摘要
It is well known that 't Hooft-Polykov magnetic monopole regularly realizes the Dirac magnetic monopole in terms of a two-rank tensor, i.e. the so-called 't Hooft tensor in three-dimensional space, which has been generalized to all even rank ones. We propose an arbitrary odd rank 't Hooft tensor, which universally determines the quantized low-energy boundaries of the even dimensional Georgi-Glashow models under asymptotic conditions. Furthermore, the dual magnetic monopole theory is built up in terms of the J-mapping theory.
It is well known that 't Hooft-Polykov magnetic monopole regularly realizes the Dirac magnetic monopole in terms of a two-rank tensor, i.e. the so-called 't Hooft tensor in three-dimensional space, which has been generalized to all even rank ones. We propose an arbitrary odd rank 't Hooft tensor, which universally determines the quantized low-energy boundaries of the even dimensional Georgi-Glashow models under asymptotic conditions. Furthermore, the dual magnetic monopole theory is built up in terms of the J-mapping theory.
基金
Supported by the National Natural Science Foundation of China under Grant No 10175028, and the Doctor Education Fund of Educational Department of China.
