TY - JOUR

T1 - Centre-of-mass motion in multi-particle Schrödinger-Newton dynamics

AU - Giulini, Domenico

AU - Großardt, André

PY - 2014/7/8

Y1 - 2014/7/8

N2 - We investigate the implication of the nonlinear and non-local multi-particle Schrödinger-Newton equation for the motion of the mass centre of an extended multi-particle object, giving self-contained and comprehensible derivations. In particular, we discuss two opposite limiting cases. In the first case, the width of the centre-of-mass wave packet is assumed much larger than the actual extent of the object, in the second case it is assumed much smaller. Both cases result in nonlinear deviations from ordinary free Schrödinger evolution for the centre of mass. On a general conceptual level we include some discussion in order to clarify the physical basis and intention for studying the Schrödinger-Newton equation.

AB - We investigate the implication of the nonlinear and non-local multi-particle Schrödinger-Newton equation for the motion of the mass centre of an extended multi-particle object, giving self-contained and comprehensible derivations. In particular, we discuss two opposite limiting cases. In the first case, the width of the centre-of-mass wave packet is assumed much larger than the actual extent of the object, in the second case it is assumed much smaller. Both cases result in nonlinear deviations from ordinary free Schrödinger evolution for the centre of mass. On a general conceptual level we include some discussion in order to clarify the physical basis and intention for studying the Schrödinger-Newton equation.

KW - quantum gravity

KW - Schrödinger-Newton equation

KW - semi-classical gravity

UR - http://www.scopus.com/inward/record.url?scp=84904185002&partnerID=8YFLogxK

U2 - 10.1088/1367-2630/16/7/075005

DO - 10.1088/1367-2630/16/7/075005

M3 - Article

AN - SCOPUS:84904185002

VL - 16

JO - New journal of physics

JF - New journal of physics

SN - 1367-2630

M1 - 075005

ER -