This paper examines the characterization of bounded variation (BV) and Sobolev functions by using some non-local functionals. We analyze their pointwise convergence and establish a connection with the Sobolev norm and the total variation measure. By investigating a wider class of non local functionals, we provide a deeper understanding of how these approximations capture the local properties of BV and Sobolev spaces, thereby reinforcing their applicability in the Euclidean setting.
Variational Functionals for the Characterization of BV and Sobolev Spaces / Guarino Lo Bianco, S.; Schiattarella, R.. - In: COMMUNICATIONS IN MATHEMATICAL ANALYSIS AND APPLICATIONS. - ISSN 2790-1920. - 4:3(2025), pp. 419-437. [10.4208/cmaa.2025-0012]
Variational Functionals for the Characterization of BV and Sobolev Spaces
R. Schiattarella
2025
Abstract
This paper examines the characterization of bounded variation (BV) and Sobolev functions by using some non-local functionals. We analyze their pointwise convergence and establish a connection with the Sobolev norm and the total variation measure. By investigating a wider class of non local functionals, we provide a deeper understanding of how these approximations capture the local properties of BV and Sobolev spaces, thereby reinforcing their applicability in the Euclidean setting.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
