Presentation complex explained

In geometric group theory, a presentation complex is a 2-dimensional cell complex associated to any presentation of a group G. The complex has a single vertex, and one loop at the vertex for each generator of G. There is one 2-cell for each relation in the presentation, with the boundary of the 2-cell attached along the appropriate word.

Properties

K(G,1)

.

Examples

Let

G=\Z2

be the two-dimensional integer lattice, with presentation

G=\langlex,y|xyx-1y-1\rangle.

Then the presentation complex for G is a torus, obtained by gluing the opposite sides of a square, the 2-cell, which are labelled x and y. All four corners of the square are glued into a single vertex, the 0-cell of the presentation complex, while a pair consisting of a longtitudal and meridian circles on the torus, intersecting at the vertex, constitutes its 1-skeleton.

The associated Cayley complex is a regular tiling of the plane by unit squares. The 1-skeleton of this complex is a Cayley graph for

\Z2

.

Let

G=\Z2*\Z2

be the Infinite dihedral group, with presentation

\langlea,b\mida2,b2\rangle

. The presentation complex for

G

is

RP2\veeRP2

, the wedge sum of projective planes. For each path, there is one 2-cell glued to each loop, which provides the standard cell structure for each projective plane. The Cayley complex is an infinite string of spheres.[1]

References

Notes and References

  1. Book: Hatcher, Allen. Algebraic Topology. 2001-12-03. Cambridge University Press. 9780521795401. 1st. Cambridge. English.