Zobrazeno 1 - 10
of 104
pro vyhledávání: '"Alexey A. Tret'yakov"'
Publikováno v:
Entropy, Vol 25, Iss 8, p 1112 (2023)
The paper describes an application of the p-regularity theory to Quadratic Programming (QP) and nonlinear equations with quadratic mappings. In the first part of the paper, a special structure of the nonlinear equation and a construction of the 2-fac
Externí odkaz:
https://doaj.org/article/8da2ee35a72d45c7a70fd5d01d4c0840
Autor:
Beata Medak, Alexey A Tret’yakov
Publikováno v:
Boundary Value Problems, Vol 2017, Iss 1, Pp 1-9 (2017)
Abstract The paper studies a solution existence problem of the nonlinear Duffing equation of the form F ( x , μ , β ) = x ″ + x + μ x 3 − β sin t = 0 , β > 0 , μ ≠ 0 , $$ F(x,\mu, \beta)=x''+x+\mu x^{3}-\beta\sin t = 0,\quad \beta > 0, \m
Externí odkaz:
https://doaj.org/article/a29d7606ded34d469abbed80aa6a24bd
Publikováno v:
Doklady Mathematics. 103:76-80
New properties of convex infinitely differentiable functions related to extremal problems are established. It is shown that, in a neighborhood of the solution, even if the Hessian matrix is singular at the solution point of the function to be minimiz
Publikováno v:
Computational Mathematics and Mathematical Physics. 60:1412-1421
Some fundamental optimization results are proved in new ways, which are not traditional and provide a new view of well-known results. Constructions of $$p$$ -regularity theory are used to justify the facts under consideration, and the 2-factor method
Autor:
Beata Medak, Alexey A. Tret'yakov
Publikováno v:
Journal of Dynamics and Differential Equations. 33:1087-1107
This paper studies the problem of the continuous dependence of Van der Pol equation solutions with respect to the boundary conditions. We provide a new approach for the existence of such solutions via p-regularity theory. Several existence theorems a
Publikováno v:
Optimization Methods and Software. 36:811-820
The paper illustrates connections between classical results of Analysis and Optimization. The focus is on new elementary proofs of Implicit Function Theorem, Lusternik's Theorem, and optimality con...
Publikováno v:
Computational Mathematics and Mathematical Physics. 60:222-226
A numerical method combining a gradient technique with the projection onto a linear manifold is proposed for solving systems of linear inequalities. It is shown that the method converges in a finite number of iterations and its running time is estima
Autor:
Alexey A. Tret'yakov, B. Medak
Publikováno v:
Доклады Академии наук. 488:126-129
The problem of the existence of a continuous dependence of the solution of a boundary value problem on a parameter is considered. In this paper, it is proved that, in the presence of the p-regularity property, there exists a solution that continuousl
Publikováno v:
Russian Journal of Numerical Analysis and Mathematical Modelling. 34:163-174
In this paper we present a new solution method for underdetermined systems of nonlinear equations in a neighborhood of a certain point of the variety of solutions where the Jacoby matrix has incomplete rank. Such systems are usually called degenerate
Publikováno v:
Доклады Академии наук. 485:655-658
The classical Farkas theorem of the alternative is considered, which is widely used in various areas of mathematics and has numerous proofs and formulations. An entirely new elementary proof of this theorem is proposed. It is based on the considerati