On linear extension operators from growths of compactifications of products

The central purpose of this paper is to prove the following theorem: let \((\Omega, \sigma\), \(u)\) be a complete probability space, \((B,\|\cdot\|)\) a normed linear space over the scalar field \(K, E: \Omega \rightarrow 2^{B}\) a separable random domain with linear subspace values, and \(f: \oper

This article combines the richest data set and most rigorous econometric methodology used, to date, to evaluate the impact of manufacturing extension services on client productivity growth. Client plants are identified in the Longitudinal Research Database (LRD) and their labor productivity growth b

Let A be a symmetric linear operator defined on all of a (possibly degenerate) indefinite inner product space &4 Let JV be the set of all subspaces of 2 which are A-invariant, neutral (in the sense of the indefinite scalar product), and finite dimensional. It is shown that members of JV which are ma