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Parametrization of Riemann-measurable selections for multifunctions of two variables with application to differential inclusions

Giovanni Anello, Paolo Cubiotti (2004)

Annales Polonici Mathematici

We consider a multifunction $F : T \times X \to 2^{E}$ , where T, X and E are separable metric spaces, with E complete. Assuming that F is jointly measurable in the product and a.e. lower semicontinuous in the second variable, we establish the existence of a selection for F which is measurable with respect to the first variable and a.e. continuous with respect to the second one. Our result is in the spirit of [11], where multifunctions of only one variable are considered.

Periodic solutions for nonautonomous differential equations and inclusions in tubes.

Gabor, Grzegorz (2004)

Abstract and Applied Analysis

Piecewise affine selections for piecewise polyhedral multifunctions and metric projections.

Finzel, M., Li, W. (2000)

Journal of Convex Analysis

Polynomial selections and separation by polynomials

Szymon Wąsowicz (1996)

Studia Mathematica

K. Nikodem and the present author proved in [3] a theorem concerning separation by affine functions. Our purpose is to generalize that result for polynomials. As a consequence we obtain two theorems on separation of an n-convex function from an n-concave function by a polynomial of degree at most n and a stability result of Hyers-Ulam type for polynomials.

Displaying 1 – 4 of 4

Parametrization of Riemann-measurable selections for multifunctions of two variables with application to differential inclusions

Periodic solutions for nonautonomous differential equations and inclusions in tubes.

Piecewise affine selections for piecewise polyhedral multifunctions and metric projections.

Polynomial selections and separation by polynomials

Currently displaying 1 – 4 of 4