Alberto S. Cattaneo, Filippo Fila Robattino, Valentino Huang, Manuel Tecchiolli
Published 2024-01-17Version 1
In this paper, we present a theory for gravity coupled with scalar, SU$(n)$ and spinor fields on manifolds with null-boundary. We perform the symplectic reduction of the space of boundary fields and give the constraints of the theory in terms of local functionals of boundary vielbein and connection. For the three different couplings, the analysis of the constraint algebra shows that the set of constraints does not form a first class system.
Symmetry Reduction of sh-Lie Structures and of Local Functionals
Canonical Transformations of Local Functionals and sh-Lie Structures
Weak dependence for a class of local functionals of Markov chains on $\mathbb{Z}^d$
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