Hyperbolic Fracton Model, Subsystem Symmetry and Holography III: Extension to Generic Tessellations

arxiv: 2510.25994 · v2 · submitted 2025-10-29 · ❄️ cond-mat.str-el · hep-th· quant-ph

Hyperbolic Fracton Model, Subsystem Symmetry and Holography III: Extension to Generic Tessellations

Yosef Shokeeb , Ludovic D.C. Jaubert , Han Yan This is my paper

Pith reviewed 2026-05-18 02:14 UTC · model grok-4.3

classification ❄️ cond-mat.str-el hep-thquant-ph

keywords hyperbolic fracton modelsubsystem symmetryholographic correspondencegeneric tessellationsfracton mobilityRyu-Takayanagi formulaRindler reconstruction

0 comments p. Extension

The pith

The hyperbolic fracton model retains its holographic properties when extended to generic tessellations.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper extends the hyperbolic fracton model from the specific {5,4} tessellation to arbitrary hyperbolic tessellations. It demonstrates that ground-state degeneracy and subsystem symmetries arise through a recursive inflation rule applied layer by layer, while fracton excitations display distance-dependent and size-dependent mobility patterns that vary with the underlying geometry. Despite these more intricate features, the model preserves subregion duality via Rindler reconstruction, the Ryu-Takayanagi relation for mutual information, and black-hole-like entropy scaling with horizon area. A reader would care because this shows the link between fracton physics and holography does not rely on a single lattice choice.

Core claim

The hyperbolic fracton model defined on generic tessellations generates subsystem symmetries and fracton excitations recursively through an inflation rule, producing geometry-dependent mobility patterns that differ from flat-lattice fractons, yet the same holographic correspondences—subregion duality, Ryu-Takayanagi mutual information, and area-law entropy—continue to hold.

What carries the argument

The recursive inflation rule that builds the lattice layer by layer and generates the ground-state degeneracy together with the subsystem symmetries.

If this is right

Ground-state degeneracy grows recursively without a single uniform pattern across layers.
Fracton excitations exhibit exponential growth with distance and algebraic growth with lattice size, both sensitive to local tessellation geometry.
Subregion duality, Ryu-Takayanagi mutual information, and horizon-area entropy scaling remain valid holographic signatures.
The model supplies a platform for studying more intricate subsystem symmetries than those appearing on regular flat or {5,4} lattices.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The persistence of holography suggests that similar constructions could be attempted on other curved lattices or in higher dimensions to test the robustness of the correspondence.
Geometry-dependent fracton mobility may imply new constraints on possible quantum error-correcting codes built from such models.
If the recursive rule can be inverted, it might allow systematic classification of all hyperbolic fracton models by their tessellation sequences.

Load-bearing premise

The recursive inflation rule defines well-behaved subsystem symmetries and fracton excitations that allow the same holographic tests to be performed as on the original tessellation.

What would settle it

A calculation on one additional tessellation in which the mutual information between subregions deviates from the Ryu-Takayanagi prediction or the effective entropy fails to scale with horizon area.

read the original abstract

We generalize the Hyperbolic Fracton Model from the $\{5,4\}$ tessellation to generic tessellations, and investigate its core properties: subsystem symmetries, fracton mobility, and holographic correspondence. While the model on the original tessellation has features reminiscent of the flat-space lattice cases, the generalized tessellations exhibit a far richer and more intricate structure. The ground-state degeneracy and subsystem symmetries are generated recursively layer-by-layer, through the inflation rule, but without a simple, uniform pattern. The fracton excitations follow exponential-in-distance and algebraic-in-lattice-size growing patterns when moving outward, and depend sensitively to the tessellation geometry, differing qualitatively from both type-I or type-II fracton model on flat lattices. Despite this increased complexity, the hallmark holographic features -- subregion duality via Rindler reconstruction, the Ryu-Takayanagi formula for mutual information, and effective black hole entropy scaling with horizon area -- remain valid. These results demonstrate that the holographic correspondence in fracton models persists in generic tessellations, and provide a natural platform to explore more intricate subsystem symmetries and fracton physics.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The main point is that holographic signatures like Rindler duality and area-law entropy appear to survive the move to generic tessellations, though the abstract gives no derivations to check.

read the letter

This paper extends the hyperbolic fracton model from the {5,4} tessellation to generic ones and claims the core holographic features still work despite richer structure. The new content centers on an inflation rule that generates subsystem symmetries and ground-state degeneracy layer by layer without a uniform pattern. Fracton mobility then follows geometry-dependent growth, either exponential in distance or algebraic in system size, which differs from flat-lattice type-I or type-II cases. The authors report that subregion duality via Rindler reconstruction, the Ryu-Takayanagi formula for mutual information, and effective black-hole entropy scaling with horizon area all remain valid. If the calculations hold, this tests whether the fracton-holography link is robust rather than lattice-specific, which is a straightforward next step after the earlier papers in the series. The work does a reasonable job framing the added complexity as a feature rather than a problem. The soft spot is that the abstract supplies the claims but no equations, explicit checks, or numerical results. Without seeing how the holographic quantities are actually computed on the new lattices, it is difficult to judge whether the recursive symmetries and variable mobility introduce hidden issues. The central assumption—that the inflation rule keeps the excitations and symmetries well-defined enough for the same duality and entropy tests—needs direct verification in the full text. This is mainly for readers already following fracton models with holographic angles or subsystem symmetries on curved lattices. Someone tracking the series would get the most from seeing how the generalization plays out. The question of robustness across tessellations is worth proper scrutiny, so the paper deserves a serious referee. I would recommend sending it to peer review, provided the full version includes the derivations and checks that are missing from the abstract.

Referee Report

1 major / 2 minor

Summary. The manuscript generalizes the Hyperbolic Fracton Model from the {5,4} tessellation to generic tessellations. It states that ground-state degeneracy and subsystem symmetries are generated recursively layer-by-layer via an inflation rule without a simple uniform pattern, while fracton excitations exhibit exponential-in-distance and algebraic-in-lattice-size growth that depends sensitively on the tessellation geometry and differs from flat-lattice type-I or type-II models. The central claim is that, despite this richer structure, the holographic features of subregion duality via Rindler reconstruction, the Ryu-Takayanagi formula for mutual information, and effective black hole entropy scaling with horizon area remain valid.

Significance. If the claims are substantiated with explicit derivations, this extension would establish that the holographic correspondence in fracton models is robust across a wider class of hyperbolic geometries rather than being an artifact of the specific {5,4} case. It would supply a concrete platform for studying geometry-dependent subsystem symmetries and fracton mobility while preserving key holographic diagnostics.

major comments (1)

[Abstract] Abstract: the central claim that subregion duality via Rindler reconstruction, the Ryu-Takayanagi formula, and horizon-area entropy scaling 'remain valid' is load-bearing for the paper's contribution, yet the abstract supplies no derivations, explicit equations, or checks demonstrating that the recursive inflation rule preserves these quantities on generic tessellations.

minor comments (2)

[Abstract] The abstract refers to an 'inflation rule' for generating symmetries and excitations but does not define or illustrate it, which reduces clarity for readers who have not followed the preceding papers in the series.
[Abstract] The statements that fracton patterns 'differ qualitatively from both type-I or type-II fracton model on flat lattices' and that holographic features 'remain valid' would benefit from a brief indication of the specific tessellations examined beyond {5,4}.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the careful reading and constructive feedback on our generalization of the Hyperbolic Fracton Model to generic tessellations. We address the major comment below and will incorporate revisions to strengthen the presentation of our results.

read point-by-point responses

Referee: [Abstract] Abstract: the central claim that subregion duality via Rindler reconstruction, the Ryu-Takayanagi formula, and horizon-area entropy scaling 'remain valid' is load-bearing for the paper's contribution, yet the abstract supplies no derivations, explicit equations, or checks demonstrating that the recursive inflation rule preserves these quantities on generic tessellations.

Authors: We agree that the abstract is a high-level summary and does not contain explicit derivations or equations, which is standard for abstracts to ensure conciseness. The main text provides the detailed constructions: we define the model on generic tessellations via the recursive inflation rule, compute the layer-by-layer generation of ground-state degeneracy and subsystem symmetries, and explicitly verify the preservation of subregion duality (via Rindler reconstruction), the Ryu-Takayanagi formula for mutual information, and area-law scaling of effective black-hole entropy for multiple tessellations beyond {5,4}. These checks confirm that the holographic features hold despite the geometry-dependent fracton mobility and symmetry patterns. To address the concern, we will revise the abstract to briefly note that these quantities are verified through the recursive constructions and explicit calculations in the main body. revision: yes

Circularity Check

0 steps flagged

No significant circularity identified from available text

full rationale

The provided abstract generalizes the model to generic tessellations via a recursive inflation rule and asserts persistence of holographic features such as subregion duality, Ryu-Takayanagi mutual information, and horizon-area entropy scaling. No explicit equations, derivations, fitted parameters, or self-citations appear in the text that would allow identification of any reduction to inputs by construction. The claims are presented as outcomes of the generalization rather than tautologies or renamed fits, rendering the abstract-level presentation self-contained with no detectable circular steps.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities; all such details would appear in the full text.

pith-pipeline@v0.9.0 · 5712 in / 1200 out tokens · 37370 ms · 2026-05-18T02:14:58.862595+00:00 · methodology

discussion (0)

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The construction of our model is based on a set of geometry-dependent, recursive inflation rules that dictate the subsystem symmetries... M_τ = [[(q-4)+(q-3)(p-3), ...]] ... λ± = p(q-2)/2 - (q-1) ± δ

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