Closure of the algebra of constraints for a nonprojectable Horava model
Abstract
We perform the Hamiltonian analysis for a nonprojectable Horava model whose potential is composed of R and R-2 terms. We show that Dirac's algorithm for the preservation of the constraints can be done in a closed way, hence the algebra of constraints for this model is consistent. The model has an extra, odd, scalar mode whose decoupling limit can be seen in a linear-order perturbative analysis on weakly varying backgrounds. Although our results for this model point in favor of the consistency of the Horava theory, the validity of the full nonprojectable theory still remains unanswered.
Más información
Título según WOS: | Closure of the algebra of constraints for a nonprojectable Horava model |
Título de la Revista: | PHYSICAL REVIEW D |
Volumen: | 83 |
Número: | 4 |
Editorial: | American Physical Society |
Fecha de publicación: | 2011 |
Idioma: | English |
DOI: |
10.1103/PhysRevD.83.044003 |
Notas: | ISI |