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Imperfect bifurcation and Banach space singularity theory

Part of: Calculus on manifolds; nonlinear operators

Published online by Cambridge University Press:  09 April 2009

Leif Arkeryd
Leif Arkeryd
Affiliation:
Department of Mathematics, Chalmers University of Technology, and The University of Göteborg, S-412 96 Göteborg, Sweden
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Abstract

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This paper generalizes the theory of imperfect bifurcation via singularity theory as developed by M. Golubitsky and D. Schaeffer to a Banach space setting. Like the parameter-free potential catastrophe theory, where similar generalizations have been discussed in the literature, Banach control spaces allow useful uniform control of function parameters through the universal unfolding. Among the results are tests for various germ properties and discussion of their reducibility under a Liapunov—Schmidt type splitting, as well as a generalization of the finite dimensional unfolding and germ classification theory.

Keywords

Bifurcation theory, imperfections, singularity theory, elementary catastrophes, versal unfolding, stable unfolding, reducible properties.

MSC classification

Secondary: 58C25: Differentiable maps
Type
Research Article
Information
Journal of the Australian Mathematical Society , Volume 31 , Issue 3 , October 1981 , pp. 294 - 311
Copyright
Copyright © Australian Mathematical Society 1981

References

[1]Arkeryd, L., ‘Catastrophe theory in Hilbert space’, Tech. Report, Math. Dept., University of Gothenburg, Gothenburg (1977).Google Scholar
[2]Arkeryd, L., ‘Thom's Theorem for Banach spaces’, J. London Math. Soc. (2) 19 (1979), 359370.CrossRefGoogle Scholar
[3]Chillingworth, D., ‘A global genericity theorem for bifurcation in variational problems’, J. Funct. Anal. 35 (1980), 251278.CrossRefGoogle Scholar
[4]Golubitsky, M., Schaeffer, D., ‘Bifurcation analysis near a double eigenvalue of a model chemical reaction’, Tech. Report 1859, Math. Research Center, University of Wisconsin (1978).Google Scholar
[5]Golubitsky, M., Schaeffer, D., ‘A theory for imperfect bifurcation via singularity theory’, Comm. Pure Appl. Math. 32 (1979), 2198.CrossRefGoogle Scholar
[6]Magnus, R., ‘Determinacy in a class of germs on a reflexive Banach space’, Math. Proc. Cambridge Philos. Soc. 84 (1978), 293302.CrossRefGoogle Scholar
[7]Magnus, R., ‘Universal unfoldings in Banach spaces: reduction and stability’, Battelle Research Report (Mathematics) 107, Geneva (1977).Google Scholar
[8]Trotman, D., Zeeman, C., ‘The classification of elementary catastrophes of codimension < 5, (Springer Lecture Notes 525 (1976) 263–327).CrossRefGoogle Scholar
[9]Wassermann, G., ‘Stability of unfoldings’ (Springer Lecture Notes 393 (1974)).CrossRefGoogle Scholar