Descriptor approach for eliminating spurious eigenvalues in hydrodynamic equations
Abstract
We describe a general framework for avoiding spurious eigenvalues -- unphysical unstable eigenvalues that often occur in hydrodynamic stability problems. In two example problems, we show that when system stability is analyzed numerically using {\em descriptor} notation, spurious eigenvalues are eliminated. Descriptor notation is a generalized eigenvalue formulation for differential-algebraic equations that explicitly retains algebraic constraints. We propose that spurious eigenvalues are likely to occur when algebraic constraints are used to analytically reduce the number of independent variables in a differential-algebraic system of equations before the system is approximated numerically. In contrast, the simple and easily generalizable descriptor framework simultaneously solves the differential equations and algebraic constraints and is well-suited to stability analysis in these systems.
Keywords
Cite
@article{arxiv.0705.1542,
title = {Descriptor approach for eliminating spurious eigenvalues in hydrodynamic equations},
author = {M. Lisa Manning and B. Bamieh and J. M. Carlson},
journal= {arXiv preprint arXiv:0705.1542},
year = {2008}
}