Virial identities for nonlinear Schrödinger equations with a critical coefficient inverse-square potential

Toshiyuki Suzuki
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引用次数: 3

Abstract

Virial identities for nonlinear Schrödinger equations with some strongly singular potential (a|x|−2 ) are established. Here if a = a(N) :=−(N−2)2/4 , then Pa(N) :=−Δ+a(N)|x|−2 is nonnegative selfadjoint in the sense of Friedrichs extension. But the energy class D((1 + Pa(N))) does not coincide with H1(RN ) . Thus justification of the virial identities has a lot of difficulties. The identities can be applicable for showing blow-up in finite time and for proving the existence of scattering states. Mathematics subject classification (2010): 35Q55, 35Q40, 81Q15.
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具有临界系数平方反比势的非线性Schrödinger方程的维里恒等式
建立了具有强奇异势(a|x|−2)的非线性Schrödinger方程的维里恒等式。若a = a(N):=−(N−2)2/4,则Pa(N):=−Δ+a(N)|x|−2在Friedrichs推广意义上是非负自伴的。但能量类D((1 + Pa(N))与H1(RN)不重合。因此,虚拟身份的正当化存在很多困难。该恒等式可用于表示有限时间内的爆炸和证明散射态的存在。数学学科分类(2010):35Q55、35Q40、81Q15。
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