Submissions from A. O. Motokur

[1]  faKiv:2403.08541 [pdf]
Anomalous and Assisted Constants in the Chiral Equilibrium Model
Comments: 25 pages, 8 figures

We calculate anomalous and assisted constants in a simple model of the chiral equilibrium model in the presence of a vector hypermultiplet and a momentum multiplet. We find that the most general case of the quasi-classical situation, consisting of two vectors of the same mass, is invariant under the perturbative determinants. A different case, with two vectors of different mass, is equivalent to the non-perturbative case. The latter is obtained in the context of the two-dimensional Maxwell-Higgs model. The two-dimensional model is constructed by any of the base quiver gauge theories and the chiral spectrum of the chiral equilibrium model is determined by the boundary-conducive equations of the field equations. The analytic solution obtained here is known as the non-perturbative solution of the second order equations of motion. The solution of the first order equations of motion is given by the Maxwell's equations.