Why Does Gravity Ignore the Vacuum Energy?

TL;DR

This paper proposes a novel approach to gravity that restores symmetry under shifting the matter Lagrangian, leading to a perspective where the cosmological constant emerges as an integration constant, potentially addressing the cosmological constant problem.

Contribution

It introduces a gravity formulation invariant under matter Lagrangian shifts, deriving equations from null surface thermodynamics, and generalizes to higher-order gravity corrections.

Findings

Gravity equations are invariant under matter Lagrangian shifts.

The cosmological constant appears as an integration constant.

The approach can incorporate higher-order gravitational corrections.

Abstract

The equations of motion for matter fields are invariant under the shift of the matter lagrangian by a constant. Such a shift changes the energy momentum tensor of matter by T^a_b --> T^a_b +\rho \delta^a_b. In the conventional approach, gravity breaks this symmetry and the gravitational field equations are not invariant under such a shift of the energy momentum tensor. I argue that until this symmetry is restored, one cannot obtain a satisfactory solution to the cosmological constant problem. I describe an alternative perspective to gravity in which the gravitational field equations are [G_{ab} -\kappa T_{ab}] n^an^b =0 for all null vectors n^a. This is obviously invariant under the change T^a_b --> T^a_b +\rho \delta^a_b and restores the symmetry under shifting the matter lagrangian by a constant. These equations are equivalent to G_{ab} = \kappa T_{ab} + Cg_{ab} where C is now an integration constant so that the role of the cosmological constant is very different in this approach. The cosmological constant now arises as an integration constant, somewhat like the mass M in the Schwarzschild metric, the value of which can be chosen depending on the physical context. These equations can be obtained from a variational principle which uses the null surfaces of spacetime as local Rindler horizons and can be given a thermodynamic interpretation. This approach turns out to be quite general and can encompass even the higher order corrections to Einstein's gravity and suggests a principle to determine the form of these corrections in a systematic manner.