Analysis and geometry on $R_+$-marked configuration spaces
Abstract
We carry out analysis and geometry on a marked configuration space over a Riemannian manifold with marks from the space as a natural generalization of the work {\bf [}{\it J. Func. Anal}. {\bf 154} (1998), 444--500{\bf ]}. As a transformation group on this space, we take the ``lifting'' to of the action on of the semidirect product of the group Diff of diffeomorphisms on with compact support and the group of smooth currents, i.e., all mappings of into which are equal to one outside a compact set. The marked Poisson measure on with L\'evy measure is proven to be quasiinvariant under the action of . Then, we derive a geometry on by a natural ``lifting'' of the corresponding geometry on . In particular, we construct a gradient and divergence . The associated volume elements, i.e., all probability measures on with respect to which and become dual operators on are identified as the mixed Poisson measures with mean measure equal to a multiple of . As a direct consequence of our results, we obtain marked Poisson space representations of the group and its Lie algebra . We investigate also Dirichlet forms and Dirichlet operators connected with (mixed) marked Poisson measures. In particular, we obtain conditions of ergodicity of the semigroups generated by the Dirichlet operators. A possible generalization of the results of the paper to the case where the marks belong to a homogeneous space of a Lie group is noted.
Cite
@article{arxiv.math/0608347,
title = {Analysis and geometry on $R_+$-marked configuration spaces},
author = {Yu. G. Kondratiev and E. W. Lytvynov and G. F. Us},
journal= {arXiv preprint arXiv:math/0608347},
year = {2007}
}