The partition of N-dimensional space, using shells

Let V = V(n,q) denote the vector space of dimension n over GF(q). A set of subspaces of V is called a partition of V if every nonzero vector in V is contained in exactly one subspace of V. Given a partition P of V with exactly a i subspaces of dimension i for 1 ≤ i ≤ n, we have n i=1 a i (q i -1) =

An updated Lagrangian formulation of the generalized conforming ¯at shell element with drilling degrees of freedom is derived based on the incremental equation of virtual work of a three-dimensional (3D) continuum for a purely geometric non-linear analysis of the space structure. While solving the n

A method is presented of constructing a number of regions in a 2-dimensional array such that all accesses that can be induced by an arbitrary occurrence of this array in a program are limited to one of these regions. The index set of such regions will be described in terms of 2-dimensional simple se