Instantons and Magnetic Monopoles on R3× S1 with Arbitrary Simple Gauge Groups
Abstract
We investigate Yang-Mills theories with arbitrary gauge group on R3× S1, whose symmetry is spontaneously broken by the Wilson loop. We show that instantons are made of fundamental magnetic monopoles, each of which has a corresponding root in the extended Dynkin diagram. The number of constituent magnetic monopoles for a single instanton is the dual Coxeter number of the gauge group, which also accounts for the number of instanton zero modes. In addition, we show that there exists a novel type of the S1 coordinate dependent magnetic monopole solutions in G2,F4,E8.
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