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Elliptic Problems with Nonlocal Potential Arising in Models of Nonlinear OpticsThe Dirichlet problem in the half-plane for strong elliptic differential-difference equations
Differential-Difference Elliptic Equations with Nonlocal Potentials in Half-Spaces for an elliptic equation with an arbitrary amount of potentials undergoing translations in arbitrary directions
Elliptic Differential-Difference Equations with Nonlocal Potentials in a Half-Space. This is explained by the nonlocal nature of functional-differential equations: unlike in classical differential
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
Half-plane differential-difference elliptic problems with general-kind nonlocal potentials-difference equations with nonlocal general-kind potentials, which are linear combinations of translations
Half-space Dirichlet problem with summable boundary-value functions for elliptic equations with general-kind nonlocal potentialsHalf-space Dirichlet problem with summable boundary-value functions for elliptic equations
Nonlocal elliptic problems in infinite cylinder and applicationsWe consider a unique solvability of nonlocal elliptic problems in infinite cylinder in weighted
On elliptic differential and difference problems in a Hilbert space with special type nonlocal conditionsIn the present paper, elliptic differential and difference problems in a Hilbert space
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