Riesz spaces with generalized Orlicz growth

Abstract

We consider a Riesz φ-variation for functions f defined on the real line when :×[0,∞)[0,∞) is a generalized -function. We show that it generates a quasi-Banach space and derive an explicit formula for the modular when the function f has bounded variation. The resulting BV-type energy has previously appeared in image restoration models. We generalize and improve previous results in the variable exponent and Orlicz cases and answer a question regarding the Riesz--Medvedev variation by Appell, Bana\'s and Merentes [Bounded Variation and Around, Studies in Nonlinear Analysis and Applications, Vol. 17, De Gruyter, Berlin/Boston, 2014].