Norm-Attainable Operators in Hilbert Spaces: Probabilistic and Finite-Rank Perspectives
Mogoi N. Evans *
Department of Pure and Applied Mathematics, Jaramogi Oginga Odinga University of Science and Technology, Kenya.
Samuel B. Apima
Department of Mathematics and Statistics, Kaimosi Friends University, Kenya.
*Author to whom correspondence should be addressed.
Abstract
On this note, we investigate norm-attainable operators in Hilbert spaces, focusing on probabilistic and finite-rank perspectives. We present key results concerning the existence and properties of norm-attaining vectors, particularly for compact and finite-rank operators. Using spectral theory and concentration of measure, we show that norm-attaining vectors form compact subspaces in the unit sphere. Additionally, we explore how unitary transformations affect these vectors and discuss the implications for operator theory and functional analysis.
Keywords: Norm-attainable operators, Hilbert spaces, spectral theory, compact operators, finite-rank operators