Boundedness of p-adic Hardy--Hilbert and Erdélyi--Kober fractional integral operators on p-adic Cesàro function Spaces

Abstract

In this paper, we introduce Cesàro function spaces over p-adic fields and investigate their fundamental properties, such as the dilation operator and the Minkowski-type integral inequality. We establish boundedness result for p-adic Hardy--Hilbert-type integral operators acting on p-adic Cesàro function spaces, and as an application we derive p-adic analogue of the Hardy inequality, the Hilbert inequality, and the Hardy-Littlewood-Pólya inequality. Furthermore, we define the p-adic analogue of the Erdélyi--Kober fractional integral operators and prove their boundedness on p-adic Cesàro function spaces with the help of the obtained boundedness result.