- Hauptvermutung
The Hauptvermutung (German for main conjecture) of
geometric topology is theconjecture that everytriangulable space has an essentially unique triangulation. It was originally formulated in 1908, by Steinitz and Tietze.This conjecture is now known to be false. The non-manifold version was disproved by
John Milnor in 1961. The manifold versionis true in dimensions " 3". An obstruction to the manifold version was formulated byAndrew Casson andDennis Sullivan in 1967-9 (originally in the simply-connected case), using theRochlin invariant and thecohomology group "H"3("M";Z/2Z).A homeomorphism "f:N""M" of "m"-dimensional
piecewise linear manifold s has an invariant "(f)H3"("M";Z/2Z) such that for "m4""f" is isotopic to a piecewise linear (PL) homeomorphism if and only if "(f)=0". In the simply-connected case and with "m4" "f" is homotopic to a PL homeomorphism if and only if " [(f)] =0 [M,G/PL] ".The obstruction to the manifold Hauptvermutung is now seen as a relative version of the triangulation obstruction of
Rob Kirby andLarry Siebenmann , obtained in 1970. TheKirby-Siebenmann obstruction is defined for any compact "m"-dimensional topological manifold "M":"(M)""H"4("M";Z/2Z)
again using the Rochlin invariant. For "m5" "M" has a PL structure (i.e. can be triangulated by a PL manifold) if and only if "(M)=0", and if this obstruction is 0 the PL structures are parametrized by"H"3("M";Z/2Z). In particular there is only a finite number of essentially distinct PL structures. For compact simply connected manifolds of dimension 4
Simon Donaldson found examples with an infinite number of inequivalentPL structure s, and Freedman found theE8 manifold which not only has no PL structure, but is not even homeomorphic to a simplicial complex. In dimensions greater than 4 the question of whether all compact manifolds are homeomorphic to simplicial complexes is an important open question.External links
*http://www.maths.ed.ac.uk/~aar/haupt Additional material, including original sources
*cite arXiv|author=Yuli B. Rudyak|title=Piecewise linear structures on topological manifolds|year=2001|version=|eprint=math.AT/0105047
*Andrew Ranicki (ed.) [http://www.maths.ed.ac.uk/~aar/books/haupt.pdf "The Hauptvermutung Book"] ISBN 0-7923-4174-0
*Andrew Ranicki [http://www.maths.ed.ac.uk/~aar/slides/orsay.pdf "High-dimensional manifolds then and now"]
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