Por César Rodrigo (Academia Militar, CMAF-CIO, CINAMIL).
Abstract: Euler-Poincaré equations on a principal G-bundle P are the expression in H-reduced coordinates of classical Euler-Lagrange equations associated to some Lagrangian density on the first jet extension of the bundle P->P/G (H subgroup of elements in G that act as symmetries of the lagrangian).
We explore the notion of reduced forward difference operator on any principal G-bundle. This element plays in discrete gauge field theories the same role as retraction mappings for a Lie group in the generation of variational integrators for geometric mechanics and control theory. A gauge-covariant choice of reduced forward difference operator will relate four different gauge-invariant variational principles, classified according to its smooth or discrete nature and its expression in terms of either a potential or reduced field.
(Joint work with A. C. Casimiro)
This seminar is supported by National Funding from FCT - Fundação para a Ciência e a Tecnologia, under the project: UID/MAT/04561/2013.