Idea

It is modeled by a cocycle $\hat{F} \in H (X, B U (n)_{conn})$ in differential nonabelian cohomology. Here $B U (n)_{conn}$ is the moduli stack of $U (n)$ -principal connections, the stackification pf the groupoid of Lie-algebra valued forms, regarded as a groupoid internal to smooth spaces.

This is usually represented by a vector bundle with connection.

As a nonabelian Čech cocycle the Yang-Mills field on a space $X$ is represented by

a cover ${U_{i} \to X}$
a collection of $Lie (U (n))$ -valued 1-forms $(A_{i} \in Ω^{1} (U_{i}, Lie (U (n))))$ ;
a collection of $U (n)$ -valued smooth functions $(g_{i j} \in C^{∞} (U_{i j}, U (n)))$ ;
such that on double overlaps

$A_{j} = {Ad}_{g_{i j}} \circ A_{i} + g_{i j} g g_{i j}^{- 1},$ A_j = Ad_{g_{i j}} \circ A_i + g_{i j} g g_{i j}^{-1} \,,
and such that on triple overlaps

$g_{i j} g_{j k} = g_{i k} .$ g_{i j} g_{j k} = g_{i k} \,.

Examples

Revised on January 10, 2013 20:07:47 by Urs Schreiber (89.204.153.52)