Nonlinearity of the non-Abelian lattice gauge field theory according to the spectra of Kolmogorov-Sinai entropy and complexity
Abstract
Yang-Mills fields are an important part of the non-Abelian space theory describing the properties of quark-gluon plasma. The dynamics of the classical fields are given by the Hamiltonian equations of motion, which contain the member of the field strength tensor SU(2) 1.. This system exhibits chaotic behavior. The homogeneous Yang-Mills equation includes the quadratic part of the field strength tensor Fμ a expressed in Minkowski space, which was determined by the fields Aμa . The dynamics of the classical Yang-Mills field equations arise from the Hamiltonian SU(2) field tensor so that the total energy remains constant and fulfills the Gaussian law. The microcanonical equations of motion are solved on a lattice Nd, which shows chaotic dynamics and we research the time-dependent entropy-energy relation on the lattice, which can be shown by the spectrum of Kolmogorov-Sinai entropy and the statistical complexity
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