On Quasi-Chebyshevity Subsets of Unital Banach Algebras

Abstract: In this paper, first, we consider closed convex and bounded subsets of infinite-dimensional unital Banach algebras and show with regard to the general conditions that these sets are not quasi-Chebyshev and pseudo-Chebyshev. Examples of those algebras are given including the algebras of continuous functions on compact sets. We also see some results in C *-algebras and Hilbert C *-modules. Next, by considering some conditions, we study Chebyshev of subalgebras in C *-algebras.