A Spectral Approach to Distributional Extensions of Normal Operators

## The operator A e = D 1 g 1 (x 1 / e,x 2 )D 1 +D 2 g 2 (x 1 / e,x 2 )D 2 is considered in L 2 (R 2 ), where g j (x 1 ,x 2 ), j = 1, 2, are periodic in x 1 with period 1, bounded and positive definite. Let function Q(x 1 ,x 2 ) be bounded, positive definite and periodic in x 1 with period 1. Let

## Abstract Motivated by symmetric association schemes (which are known to approximate generously unitransitive group actions), we formulate combinatorial approximations to transitive extensions of generously unitransitive permutation groups. Specifically, the notions of compatible and coherent par

Let A A and B B be fields of subsets of a set X and let : A A ª R and : B B ª R Ž . be bounded, finitely additive measures i.e., charges . We give global necessary and sufficient conditions on A A and B B under which any bounded, consistent charges and have a bounded common extension. Conditions on

The propagation phenomena occurring in cellular neural networks (CNNs) described by a one-dimensional template are investigated using a spectral technique. The CNN is represented as a scalar Lur'e system to which a suitable extension of the describing function technique is applied for predicting the