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The infinite-dimensional linear programming problems and their approximation. The possibility of approximating of these problems by finite-dimensional problems is discussed. © 2012 Nova
The infinite-dimensional linear programming problems and their approximation. The possibility of approximating of these problems by finite-dimensional problems is discussed. © 2012 Nova
SOLVING OPTIMAL CONTROL PROBLEMS OF DYNAMIC SYSTEMS IN INFINITE-DIMENSIONAL SPACES WITH SMALL PARAMETERS in infinite-dimensional spaces with small parameters. The control construction is based on the search for a
Partition of a unity on infinite-dimensional manifold of the Lipschiz class Lipk for infinitedimensional manifold M modeled in nonnormable topological vector Fréchet space F. We establish that a manifold
Partition of a unity on infinite-dimensional manifold of the Lipschiz class Lipk for infinitedimensional manifold M modeled in nonnormable topological vector Fréchet space F. We establish that a manifold
On the index of nonlocal elliptic operators for the group of dilations) nonlocal operator as an operator acting on the sections of infinite dimensional bundles on the orbit space
Convergence and stability analysis of kolmogorov system solutions in infinite-dimensional space in infinite-dimensional space on the basis of local integrability, non-negative coefficients and diagonal
Unbounded perturbations of two-dimensional diffusion processes with nonlocal boundary conditions diffusion processes, is discussed. A space as the completion of the set of infinitely differentiable
On the Borsuk-Ulam Theorem for Lipschitz Mappings on an Infinite-Dimensional Space Lipschitz mapping. A kind of analogue of the infinite-dimensional version of the Borsuk-Ulam theorem
On the extension of singular linear infinite-dimensional Hamiltonian flows in a finite time, the phase space of which is a separable Hilbert space. It is shown
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