Hecke operators and an identity for the dedekind sums

It is the generalization of Knopp's identity for homogeneous Dedekind sums. 1996 Academic Press, Inc. where ((x))=x&[x]& 1 2 if x{integer, ((x))=0 otherwise, and \_(n) is the sum of the positive divisors of n. Knopp's identity is valid for arbitrary integers a and q with q>0, and his derivation u

A number of operator inclusions, and identities, involving the Moore-Penrose inverse of a closed densely defined linear operator, are presented. Some of these inclusions generalize known identities in the case when the operator is bounded and has closed range. An application to a known compactness c

In this paper we give some conditions under which T q Ѩ f is maximal monotone Ž . in the Banach space X not necessarily reflexive , where T is a monotone operator from X into X \* and Ѩ f is the subdifferential of a proper lower semicontinuous Ä 4 convex function f, from X into ‫ޒ‬ j qϱ . We also gi