Emergent Gravity of Fractons: Mach's Principle Revisited
Michael Pretko
TL;DR
This work demonstrates how a rank-2 fracton gauge theory with local center-of-mass conservation can reproduce gravity-like attraction and, under Mach's principle, finite inertia. By coupling fractons to an emergent graviton in a minimal toy model with the Gauss law $\partial_i\partial_j E^{ij} = \rho$, the authors derive a geodesic-like framework and show that two-body motion yields attractive, quasi-geodesic dynamics; gapless dipoles and a finite matter density are shown to recover Newtonian scaling $v(r) \sim \sqrt{1/r}$. The analysis further argues that matter can generate the background space itself, implying an emergent geometry tied to the matter content, and discusses how nonlinearities and gauge potentials can influence long-range behavior. The study also addresses how such a framework circumvents the Weinberg-Witten no-go theorem, outlining future directions toward fully nonlinear, Lorentz-invariant emergent gravity in flat spacetime.
Abstract
Recent work has established the existence of stable quantum phases of matter described by symmetric tensor gauge fields, which naturally couple to particles of restricted mobility, such as fractons. We focus on a minimal toy model of a rank 2 tensor gauge field, consisting of fractons coupled to an emergent graviton (massless spin-2 excitation). We show how to reconcile the immobility of fractons with the expected gravitational behavior of the model. First, we reformulate the fracton phenomenon in terms of an emergent center of mass quantum number, and we show how an effective attraction arises from the principles of locality and conservation of center of mass. This interaction between fractons is always attractive and can be recast in geometric language, with a geodesic-like formulation, thereby satisfying the expected properties of a gravitational force. This force will generically be short-ranged, but we discuss how the power-law behavior of Newtonian gravity can arise under certain conditions. We then show that, while an isolated fracton is immobile, fractons are endowed with finite inertia by the presence of a large-scale distribution of other fractons, in a concrete manifestation of Mach's principle. Our formalism provides suggestive hints that matter plays a fundamental role, not only in perturbing, but in creating the background space in which it propagates.