Bimetric MOND gravity

Abstract

A new relativistic formulation of MOND is advanced, involving two metrics as independent degrees of freedom: the MOND metric gmn, to which alone matter couples, and an auxiliary metric g*mn. The main idea hinges on the fact that we can form tensors from the difference, Cabc, of the Levi-Civita connections of the two metrics, and these act like gravitational accelerations. In the context of MOND we can form dimensionless `acceleration' scalars, and functions thereof, from contractions of Cabc/a0. I look at a class of bimetric MOND theories governed by an action with the gravitational Lagrangian density b sqrt(g)R+a sqrt(g*) R* -2(gg*)1/4f(k)a02M(U/a02), and with matter actions I(gmn,psi)+I*(g*mn,chi), with U a scalar quadratic in the Cabc, k=(g/g*)1/4, and allowing for the existence of twin matter, chi, that couples to g*mn alone. In particular, I concentrate on one interesting and simple choice of the scalar U. This theory introduces only one new constant, a0; it tends simply to General Relativity in the limit a0 goes to 0, and to a phenomenologically valid MOND theory in the nonrelativistic limit. The theory naturally gives MOND and "dark energy" effects from the same term in the action, both controlled by the MOND constant a0. As regards gravitational lensing by nonrelativistic systems--a holy grail for relativistic MOND theories--the theory predicts that the same potential that controls massive-particle motion also dictates lensing in the same way as in GR. This last result can be modified with other choices of U, but lensing is still enhanced and MOND-like, with an effective logarithmic potential.