On the emergence and properties of weird quasiperiodic attractors (2503.11264v1)

Abstract: We recently described a specific type of attractors of two-dimensional discontinuous piecewise linear maps, characterized by two discontinuity lines dividing the phase plane into three partitions, related to economic applications. To our knowledge, this type of attractor, which we call a weird quasiperiodic attractor, has not yet been studied in detail. They have a rather complex geometric structure and other interesting properties that are worth understanding better. To this end, we consider a simpler map that can also possess weird quasiperiodic attractors, namely, a 2D discontinuous piecewise linear map $F$ with a single discontinuity line dividing the phase plane into two partitions, where two different homogeneous linear maps are defined. Map $F$ depends on four parameters -- the traces and determinants of the two Jacobian matrices. In the parameter space of map $F$, we obtain specific regions associated with the existence of weird quasiperiodic attractors; describe some characteristic properties of these attractors; and explain one of the possible mechanisms of their appearance.