Let Y be a subspace of a topological vector space X, and A subset of X an open convex set that intersects Y. We say that the property (QE) [property (CE)] holds if every continuous quasiconvex [continuous convex] function on A il Y admits a continuous quasiconvex [continuous convex] extension defined on A. We study relations between (QE) and (CE) properties, proving that (QE) always implies (CE) and that, under suitable hypotheses (satisfied for example if X is a normed space and Y is a closed subspace of X), the two properties are equivalent. By combining the previous implications between (QE) and (CE) properties with known results about the property (CE), we obtain some new positive results about the extension of quasiconvex continuous functions. In particular, we generalize the results contained in [9] to the infinite-dimensional separable case. Moreover, we also immediately obtain existence of examples in which (QE) does not hold. (c) 2023 Elsevier Inc. All rights reserved.
De Bernardi, C. A., Vesely, L., Extendability of continuous quasiconvex functions from subspaces, <<JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS>>, 2023; 526 (2): 127277-N/A. [doi:10.1016/j.jmaa.2023.127277] [https://hdl.handle.net/10807/241814]
Extendability of continuous quasiconvex functions from subspaces
De Bernardi, Carlo Alberto;
2023
Abstract
Let Y be a subspace of a topological vector space X, and A subset of X an open convex set that intersects Y. We say that the property (QE) [property (CE)] holds if every continuous quasiconvex [continuous convex] function on A il Y admits a continuous quasiconvex [continuous convex] extension defined on A. We study relations between (QE) and (CE) properties, proving that (QE) always implies (CE) and that, under suitable hypotheses (satisfied for example if X is a normed space and Y is a closed subspace of X), the two properties are equivalent. By combining the previous implications between (QE) and (CE) properties with known results about the property (CE), we obtain some new positive results about the extension of quasiconvex continuous functions. In particular, we generalize the results contained in [9] to the infinite-dimensional separable case. Moreover, we also immediately obtain existence of examples in which (QE) does not hold. (c) 2023 Elsevier Inc. All rights reserved.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.