Hypernorm on hypervector spaces over a hyperfield
Document Type
Article
Publication Title
Journal of Analysis
Abstract
Hypernorm is a generalization of the notion of a norm on a vector space over a field. In this paper, we consider a hypervector space (V,+) over a hyperfield, where + is a hyperoperation, and prove that the hypernorm is continuous. We show that the natural linear transformation from V to VZ is continuous and open for all closed subhyperspaces Z of V. We prove BL(V,W), the set of all bounded linear transformations from V to W is a hyper-Banach space whenever W is complete. Furthermore, we obtain that in a hyper-Banach space V if {μn} is a sequence of continuous linear transformations with {/μn(u)/} is bounded for every u∈V, then {‖μn‖} is bounded. In the sequel, we prove several properties of hypernorm and linear transformations on hypernormed spaces.
DOI
10.1007/s41478-023-00710-3
Publication Date
1-1-2024
Recommended Citation
Pallavi, P.; Kuncham, S. P.; Tapatee, S.; and Vadiraja, B., "Hypernorm on hypervector spaces over a hyperfield" (2024). Open Access archive. 7244.
https://impressions.manipal.edu/open-access-archive/7244
