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Finiteness of Mather's Canonical Stratification

Published online by Cambridge University Press:  05 May 2013

A.A.du Plessis
Affiliation:
Universitetsparken
W. Bruce
Affiliation:
University of Liverpool
D. Mond
Affiliation:
University of Warwick
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Summary

Introduction

In [5, 6, 7], Mather showed how to construct a “canonical” Whitney-regular stratification of jet-space, with the property that a proper map whose jet-extension is multi-transverse to the stratification is topologically stable. (An alternative, rather simpler, presentation of this result is given in [2].)

Mather also claimed, in [7], that the stratification constructed has only finitely many connected strata. This is of considerable interest because the topological type of a map-germ transverse to a (connected component of a) canonical stratum is determined by the stratum, so the claim implies that there are only finitely many topological types of topologically stable map-germs in any given dimension-pair.

Unfortunately, Mather's proof [7, p.170] of this finiteness is not correct. The aim of this article is to give a correct proof.

We give this proof in §2. In §1 we give the necessary background; in particular we describe a construction for the canonical stratification rather simpler than both Mather's and that given in [2].

The arguments given here were originally worked out for the review section of the book [9], see in particular pp. 44–5, but in the event were not included there.

I thank Terry Wall for help with the preparation of this article.

Type
Chapter
Information
Singularity Theory
Proceedings of the European Singularities Conference, August 1996, Liverpool and Dedicated to C.T.C. Wall on the Occasion of his 60th Birthday
, pp. 199 - 206
Publisher: Cambridge University Press
Print publication year: 1999

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