Normalized solutions for Sch\"odinger equations with potential and general nonlinearities involving critical case on large convex domains
Abstract
In this paper, we study the following Schr\"odinger equations with potentials and general nonlinearities equation* \aligned & - u+V(x)u+λ u=|u|q-2u+β f(u), \\ & ∫ |u|2dx=, aligned . equation* both on RN as well as on domains r where ⊂ RN is an open bounded convex domain and r>0 is large. The exponent satisfies 2+4N≤ q≤2*=2 NN-2 and f:R→ R satisfies L2-subcritical or L2-critical growth. This paper generalizes the conclusion of Bartsch et al. in TBAQ2023(2023, arXiv preprint). Moreover, we consider the Sobolev critical case and L2-critical case of the above problem.
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