Solutions with various structures for semilinear equations in Rn driven by fractional Laplacian
Abstract
We study bounded solutions to the fractional equation (-)s u + u - |u|q-2u = 0 in Rn for n2 and subcritical exponent q>2. Applying the variational approach based on concentration arguments and symmetry considerations which was introduced by Lerman, Naryshkin and Nazarov (2020) we construct several types of solutions with various structures (radial, rectangular, triangular, hexagonal, quasi-periodic, breather type, etc.).
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