State Sum Models and Simplicial Cohomology

Abstract

We study a class of subdivision invariant lattice models based on the gauge group Zp, with particular emphasis on the four dimensional example. This model is based upon the assignment of field variables to both the 1- and 2-dimensional simplices of the simplicial complex. The property of subdivision invariance is achieved when the coupling parameter is quantized and the field configurations are restricted to satisfy a type of mod-p flatness condition. By explicit computation of the partition function for the manifold RP3 × S1, we establish that the theory has a quantum Hilbert space which differs from the classical one.

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