A Melnikov analysis on a family of second order discontinuous differential equations
Abstract
This paper aims to provide a Melnikov-like function that governs the existence of periodic solutions bifurcating from period annuli in certain families of second-order discontinuous differential equations of the form x+α\; sign(x)=η x+ \;f(t,x,x). This family has attracted considerable attention from researchers, particularly in the analysis of specific instances of f(t,x,x). The study of this type of differential equation is motivated by its significance in modeling systems with abrupt state changes, both in natural and engineering contexts.
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