Nonlinear sigma models are studied in n space dimensions with values in a coset space G/H as infinite dimensional Hamiltonian systems. An "intrinsic" formulation is discussed in terms of coordinates on G/H, an "embedded" formulation in terms of fields satisfying a constraint and a "lifted" formulation in terms of fields having values in G/H, where H is a normal subgroup of H. The coupling of the sigma model to Yang-Mills fields with structure group G is then considered, and it is shown that this system is equivalent to a massive Yang-Mills theory
Hamiltonian methods for nonlinear sigma models / Pak, Nk; Percacci, Roberto. - In: JOURNAL OF MATHEMATICAL PHYSICS. - ISSN 0022-2488. - 30:12(1989), pp. 2951-2962. [10.1063/1.528483]
Hamiltonian methods for nonlinear sigma models
Percacci, Roberto
1989-01-01
Abstract
Nonlinear sigma models are studied in n space dimensions with values in a coset space G/H as infinite dimensional Hamiltonian systems. An "intrinsic" formulation is discussed in terms of coordinates on G/H, an "embedded" formulation in terms of fields satisfying a constraint and a "lifted" formulation in terms of fields having values in G/H, where H is a normal subgroup of H. The coupling of the sigma model to Yang-Mills fields with structure group G is then considered, and it is shown that this system is equivalent to a massive Yang-Mills theoryI documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.