On the asymptotic decay of the Schr\"odinger--Newton ground state
Abstract
The asymptotics of the ground state u(r) of the Schr\"odinger--Newton equation in R3 was determined by V. Moroz and J. van Schaftingen to be u(r) A e-r/ r1 - \|u\|22/8π for some A>0, in units that fix the exponential rate to unity. They left open the value of \|u\|22, the squared L2 norm of u. Here it is rigorously shown that 21/33π2≤ \|u\|22≤ 23π3/2. It is reported that numerically \|u\|22≈ 14.03π, revealing that the monomial prefactor of e-r increases with r in a concave manner. Asymptotic results are proposed for the Schr\"odinger--Newton equation with external - K/r potential, and for the related Hartree equation of a bosonic atom or ion.
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