We look for normalized solutions to the nonlinear Schrödinger equation with mixed fractional Laplacians and combined nonlinearities \array{ll (-Δ) ^s₁ u+ (-Δ) ^s₂ u=λu+μ|u|^q-2u+|u|^p-2u \ in\;R^{N}, \\0. 1cm ₑ^₍|u|² dx=a², array. where N 2, \;00 and λ R appears as an unknown Lagrange multiplier. We mainly focus on some special cases, including fractional Sobolev subcritical or critical exponent. More precisely, for 2<q<2+4s₂N<2+4s₁N<p<2ₒ䃑^: =2NN-2s₁, we prove that the above problem has at least two solutions: a ground state with negative energy and a solution of mountain pass type with positive energy. For 2<q<2+4s₂N and p=2ₒ䃑^, we also obtain the existence of ground states. Our results extend some previous ones of Chergui et al. (Calc. Var. Partial Differ. Equ. , 2023) and Luo et al. (Adv. Nonlinear Stud. , 2022).
Yu et al. (Thu,) studied this question.
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