Abstract :
In this paper, we study the existence problem of anti-periodic solutions for the following first order
evolution equation:
u (t)+ Au(t)+∂Gu(t) +F(t,u(t)) = 0, a.e. t ∈ R;
u(t + T )=−u(t), t ∈ R,
in a separable Hilbert space H, where A is a self-adjoint operator, ∂G is the gradient of G and F
is a nonlinear mapping. An existence result is obtained under the assumptions that D(A) is compactly
embedded into H, ∂G is a continuous bounded mapping in H and F is a continuous mapping
bounded by a L2 function, which extends some known results in [Y.Q. Chen et al., Anti-periodic
solutions for semilinear evolution equations, J. Math. Anal. Appl. 273 (2002) 627–636] and [A. Haraux,
Anti-periodic solutions of some nonlinear evolution equations, Manuscripta Math. 63 (1989)
479–505].
2005 Elsevier Inc. All rights reserved
