Some inequalities and geometric constants in p-normed spaces
Abstract
In this paper, we study some geometric constants in complete p-normed spaces with 0 < p ≤ 1. We introduce a new symmetric geometric constant associated with isosceles orthogonality, establish its sharp bounds, and provide an orthogonal characterization of the generalized von Neumann-Jordan constant in such spaces. We also investigate two Milman-type moduli in complete p-normed spaces, including their fundamental properties and sharp product inequalities. Finally, we extend the relation between the James constant and the generalized von Neumann-Jordan constant .
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