Some remarks on Feynman rules for non-commutative gauge theories based on groups $G\neq U(N)$
arXiv:hep-th/0205286 · doi:10.1088/1126-6708/2002/07/018
Abstract
We study for subgroups $G\subseteq U(N)$ partial summations of the $θ$-expanded perturbation theory. On diagrammatic level a summation procedure is established, which in the U(N) case delivers the full star-product induced rules. Thereby we uncover a cancellation mechanism between certain diagrams, which is crucial in the U(N) case, but set out of work for $G\subset U(N)$. In addition, an explicit proof is given that for $G\subset U(N), G\neq U(M), M<N$ there is no partial summation of the $θ$-expanded rules resulting in new Feynman rules using the U(N) star-product vertices and besides suitable modified propagators at most a $finite$ number of additional building blocks. Finally, we show that certain SO(N) Feynman rules conjectured in the literature cannot be derived from the enveloping algebra approach.
20 pages, LaTeX, 5 figures