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Hardy Type Inequalities on Domains with Convex Complement and Uncertainty Principle of Heisenberg-empty convex set. We prove an extension of the Hadwiger theorems about approximations of convex compact sets
Rellich type inequalities in domains of the Euclidean space inequalities for all non-convex domains of dimension d ≥ 2 provided that the domains satisfy the exterior
Hardy-Rellich inequalities in domains of the Euclidean space.P. Owen (1999) [21]). We examine the inequality in non-convex domains. It is proved that a positive
The Closure and the Interior of C-convex SetsC-convexity of the closure, interiors and their lineal convexity are considered for C-convex sets
Rellich type inequalities in domains of the Euclidean space inequalities for all non-convex domains of dimension d ≥ 2 provided that the domains satisfy the exterior
A non-commutative Yosida-Hewitt theorem and convex sets of measurable operators closed locally in measure to the characterisation of bounded convex sets in Banach spaces of measurable operators which are closed locally
THE IMPACT OF SELECTIVE CONVEXITY ON THE STRUCTURES OF PRODUCTION FUNCTIONS IN DATA ENVELOPMENT ANALYSIS at the same time. The production possibility set (PPS) of the DEA models is convex, and the PPS of the FDH
Hardy-Rellich inequalities in domains of the Euclidean space.P. Owen (1999) [21]). We examine the inequality in non-convex domains. It is proved that a positive
A non-commutative Yosida-Hewitt theorem and convex sets of measurable operators closed locally in measure to the characterisation of bounded convex sets in Banach spaces of measurable operators which are closed locally
On estimates for solutions of systems of convex inequalities given point to the Lebesgue set of a convex function are obtained and sufficient conditions for convex
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