The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
The search session has expired. Please query the service again.
We present a characterization of inclusion among Riesz−Medvedev bounded variation spaces, i.e., we shall present necessary and sufficient conditions for the Young functions and so that or .
In this paper we study existence and uniqueness of solutions for the Hammerstein equation
in the space of function of bounded total -variation in the sense of Hardy-Vitali-Tonelli, where , and are suitable functions. The existence and uniqueness of solutions are proved by means of the Leray-Schauder nonlinear alternative and the Banach contraction mapping principle.
In this paper we extend the well known Riesz lemma to the class of bounded -variation functions in the sense of Riesz defined on a rectangle . This concept was introduced in [2], where the authors proved that the space of such functions is a Banach Algebra. Moreover, they characterized also the Nemytskii operator acting in this space. Thus our result creates a continuation of the paper [2].
Download Results (CSV)