The paper considers the initial value problem for an inhomogeneous nonlinear Schrödinger (INLS) equation with a potential of the form V(x) = k(x)|x|^(-b), where b > 0. The authors make assumptions on the function k(x) and investigate the global existence and blow-up behavior of solutions.
Key highlights:
Global Existence: The authors prove that if the initial data has mass less than the mass of the unique positive and radial solution Qk(0), then the corresponding solution is global in H1.
Blow-up for Negative Energy Solutions: Under suitable assumptions on k(x), the authors show that solutions with negative initial energy blow up in finite time.
Existence of Blow-up Solutions at the Threshold: The authors establish the existence of blow-up solutions with mass slightly above the mass of Qk(0), by considering two cases: (i) when x·∇k(x) ≤ 0 globally, and (ii) when x·∇k(x) < 0 locally near the origin.
Characterization of Minimal Mass Blow-up Solutions: The authors prove that any minimal mass blow-up solution, i.e., a solution with initial mass equal to the mass of Qk(0) that blows up in finite time, must concentrate at least the mass of Qk(0) around the origin.
Existence and Non-existence of Minimal Mass Blow-up Solutions: The authors provide sufficient conditions for the existence and non-existence of minimal mass blow-up solutions, depending on the behavior of the function k(x) near the origin.
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arxiv.org
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