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This paper studies the existence and multiplicity of normalized solutions to the lower critical Choquard equation with a L²-subcritical local perturbation and kinds of bounded potentials equation* cases - u+V (x) u \\ = u+ (I_|u|^ ({N+) /N}) |u|^ ({N+) /N-2}u + |u|^q-2u & in RN, \\ ₑ₍|u|²dx=a², cases equation* where N 1, , a> 0, 2< q< 2+4/N, (0, N), I_ is the Riesz potential, V (x) is a bounded potential and R is an unknown parameter that appears as a Lagrange multiplier.
Li et al. (Sun,) studied this question.
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