Model reduction of non-densely defined piecewise-smooth systems in Banach spaces

TL;DR

This paper introduces a model reduction method for piecewise-smooth systems in Banach spaces with non-dense domains, ensuring solution uniqueness and capturing discontinuous trajectories, demonstrated on a nonlinear bowed string model.

Contribution

It presents a novel reduction technique for non-densely defined PWS systems in Banach spaces, maintaining solution properties and handling discontinuities.

Findings

Reduced model retains solution uniqueness

Method effectively captures discontinuous trajectories

Application to nonlinear bowed string model demonstrates effectiveness

Abstract

In this paper a model reduction technique is introduced for piecewise-smooth (PWS) vector fields, whose trajectories fall into a Banach space, but the domain of definition of the vector fields is a non-dense subset of the Banach space. The vector fields depend on a parameter that can assume different discrete values in two parts of the phase space and a continuous family of values on the boundary that separates the two parts of the phase space. In essence the parameter parametrizes the possible vector fields on the boundary. The problem is to find one or more values of the parameter so that the solution of the PWS system on the boundary satisfies certain requirements. In this paper we require continuous solutions. Motivated by the properties of applications, we assume that when the parameter is forced to switch between the two discrete values, trajectories become discontinuous. Discontinuous trajectories exist in systems whose domain of definition is non-dense. It is shown that under our assumptions the trajectories of such PWS systems have unique forward-time continuation when the parameter of the system switches. A finite-dimensional reduced order model is constructed, which accounts for the discontinuous trajectories. It is shown that this model retains uniqueness of solutions and other properties of the original PWS system. The model reduction technique is illustrated on a nonlinear bowed string model.