Collocation Schemes for Nonlinear Index 1 DAEs with a Singular Point | Zendy

Alexander Dick | Zendy; Othmar Koch | Zendy; Roswitha März | Zendy; Ewa Weinmüller | Zendy; Theodore E. Simos | Zendy; George Psihoyios | Zendy; Ch. Tsitouras | Zendy; Zacharias Anastassi | Zendy

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Collocation Schemes for Nonlinear Index 1 DAEs with a Singular Point

Author(s) -

Alexander Dick,

Othmar Koch,

Roswitha März,

Ewa Weinmüller,

Theodore E. Simos,

George Psihoyios,

Ch. Tsitouras,

Zacharias Anastassi

Publication year - 2011

Publication title -

aip conference proceedings

Language(s) - English

Resource type - Conference proceedings

SCImago Journal Rank - 0.177

H-Index - 75

eISSN - 1551-7616

pISSN - 0094-243X

DOI - 10.1063/1.3636712

Subject(s) - icon , citation , computer science , collocation (remote sensing) , index (typography) , information retrieval , point (geometry) , filter (signal processing) , world wide web , mathematics , programming language , geometry , computer vision , machine learning

We discuss the convergence behavior of collocation schemes applied to approximate solutions of BVPs in nonlinear index 1 DAEs, which exhibit a critical point at the left boundary. Such a critical point of the DAE causes a singularity in the inherent nonlinear ODE system. In particular, we focus on the case when the inherent ODE system is singular with a singularity of the first kind and apply polynomial collocation to the original DAE system. We show that for a certain class of well‐posed boundary value problems in DAEs having a sufficiently smooth solution, the global error of the collocation scheme converges in the collocation points with the so‐called stage order. The theoretical results are supported by numerical experiments.

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