Uniqueness and stability of limit cycles in planar piecewise linear differential systems without sliding region

In this paper, we consider the family of planar piecewise linear differential systems with two zones separated by a straight line without sliding regions, that is, differential systems whose flow transversally crosses the switching line except for at most one point. In the research literature, many papers deal with the problem of determining the maximum number of limit cycles that these differential systems can have. This problem has been usually approached via large case-by-case analyses which distinguish the many different possibilities for the spectra of the matrices of the differential systems. Here, by using a novel integral characterization of Poincaré half-maps, we prove, without unnecessary distinctions of matrix spectra, that the optimal uniform upper bound for the number of limit cycles of these differential systems is one. In addition, it is proven that this limit cycle, if it exists, is hyperbolic and its stability is determined by a simple condition in terms of the parameters of the system. As a byproduct of our analysis, a condition for the existence of the limit cycle is also derived. •Sewing planar piecewise linear systems with two zones separated by a straight line.•One is the optimal upper bound for the number of limit cycles.•The uniqueness of the limit cycle was an open problem.•Unified proof without distinguishing the spectra of the matrices.•If the limit cycle exists, then it is hyperbolic and its stability is determined.