• Corpus ID: 249282392

The background field method applied to cosmological phase transition

  title={The background field method applied to cosmological phase transition},
  author={Phan Hong Lien and Nguyen Nhu Xuan},
. In this paper, the cosmological phase transition is investigated by background gauge field method. As a continuation of previous our work, some numerical results and graphic solutions at T 6 = 0 are presented. Hence the mechanism of cosmological phase transition in the early Universe is considered. It is shown that the breaking of symmetry significantly depend on the nonzero temperature and chemical potential. Furthermore, it is the first order of phase transition. Non - restoration of symmetry… 



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  • 1993


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