Automorphic Bloch theorems for hyperbolic lattices

Maciejko, Joseph; Rayan, Steven

doi:10.48550/arxiv.2108.09314

Cited by 4 publications

(14 citation statements)

References 49 publications

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“…The foundation is a hyperbolic version of the classical Bloch theorem, which constructs the eigenstates of the crystal Hamiltonian from crystal momenta. Hyperbolic Bloch states were introduced in [46], and a corresponding version of Bloch's theorem was formulated in [45].…”

Section: Hyperbolic Band Theorymentioning

confidence: 99%

“…This argument is essentially given in [45], though framed slightly differently. That paper dealt with a finite subset of the full hyperbolic lattice in the tight-binding model, and consequently a finite-dimensional Hilbert space.…”

Section: Hyperbolic Band Theorymentioning

confidence: 99%

“…We call this the abelian Brillouin zone, which was introduced for hyperbolic crystals in [46]. The other connected components of momentum space are the character varieties Hom irr (Γ, U (n))/U (n), which we will call the nonabelian Brillouin zones, introduced in [45]. We can express these geometrically as moduli spaces of vector bundles on Riemann surfaces.…”

Section: Hyperbolic Band Theorymentioning

confidence: 99%

“…A similar scene plays out for higher rank representations, but the details are more involved [45]. Starting from a trivial vector bundle H × C n → H, we obtain a topologically trivial 2 vector bundle E → Σ by quotienting out Γ acting by γ : (x, v) → (γ(x), ρ(γ)(v)).…”

Section: 3mentioning

confidence: 99%

“…In regards to the precise organization of the paper, Section 2 synthesizes the hyperbolic band theory framework of [46,45] in a self-contained and mathematically-oriented manner. It contributes a description of the abelian and nonabelian crystal Hamiltonian, with various geometric and physical interpretations.…”

Section: Introductionmentioning

confidence: 99%

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Hyperbolic band theory through Higgs bundles

Kienzle,

Rayan

2022

Preprint

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Hyperbolic lattices underlie a new form of quantum matter with potential applications to quantum computing and simulation and which, to date, have been engineered artificially. A corresponding hyperbolic band theory has emerged, extending 2-dimensional Euclidean band theory in a natural way to higher-genus configuration spaces. Attempts to develop the hyperbolic analogue of Bloch's theorem have revealed an intrinsic role for algebro-geometric moduli spaces, notably those of stable bundles on a curve. We expand this picture to include Higgs bundles, which enjoy natural interpretations in the context of band theory. First, their spectral data encodes a crystal lattice and momentum, providing a framework for symmetric hyperbolic crystals. Second, they act as a complex analogue of crystal momentum. As an application, we elicit a new perspective on Euclidean band theory. Finally, we speculate on potential interactions of hyperbolic band theory, facilitated by Higgs bundles, with other themes in mathematics and physics.

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Section: Hyperbolic Band Theorymentioning

confidence: 99%

Section: Hyperbolic Band Theorymentioning

confidence: 99%

Section: Hyperbolic Band Theorymentioning

confidence: 99%

Section: 3mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Hyperbolic band theory through Higgs bundles

Kienzle,

Rayan

2022

Preprint

Self Cite

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Crystallography of hyperbolic lattices

et al. 2022

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Hyperbolic lattices are a revolutionary platform for tabletop simulations of holography and quantum physics in curved space and facilitate efficient quantum error correcting codes. Their underlying geometry is non-Euclidean, and the absence of Bloch's theorem precludes the straightforward application of the often indispensable energy band theory to study model Hamiltonians on hyperbolic lattices. Motivated by recent insights into hyperbolic band theory, we initiate a crystallography of hyperbolic lattices. We show that many hyperbolic lattices feature a hidden crystal structure characterized by unit cells, hyperbolic Bravais lattices, and associated symmetry groups. Using the mathematical framework of higher-genus Riemann surfaces and Fuchsian groups, we derive, for the first time, a list of example hyperbolic {p, q} lattices and their hyperbolic Bravais lattices, including five infinite families and several graphs relevant for experiments in circuit quantum electrodynamics and topolectrical circuits. This dramatically simplifies the computation of energy spectra of tightbinding Hamiltonians on hyperbolic lattices, from exact diagonalization on the graph to solving a finite set of equations in terms of irreducible representations. The significance of this achievement needs to be compared to the all-important role played by conventional Euclidean crystallography in the study of solids. We exemplify the high potential of this approach by constructing and diagonalizing finite-dimensional Bloch wave Hamiltonians.

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Electric-circuit realization of a hyperbolic drum

Lenggenhager,

Stegmaier,

Upreti

et al. 2021

Preprint

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The Laplace operator encodes the behaviour of physical systems at vastly different scales, describing heat flow, fluids, as well as electric, gravitational, and quantum fields. A key input for the Laplace equation is the curvature of space. Here we demonstrate that the spectral ordering of Laplacian eigenstates for hyperbolic (negative curvature) and flat (zero curvature) two-dimensional spaces has a universally different structure. We use a lattice representation of hyperbolic space in an electric-circuit network to measure the eigenstates of a 'hyperbolic drum', and to analyze signal propagation along the curved geodesics. Our experiments showcase a versatile platform to emulate hyperbolic lattices in tabletop experiments, which can be utilized to explore propagation dynamics as well as to realize topological hyperbolic matter.

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Automorphic Bloch theorems for hyperbolic lattices

Cited by 4 publications

References 49 publications

Hyperbolic band theory through Higgs bundles

Hyperbolic band theory through Higgs bundles

Crystallography of hyperbolic lattices

Electric-circuit realization of a hyperbolic drum

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