Monoidal Categories and Topological Field Theory

We prove that the conjecture is true in the case of the punctured torus and the 4-times punctured sphere in Section 3 by first com- puting the matrix of three particular

the K¨ ahler quantization depends on the complex structure, and one can identify the Hilbert space obtained for different complex structures by using a certain flat connection,

The standard model of partile physis is a quantum eld theory of gauge elds and.. matter in

Hint: start by building an operator W µ invariant under translations and transforming as a vector under

In doing so, the point P is kept fixed, so studying the variation δφ(x) corresponds to studying how a single degree of freedom (the value of the field at fixed point P ) changes

The main result of this section is Theorem 48 which provides a translation of the rigidity condition on a topological ring into a dual equivalence between the category of free modules

In section 5 we give an explicit formula for the Borromean tensor for twisted Drinfeld doubles, with some useful specializations that we then use in section 6 to explicitly

diret sum of simple objet then a pointed ategory is equal to its Piard ategory.. In this paper we will use the terminology