Operator equations and weighted shifts

One of the properties that the OWA operator satisfies is commutativity. This condition, that is not satisfied by the weighted mean, stands for equal reliability of all the information sources that supply the data. In this article we define a new combination function, the WOWA (Weighted OWA), that co

We deal with the q-numerical radius of weighted unilateral and bilateral shift operators. In particular, the q-numerical radius of weighted shift operators with periodic weights is discussed and computed.

## Abstract In the context of Köthe spaces we consider a weighted shift operator, the so‐called generalized integration operator __J~λ~__ and the linear continuous operators __T__ that commute with it (shift‐invariant operators); under certain conditions the shift‐invariant isomorphisms are charact

We find a new expression for the norm of a function in the weighted Lorentz space, with respect to the distribution function, and obtain as a simple consequence a generalization of the classical embeddings \(L^{r, 1} \subset \cdots \subset L^{p} \subset \cdots \subset L^{p . r}\) and a new definitio