Titlebook: Differential Equations, Mathematical Modeling and Computational Algorithms; DEMMCA 2021, Belgoro Vladimir Vasilyev Conference proceedings 2

Notorious

Renal Parenchymal and Inflammatory Diseasestor four theorems on local unique solvability are proved. Abstract results are illustrated by initial-boundary value problems for partial differential systems of equations with Gerasimov—Caputo derivatives in time.

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Traumafolgen am Urogenitaltrakt ordinary differential equations. This paper offers a method for construction of piecewise-constant approximations that satisfy the given geometric control constraints. The approximations converge almost everywhere to the desired control, and the reconstructed trajectories of the dynamical system converge uniformly to the observed trajectory.

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小丑

grovel

Conference proceedings 2023 Belgorod, Russia, in October 2021 and is devoted to various aspects of the theory of differential equations and their applications in various branches of science. Theoretical papers devoted to the qualitative analysis of emerging mathematical objects, theorems of the existence and uniqueness of sol

ADJ

2194-1009 e International Conference on Differential Equations, Mathematical Modeling and Computational Algorithms, held in Belgorod, Russia, in October 2021 and is devoted to various aspects of the theory of differential equations and their applications in various branches of science. Theoretical papers devo

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System for Reporting and Analysing Incidents the corresponding degenerate linear equation, which were obtained by authors earlier, are applied to the consideration of initial boundary value problems for linearized and nonlinear systems of partial differential equations with the Dzhrbashyan—Nersesyan time derivative, which describes the dynamics of viscoelastic fluids.

sigmoid-colon

D. Mathis,P. Gosse,N. Grenier,H. Trillaudstem of two boundary integral equations with weakly and strongly singular integrals on a perfectly conducting surface. Finally, we construct a numerical method for the considered problem which based on solution of these integral equations.

出沒(méi)

L. Boyer,H. Rousseau,A. Raynaudntial and dissipative systems is shown. At the same time, the introduced force fields make the considered systems dissipative with dissipation of different signs and generalize the previously considered ones. We also represent the typical examples from rigid body dynamics.

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