A certain class of Einstein-Yang-Mills--systems
Abstract
A class of G -invariant Einstein-Yang-Mills (EYM) systems with cosmological constant on homogeneous spaces G / H , where G is a semisimple compact Lie group, is presented. These EYM--systems can be obtained in terms of dimensional reduction of pure gravity. If G / H is a symmetric space, the EYM--system on G / H provides a static solution of the EYM--equations on spacetime R × G / H . This way, in particular, a solution for an arbitrary Lie group F , considered as a symmetric space, is obtained. This solution is discussed in detail for the case F = SU(2) . A known analytical EYM--system on R × S3 is recovered and it is shown - using a relation to the BPST instanton - that this solution is of sphaleron type. Finally, a relation to the distance of Bures and to parallel transport along mixed states is shown.
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