Abstract Wiener measure using abelian Yang-Mills action on R4

Abstract

Let g be the Lie algebra of a compact Lie group. For a g-valued 1-form A, consider the Yang-Mills action equation S YM(A) = ∫R4 |dA + A A |2\ dω equation using the Euclidean metric on TR4. When we consider the Lie group U(1), the Lie algebra g is isomorphic to R i, thus A A = 0. For a simple closed loop C, we want to make sense of the following path integral, equation 1Z\ ∫A ∈ A /G [ ∫C A] e-12∫R4|dA|2\ dω\ DA, equation whereby DA is some Lebesgue type of measure on the space A /G containing g-valued 1-forms modulo gauge transformations, and Z is some partition function. We will construct an Abstract Wiener space for which we can define the above Yang-Mills path integral rigorously, applying renormalization techniques found in lattice gauge theory. We will further show that the Area Law formula does not hold in the abelian Yang-Mills theory.