Add to ORKGGapless fracton phases are characterized by the conservation of certain charges and their higher moments. These charges generically couple to higher rank gauge fields. In this paper we study systems conserving charge and dipole moment, and construct the corresponding gauge fields propagating in arbitrary curved backgrounds. The relation between the symmetries of these class of systems and spacetime transformations is discussed. In fact, we argue that higher rank symmetric gauge theories are closer to gravitational fields than to a standard gauge theory.Comment: 7 pages, discussion in some sections has been extended. Published versio
There has been a surge of interest in effective non-Lorentzian theories of excitations with restrict...
We initiate a systematic study of fracton physics within the geometric framework of Double Field The...
The scope of quantum field theory is extended by introducing a broader class of discrete gauge theor...
We consistently couple simple continuum field theories with fracton excitations to curved spacetime ...
We study complex scalar theories with dipole symmetry and uncover a no-go theorem that governs the s...
We show that the fractonic dipole-conserving algebra can be obtained as an Aristotelian (and pseudo-...
We consider the theory of a symmetric tensor field in 4D, invariant under a subclass of infinitesima...
Using a generalised Noether prescription we are able to extract all the currents and their conservat...
Recent work has established the existence of stable quantum phases of matter described by symmetric ...
For the Yang-Mills-type gauge-field theory with Lorentz symmetry group, we propose and verify an exp...
We argue that a spontaneous breakdown of local Weyl invariance offers a mechanism in which gravitati...
We develop a general framework for constructing charges associated with diffeomorphisms in gravitati...
We find the set of generalized symmetries associated with the free graviton theory in four dimension...
Fractons and other subdimensional particles are an exotic class of emergent quasi-particle excitatio...
We present an effective field theory approach to the fracton phases. The approach is based on the no...
There has been a surge of interest in effective non-Lorentzian theories of excitations with restrict...
We initiate a systematic study of fracton physics within the geometric framework of Double Field The...
The scope of quantum field theory is extended by introducing a broader class of discrete gauge theor...
We consistently couple simple continuum field theories with fracton excitations to curved spacetime ...
We study complex scalar theories with dipole symmetry and uncover a no-go theorem that governs the s...
We show that the fractonic dipole-conserving algebra can be obtained as an Aristotelian (and pseudo-...
We consider the theory of a symmetric tensor field in 4D, invariant under a subclass of infinitesima...
Using a generalised Noether prescription we are able to extract all the currents and their conservat...
Recent work has established the existence of stable quantum phases of matter described by symmetric ...
For the Yang-Mills-type gauge-field theory with Lorentz symmetry group, we propose and verify an exp...
We argue that a spontaneous breakdown of local Weyl invariance offers a mechanism in which gravitati...
We develop a general framework for constructing charges associated with diffeomorphisms in gravitati...
We find the set of generalized symmetries associated with the free graviton theory in four dimension...
Fractons and other subdimensional particles are an exotic class of emergent quasi-particle excitatio...
We present an effective field theory approach to the fracton phases. The approach is based on the no...
There has been a surge of interest in effective non-Lorentzian theories of excitations with restrict...
We initiate a systematic study of fracton physics within the geometric framework of Double Field The...
The scope of quantum field theory is extended by introducing a broader class of discrete gauge theor...