Lieb-Schultz-Mattis, Luttinger, and 't Hooft - anomaly matching in lattice systems

Cheng, Meng; Seiberg, Nathan

doi:10.21468/scipostphys.15.2.051

Cited by 25 publications

(56 citation statements)

References 70 publications

(251 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Our construction generates a new kind of non-local frustration by combining two primary ingredients: (1) a non-trivial dependence of the Casimir energy of the decoration CFT on the chain length modulo some integer, and (2) a geometrical constraint which forces all loops on a given lattice to have a certain length modulo some integer. The first ingredient was recently understood as arising from effectively twisted boundary conditions for certain chain lengths [43]. More generally, our work demonstrates the importance of the coefficients c r (which encode the Casimir energy dependence on the chain length modulo some integer) as an additional property of a CFT Hamiltonian with crucial physical consequences.…”

Section: Discussionmentioning

confidence: 66%

“…However, if c was negative, the energy per site would be minimized by taking L → ∞, leading to a loop which is macroscopically long and which can thus host a 1+1D theory with a vanishing gap. Interestingly, this scenario can be realized by choosing CFTs which are "frustrated" for certain chain lengths [43] and which can effectively behave as if c < 0, as we now show. A key insight is that, for certain CFTs, the value of c which appears in the Casimir energy is not always equal to the actual central charge and may depend on the chain length modulo some integer.…”

Section: Model and Solutionmentioning

confidence: 69%

“…Another generalization is to consider other decoration Hamiltonians beyond the ones we have proposed here. This motivates further work on classifying the possible c r sequences for known CFTs, especially beyond c = 1 theories [43].…”

Section: Discussionmentioning

confidence: 99%

“…From a spin-liquid perspective, we will see that our construction starts with a familiar route, in which local frustration (in our case Ising antiferromagnetism on a triangular lattice) leads to an exponentially large number of classical ground states which is described by a familiar ensemble of fully packed loops (FPL) [40][41][42]. However, the source of the exotic criticality we will describe below -fully packed self-avoiding walks described by a non-unitary c = −1 theory -lies elsewhere: It is due to an additional kind of non-local frustration whereby all allowed loops on the honeycomb lattice realize an effectively twisted boundary condition [43] for the CFT which lives on it.…”

Section: Introductionmentioning

confidence: 99%

See 3 more Smart Citations

Solvable models for 2+1D quantum critical points: Loop soups of 1+1D conformal field theories

Moharramipour,

Sehayek,

Scaffidi

2024

SciPost Phys.

View full text Add to dashboard Cite

We construct a class of solvable models for 2+1D quantum critical points by attaching 1+1D conformal field theories (CFTs) to fluctuating domain walls forming a “loop soup”. Specifically, our local Hamiltonian attaches gapless spin chains to the domain walls of a triangular lattice Ising antiferromagnet. The macroscopic degeneracy between antiferromagnetic configurations is split by the Casimir energy of each decorating CFT, which is usually negative and thus favors a short loop phase with a finite gap. However, we found a set of 1D CFT Hamiltonians for which the Casimir energy is effectively positive, making it favorable for domain walls to coalesce into a single “snake” which is macroscopically long and thus hosts a CFT with a vanishing gap. The snake configurations are geometrical objects also known as fully-packed self-avoiding walks or Hamiltonian walks which are described by an \mathrm{O}O(n=0) loop ensemble with a non-unitary 2+0D CFT description. Combining this description with the 1+1D decoration CFT, we obtain a 2+1D theory with unusual critical exponents and entanglement properties. Regarding the latter, we show that the log contributions from the decoration CFTs conspire with the spatial distribution of loops crossing the entanglement cut to generate a “non-local area law”. Our predictions are verified by Monte Carlo simulations.

show abstract

Section: Discussionmentioning

confidence: 66%

Section: Model and Solutionmentioning

confidence: 69%

Section: Discussionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Solvable models for 2+1D quantum critical points: Loop soups of 1+1D conformal field theories

Moharramipour,

Sehayek,

Scaffidi

2024

SciPost Phys.

View full text Add to dashboard Cite

show abstract

“…A characteristic example of such a constraint is the famous Lieb-Schultz-Mattis (LSM) theorem [3] and its generalizations . Various authors [14,16,17,19,20,29,32] have suggested that these results should be phrased as 't Hooft anomalies. In particular, [32] has presented a framework to couple the lattice system to background gauge fields and to probe for anomalies as a failure of their gauge symmetry.…”

Section: Introductionmentioning

confidence: 99%

Majorana chain and Ising model - (non-invertible) translations, anomalies, and emanant symmetries

Seiberg,

Shao

2024

SciPost Phys.

Self Cite

View full text Add to dashboard Cite

We study the symmetries of closed Majorana chains in 1+1d, including the translation, fermion parity, spatial parity, and time-reversal symmetries. The algebra of the symmetry operators is realized projectively on the Hilbert space, signaling anomalies on the lattice, and constraining the long-distance behavior. In the special case of the free Hamiltonian (and small deformations thereof), the continuum limit is the 1+1d free Majorana CFT. Its continuum chiral fermion parity (-1)^{F_L}(−1)FL emanates from the lattice translation symmetry. We find a lattice precursor of its mod 8 ’t Hooft anomaly. Using a Jordan-Wigner transformation, we sum over the spin structures of the lattice model (a procedure known as the GSO projection), while carefully tracking the global symmetries. In the resulting bosonic model of Ising spins, the Majorana translation operator leads to a non-invertible lattice translation symmetry at the critical point. The non-invertible Kramers-Wannier duality operator of the continuum Ising CFT emanates from this non-invertible lattice translation of the transverse-field Ising model.

show abstract

Holographic Duals of Symmetry Broken Phases

Antinucci,

Benini,

Rizi

2024

Fortschritte der Physik

View full text Add to dashboard Cite

A novel interpretation of Symmetry Topological Field Theories (SymTFTs) as theories of gravity is explored by proposing a holographic duality where the bulk SymTFT (with the gauging of a suitable Lagrangian algebra) is dual to the universal effective field theory (EFT) that describes spontaneous symmetry breaking on the boundary. The authors tested this conjecture in various dimensions and with many examples involving different continuous symmetry structures, including non‐Abelian and non‐invertible symmetries, as well as higher groups. For instance, many Abelian SymTFTs are found to be dual to free theories of Goldstone bosons or generalized Maxwell fields, while non‐Abelian SymTFTs relate to non‐linear sigma models with target spaces defined by the symmetry groups. The analysis is also extended to include the non‐invertible axial symmetry, which is shown to be dual to axion‐Maxwell theory, and a non‐Abelian 2‐group structure in four dimensions, deriving a new parity‐violating interaction that has implications for the low‐energy dynamics of QCD.

show abstract

Lieb-Schultz-Mattis, Luttinger, and 't Hooft - anomaly matching in lattice systems

Cited by 25 publications

References 70 publications

Solvable models for 2+1D quantum critical points: Loop soups of 1+1D conformal field theories

Solvable models for 2+1D quantum critical points: Loop soups of 1+1D conformal field theories

Majorana chain and Ising model - (non-invertible) translations, anomalies, and emanant symmetries

Holographic Duals of Symmetry Broken Phases

Contact Info

Product

Resources

About