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Boundary-Value Problems for the Helmholtz Equation for a Half-Plane with a Lipschitz Inclusion, modeling the process of wave diffraction, are constructed in the form of Helmholtz equations and boundary
Fundamental solution of multidimensional axisymmetric Helmholtz equation© 2016 Informa UK Limited, trading as Taylor & Francis Group.For axisymmetric Helmholtz equation
Double-layer potential of axially symmetric Helmholtz lowest term equation,which is the generalized Helmholtz equation,both with the lowest term and without it,a double-layer potential is found
On Constructing Dynamic Equations Methods with Allowance for Atabilization of Constraints the generalized Helmholtz conditions, one can compose the Lagrange equations with a dissipative function
Double-layer potential of axially symmetric Helmholtz lowest term equation,which is the generalized Helmholtz equation,both with the lowest term and without it,a double-layer potential is found
The cauchy problem for the helmholtz equation in a domain with a piecewise-smooth boundaryThe Cauchy problem for the Helmholtz equation is investigated in the case when a piecewise
Solution of Nonhomogeneous Helmholtz Equation with Variable Coefficient Using Boundary Domain Integral Method to the solution of the nonhomogeneous Helmholtz equation with variable coefficient. The analytical formulas
Application of generalized Helmholtz conditions to nonlinear stabilization function. Helmholtz conditions are considered to check whether an obtained system will be reducible to the form
Free and Forced Vibrations of a Composite Plate in a Perfect Compressible Fluid, Taking into Account Energy Dissipation in the Plate and Fluid by the generalized Helmholtz wave equations, composed with the introduction of the complex sound velocity according
Modeling of dynamics processes and dynamics control; [Динамика процестерiн модельдеу және байланыстарды тұрақтандыруды ескере отырып, жүйенi басқару синтезi]; [Моделирование процессов динамики и синтез управления системой с учетом стабилизации связей]Equations and methods of classical mechanics are used to describe the dynamics of technical systems
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