Geometric Theory of Spaces of Integral Polynomials and Symmetric Tensor Products

Among other things, we show that L is isomorphic to a complemented q subspace of the space of multilinear forms on L = иии = L , where q G 1 is given by 1rp q иии q1rp q 1rq s 1. The proof strongly depends on the L -1 n ϱ module structure of the spaces L .

This paper is concerned with two important elements in the high-order accurate spatial discretization of finite-volume equations over arbitrary grids. One element is the integration of basis functions over arbitrary domains, which is used in expressing various spatial integrals in terms of discrete

## Abstract Analytic operator valued functions of two operators on tensor products of Hilbert spaces are considered. A precise norm estimate is established. Applications to operator differential equations are also discussed. (© 2008 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

If V is a vector space over a field K, then an element g of the general linear group GL V acts on V ⊗ V , on the space of alternating 2-tensors A V , and on the space of symmetric 2-tensors S V . For a unipotent element g, we exhibit bases for the subspace of fixed points of g acting on both V ⊗ V a