Global existence and blow-up for the variable coefficient Schr\"odinger equations with a linear potential

Abstract

In this paper, we study a class of variable coefficient Schr\"odinger equations with a linear potential \[i∂tu+∇·(|x|b∇ u)-V(x)u=-|x|c|u|pu,\] where 2-n<b≤0,\ c≥ b-2 and 0<pc≤(2-b)(p+2), where pc:=np-2c. In the radial or finite variance case, we firstly prove the global existence and blow-up below the ground state threshold for the mass-critical and inter-critical nonlinearities. Next, adopting the variational method of Ibrahim-Masmoudi-Nakanishi IMN, we obtain a sufficient condition on the nonradial initial data, under which the global behavior of the general solution is established.

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