A generalisation of the Gagliardo--Nirenberg Inequality with applications to mass-critical and mass-subcritical elliptic equations

Abstract

Via a new inequality \`a la Gagliardo--Nirenberg, we prove the existence and nonexistence of solutions to equation* cases (-)s u + μ|y|2s u + λ u = f(u), RN x = (y,z) ∈ RK × RN-K, \\ ∫RN u2 \, dx = cases equation* in the mass-critical and mass-subcritical regimes, where s>0, N K 2, μ ∈ R belongs to a specific range, >0 is given a priori, and λ ∈ R is unknown. Additionally, we obtain similar results for the problem above with μ=0 and N 1 as well as a related curl-curl equation. Finally, we provide a thorough insight into the threshold for that divides the scenarios of negative and zero least energy.