Periodic solutions for systems of functional-differential semilinear equations at resonance

Abstract

Motivated by Lazer-Leach type results, we study the existence of periodic solutions for systems of functional-differential equations at resonance with an arbitrary even-dimensional kernel and linear deviating terms involving a general delay of the form $\int_0^{2\pi}u(t+s)d\lambda(s)$, where $\lambda$ is a finite regular signed measure. Our main technique shall be the Coincidence Degree Theorem due to Mawhin.