Intertwining semiclassical solutions to a Schr\"odinger-Newton system

Abstract

We study the problem (-εi∇+A(x)) 2u+V(x)u=ε -2(1|x||u|2) u, u∈ L2(R3,C),\ \ \ \ε∇ u+iAu∈ L2(R3,C3), where A3→R3 is an exterior magnetic potential, V3→R is an exterior electric potential, and ε is a small positive number. If A=0 and ε= is Planck's constant this problem is equivalent to the Schr\"odinger-Newton equations proposed by Penrose in pe2\ to describe his view that quantum state reduction occurs due to some gravitational effect. We assume that A and V are compatible with the action of a group G of linear isometries of R3. Then, for any given homomorphism τ:G→S1 into the unit complex numbers, we show that there is a combined effect of the symmetries and the potential V on the number of semiclassical solutions u:R% 3→C which satisfy u(gx)=τ(g)u(x) for all g∈ G, x∈R3. We also study the concentration behavior of these solutions as ε→0.