The Friedrichs Extension of Singular Differential Operators

## Abstract A general construction for the Friedrichs extension of symmetric semi‐bounded block operators with not necessarily bounded entries, acting in the product of Hilbert spaces has been given by Konstantinov and Mennicken via the form There the entry __A__ was assumed to be essentially sel

## Abstract We consider a system of ordinary differential operators of mixed order on an interval (0, __r__~0~), __r__~0~ > 0, where some of the coefficients are singular at 0. A special case has been dealt with by Kako, where the essential spectrum of an operator associated with a linearized magne

## Abstract The present paper is concerned with the essential spectrum of the singular matrix differential operator of mixed order over the interval (__a__, __b__), where __D__ = __d__/__dt__. It is shown that if the coefficients are locally integrable functions and __T__ is in the limit circle ca

Let Z be a fixed separable operator space, X/Y general separable operator spaces, and T : X Ä Z a completely bounded map. Z is said to have the Complete Separable Extension Property (CSEP) if every such map admits a completely bounded extension to Y and the Mixed Separable Extension Property (MSEP)