Casson invariant

In 3-dimensional topology, a part of the mathematical field of geometric topology, the Casson invariant is an integer-valued invariant of oriented integral homology 3-spheres, introduced by Andrew Casson.

Kevin Walker (1992) found an extension to rational homology 3-spheres, called the Casson–Walker invariant, and Christine Lescop (1995) extended the invariant to all closed oriented 3-manifolds.

Definition

A Casson invariant is a surjective map λ from oriented integral homology 3-spheres to Z satisfying the following properties:

λ(S³) = 0.

Let Σ be an integral homology 3-sphere. Then for any knot K and for any integer n, the difference

For any boundary link K ∪ L in Σ the following expression is zero:

The Casson invariant is unique (with respect to the above properties) up to an overall multiplicative constant.

Properties

If K is the trefoil then

The Casson invariant is 1 (or −1) for the Poincaré homology sphere.

The Casson invariant changes sign if the orientation of M is reversed.

This page contains text from Wikipedia, the Free Encyclopedia - https://wn.com/Casson_invariant

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Casson invariant

Definition

Properties

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