Calculation of the partition function for 14N216O

We use a Hodge decomposition and its generalization to non-abelian flat vector bundles to calculate the partition function for abelian and non-abelian BF theories in \(n\) dimensions. This enables us to provide a simple proof that the partition function is related to the Ray-Singer torsion defined o

The known recursion relationship for the partition function p(n) which represents the number of partitions of the positive integer n is exhibited as the limit as q Ä in one identity and as the case 1 substituted for q in a second formula that arise from a matrix problem over the field of q elements.

zj represents the external magnetic field at the j-th site and should not be confused with the activity variable used in the usual polynomial formulation of the Lee-Yang theorem.

We propose to approximate the many-body partition function for a system of interacting Fermions by summing static paths of the Hubbard-Stratonovich representation. We demonstrate with a simple two-level model that the approximation is superior to tinite temperature Hartree theory. Corrections to the