Hauptvermutung Explained

The Hauptvermutung of geometric topology is a now refuted conjecture asking whether any two triangulations of a triangulable space have subdivisions that are combinatorially equivalent, i.e. the subdivided triangulations are built up in the same combinatorial pattern. It was originally formulated as a conjecture in 1908 by Ernst Steinitz^[1] and Heinrich Franz Friedrich Tietze,^[2] but it is now known to be false.

History

The non-manifold version was disproved by John Milnor in 1961 using Reidemeister torsion.^[3]

The manifold version is true in dimensions

m\le3

. The cases

m=2

and

were proved by Tibor Radó and Edwin E. Moise in the 1920s and 1950s, respectively.^[4] ^[5] ^[6]

H^3(M;Z/2Z)

In dimension

m\ge5

, a homeomorphism

f\colonN\toM

of m-dimensional piecewise linear manifolds has an invariant

\kappa(f)\inH^3(M;\Z/2\Z)

such that

is isotopic to a piecewise linear (PL) homeomorphism if and only if

\kappa(f)=0

. In the simply-connected case and with

m\ge5

is homotopic to a PL homeomorphism if and only if

[\kappa(f)]=0\in[M,G/{\rmPL}]

This quantity

\kappa(f)

is now seen as a relative version of the triangulation obstruction of Robion Kirby and Laurent C. Siebenmann, obtained in 1970. The Kirby–Siebenmann obstruction is defined for any compact m-dimensional topological manifold M

\kappa(M)\inH^4(M;\Z/2\Z)

again using the Rochlin invariant. For

m\ge5

, the manifold M has a PL structure (i.e., it can be triangulated by a PL manifold) if and only if

\kappa(M)=0

, and if this obstruction is 0, the PL structures are parametrized by

H^3(M;\Z/2\Z)

. In particular there are only a finite number of essentially distinct PL structures on M.

For compact simply-connected manifolds of dimension 4, Simon Donaldson found examples with an infinite number of inequivalent PL structures, and Michael Freedman found the E8 manifold which not only has no PL structure, but (by work of Casson) is not even homeomorphic to a simplicial complex.^[7]

In 2013, Ciprian Manolescu proved that there exist compact topological manifolds of dimension 5 (and hence of any dimension greater than 5) that are not homeomorphic to a simplicial complex.^[8] Thus Casson's example illustrates a more general phenomenon that is not merely limited to dimension 4.

External links

Web site: Andrew . Ranicki . Triangulation and the Hauptvermutung . University of Edinburgh. Additional material, including original sources
Book: Rudyak, Yuli . Piecewise Linear Structures on Topological Manifolds . 2016 . 10.1142/9887 . math/0105047 . 978-981-4733-78-6. 16750789 .
Book: Andrew . Ranicki . Andrew Ranicki . The Hauptvermutung Book . 30 September 1996 . Springer . 0-7923-4174-0.
Web site: Andrew . Ranicki . High-dimensional manifolds then and now.

Notes and References

E. . Steinitz . Beiträge zur Analysis situs . Sitz-Ber. Berlin Math. Ges. . 7 . 1908 . 29–49.
H. . Tietze . Über die topologischen Invarianten mehrdimensionaler Mannigfaltigkeiten . Monatsh. Für Math. Und Phys. . 19 . 1908 . 1–118 . 10.1007/BF01736688. 120998023 .
John W.. Milnor . John Milnor. Two complexes which are homeomorphic but combinatorially distinct. Annals of Mathematics. 74. 1961. 2 . 575–590. 133127. 10.2307/1970299. 1970299.
Radó . Tibor . Tibor Radó. Über den Begriff der Riemannschen Fläche . Acta Scientarum Mathematicarum Universitatis Szegediensis . 2 . 1925 . 1 . 96–114. 51.0273.01.
Moise . Edwin E. . Edwin E. Moise. Affine structures in 3-manifolds. V. The triangulation theorem and Hauptvermutung . . 56 . 1952 . 2 . 101–121 . 10.2307/1969769. 1969769 .
Book: Moise, Edwin E. . Geometric Topology in Dimensions 2 and 3 . Springer . 1977 . 978-0-387-90220-3 .
Book: Akbulut . Selman . Selman Akbulut. McCarthy . John D. . Casson's invariant for oriented homology 3-spheres . registration . . 1990 . 0-691-08563-3 . 1030042.
Ciprian . Manolescu . Ciprian Manolescu. 2015 . Pin(2)-equivariant Seiberg–Witten Floer homology and the Triangulation Conjecture . . 29 . 2016 . 147–176 . 10.1090/jams829. 1303.2354 . 16403004 .