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Elliptic Problems with Nonlocal Potential Arising in Models of Nonlinear Optics with nonlocal potentials is considered. The classical solvability of this problem is proved, and the integral
Multidimensional Hyperbolic Equations with Nonlocal Potentials: Families of Global SolutionsIn spaces of arbitrary dimensions, hyperbolic differential–difference equations with potentials
On the Absence of Weak Solutions of Nonlinear Nonnegative Higher Order Parabolic Inequalities with a Nonlocal Source systems with a singular potential and nonlocal sources. The proofs are based on the test function method
On Global Solutions of Two-Dimensional Hyperbolic Equations with General-Kind Nonlocal Potentials.e., the specified sign constancy) only for the case where the nonlocal term (i.e., the translated potential
Differential-Difference Elliptic Equations with Nonlocal Potentials in Half-Spaces differential-difference equations with nonlocal potentials arising in various applications not covered
Elliptic Differential-Difference Equations with Nonlocal Potentials in a Half-Space with nonlocal potentials: the differential operators act on the unknown (sought) function at one point, while
Nonlocal problems for the Vlasov-Poisson equations in an infinite cylinder and nonlocal boundary condition on the electric field potential are considered. For sufficiently small initial
Elliptic Equations with General-Kind Nonlocal Potentials in Half-Spaces-difference equations such that the potential admits translations in arbitrary directions. Such equations with nonlocal
Elliptic Equations with General-Kind Nonlocal Potentials in Half-Spaces-difference equations such that the potential admits translations in arbitrary directions. Such equations with nonlocal
Elliptic Equations with General-Kind Nonlocal Potentials in Half-Spaces-difference equations such that the potential admits translations in arbitrary directions. Such equations with nonlocal
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