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An Indirect Variational Formulation of a Third-order Ordinary Differential Equation and Birkhoff’s Equations functional(Hamilton action) is constructed. © Pleiades Publishing, Ltd. 2024.
Approximations of two-dimensional Mean Field Games with nonsymmetric controls differential equations: the Fokker–Planck–
Kolmogorov equation and the Hamilton–Jacobi–Bellman one
К необходимым условиям оптимальности в одной двухступенчатой задаче управления интегро-дифференциальными уравнениями типа Вольтерра assumptions two types of formulas for the increment of the quality
functional are constructed
On indirect representability of an operator equation with the fourth time derivative in the form of Hamilton-Ostrogradskii equations in the form of Hamilton-Ostrogradskii equations is investigated. For this purpose, necessary and sufficient
A study of generalized hypergeometric Matrix functions via two-parameter Mittag-Leffler matrix function and confluent hypergeometric matrix functions by using two-parameter Mittag-Leffler matrix function
OPTIMAL BANACH FUNCTION SPACE FOR A GIVEN CONE OF DECREASING FUNCTIONS IN A WEIGHTED L-p - SPACEThe problem is considered of constructing optimal (i.e. minimal) generalized Banach function space
Graphs and algebras of symmetric functions arerepresented by integrals of symmetric functions fn defined on the Cartesian powers Ωⁿ of a set Ω with a
HERMITE INTERPOLATION WITH GREEN FUNCTIONS AND POSITIVITY OF GENERAL LINEAR INEQUALITIES FOR n-CONVEX FUNCTIONSWe state new general linear identities and inequalities involving n-convex functions using Hermite
Optimal banach function space for a given cone of decreasing functions in a weighted Lp - spaceThe problem is considered of constructing optimal (i.e. minimal) generalized Banach function space
ON ANALYTICAL MODELING OF FINITE-DIMENSIONAL SYSTEMS an indirect variational formulation are obtained. The corresponding Hamilton-Ostrogradskii action
Страница 10 из 4246
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