by means of a suitable
modification of the classical Mel'nikov approach we can construct a bifurcation
function and to formulate the conditions for the existence of bifurcation in
terms of the topological index of the bifurcation function. To do this, since
the perturbation term g is only Lipschitzian we need to extend the classical
Lyapunov-Schmidt reduction to the present nonsmooth case.Comment: Submitted to Adv. Nonlinear Stu
