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Mathematical simulation of steady filtration with multivalued law multivalued filtration law. Generalized statement of this problem is formulated in the form of mixed
Solution of elliptic optimal control problem with pointwise and non-local state constraints© 2017, Allerton Press, Inc.We study an optimal control problem of a system governed by a linear
Dual methods for optimal allocation of total network resources volumes of this resource. This approach leads to a constrained convex optimization problem. We discuss
Mathematical simulation of steady filtration with multivalued law multivalued filtration law. Generalized statement of this problem is formulated in the form of mixed
Some properties of zipf–mandelbrot law and hurwitz ? –function whole variety of theoretical characterizations that include, among others, log-convexity, log
Hardy-Rellich inequalities in domains of the Euclidean space to the boundary of the domain. M.P. Owen proved that this inequality is valid in any convex domain with C2=9/16 (M
Punishing factors and Chua's conjecture of the Poincaré metric of Ω at z and of ∏ at w, respectively. Then for any pair (Ω, ∏) where Ω is convex, f ∈ A
Bifurcations and new uniqueness criteria for critical points of hyperbolic derivatives the Behnke-Peschl linear convexity condition for Hartogs domains of special form. A specific rigidity effect
Sherman’s Operator Inequality convex functions, whose arguments are the bounded self-adjoint operators from C* -algebra on a Hilbert
Classes of uniformly convex and uniformly starlike functions as dual setsIn this paper the classes of uniformly convex and uniformly starlike functions are presented
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