The blow-up dynamics for the divergence Schr\"odinger equations with inhomogeneous nonlinearity
Abstract
This paper is dedicated to the blow-up solution for the divergence Schr\"odinger equations with inhomogeneous nonlinearity (dINLS for short) \[i∂tu+∇·(|x|b∇ u)=-|x|c|u|pu, u(x,0)=u0(x),\] where 2-n<b<2, c>b-2, and np-2c<(2-b)(p+2). First, for radial blow-up solutions in Wb1,2, we prove an upper bound on the blow-up rate for the intercritical dNLS. Moreover, an L2-norm concentration in the mass-critical case is also obtained by giving a compact lemma. Next, we turn to the non-radial case. By establishing two types of Gagliardo-Nirenberg inequalities, we show the existence of finite time blow-up solutions in Hsc W1,2b, where Hsc=(-)-sc2L2, and Wb1,2=|x|-b2(-)-12L2. As an application, we obtain a lower bound for this blow-up rate, generalizing the work of Merle and Rapha\"el [Amer. J. Math. 130(4) (2008), pp. 945-978] for the classical NLS equations to the dINLS setting.
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