Title of article
Index reduction for differential–algebraic equations by substitution method Original Research Article
Author/Authors
Mizuyo Takamatsu، نويسنده , , Satoru Iwata، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
10
From page
2268
To page
2277
Abstract
Differential–algebraic equations (DAEs) naturally arise in many applications, but present numerical and analytical difficulties. The index of a DAE is a measure of the degree of numerical difficulty. In general, the higher the index is, the more difficult it is to solve the DAE. Therefore, it is desirable to transform the original DAE into an equivalent DAE with lower index.
In this paper, we propose an index reduction method for linear DAEs with constant coefficients. The method is applicable to any DAE having at most one derivative per equality. In contrast to the other existing methods, it does not introduce any additional variables. Exploiting a combinatorial property of degrees of minors in polynomial matrices, we show that the method always reduces the index exactly by one. Thus the paper exhibits an application of combinatorial matrix theory to numerical analysis of DAEs.
Keywords
Differential–algebraic equations , Kroneckercanonical form , Matrix pencil , Index reduction , Combinatorial matrix theory
Journal title
Linear Algebra and its Applications
Serial Year
2008
Journal title
Linear Algebra and its Applications
Record number
826145
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