Abstract
ABSTRACT In this paper, we investigate the properties and the precise solutions of the Mordukhovich derivatives of the set-valued metric projection operator onto some closed balls in some general Banach spaces. In the Banach space c, we find the properties of Mordukhovich derivatives of the set-valued metric projection operator onto the closed subspace c 0. We show that the metric projection from C[0, 1] to polynomial with degree less than or equal to n is a single-valued mapping. We investigate its Mordukhovich derivatives and G a ˆ teaux directional derivatives.
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