On Soliton Solutions of the Anti-Self-Dual Yang-Mills Equations from the Perspective of Integrable Systems
Abstract
In this thesis, we construct a class of exact ASDYM 1-solitons and multi-solitons on 4-dimensional real spaces with the Euclidean signature (+, +, +, +), the Minkowski signature (+, - , -, -), and the split signature (+, +, -, -) (the Ultrahyperbolic space). They are new results and successful applications of the Darboux transformation introduced by Nimmo, Gilson, Ohta. In particular, the principal peak of the Lagrangian density TrFμFμ is localized on a 3-dimensional hyperplane in 4 dimensional space. Therefore, we use the term "soliton walls" to distinguish them from the domain walls. For the split signature, we show that the gauge group can be G=SU(2) and G=SU(3) and hence the soliton walls could be candidates of physically interesting objects on the Ultrahyperbolic space U. On the other hand, we use the techniques of the quasideterminants to show that in the asymptotic region, the ASDYM n-soliton possesses n isolated distributions of Lagrangian densities with phase shifts. Therefore, we can interpret it as n intersecting soliton walls.
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