Jove
Visualize
Contact Us

Related Concept Videos

Bewley Lattice Diagram01:12

Bewley Lattice Diagram

911
The Bewley lattice diagram, developed by L. V. Bewley, effectively organizes the reflections occurring during transmission-line transients. It visually represents how voltage waves propagate and reflect within a transmission line, making it easier to understand the complex interactions that occur.
911
Parallel-axis Theorem01:06

Parallel-axis Theorem

7.3K
The parallel-axis theorem provides a convenient and quick method of finding the moment of inertia of an object about an axis parallel to the axis passing through its center of mass. Consider a thin rod as an example. There is a striking similarity between the process of finding the moment of inertia of a thin rod about an axis through its middle, where the center of mass lies, and about an axis through its end using the conventional method. In the conventional method, the concept of linear mass...
7.3K
Castigliano's Theorem01:18

Castigliano's Theorem

565
Castigliano's theorem analyzes displacements and rotations in elastic structures. It relates the derivative of elastic strain energy to the applied forces or moments, allowing for the calculation of deformations. The theorem states that the partial derivative of the total strain energy of a system with respect to a specific load results in the displacement at the point where the load is applied. This principle applies to both forces and moments.
565
Theorems of Pappus and Guldinus01:10

Theorems of Pappus and Guldinus

2.1K
The two theorems developed by Pappus and Guldinus are widely used in mathematics, engineering, and physics to find the surface area and volume of any body of revolution. This is done by revolving a plane curve around an axis that does not intersect the curve to find its surface area or revolving a plane area around a non-intersecting axis to calculate its volume.
For finding the surface area, consider a differential line element that generates a ring with surface area dA when revolved.
2.1K
Moment-Area Theorems01:17

Moment-Area Theorems

364
The Moment-Area Theorem is crucial in structural engineering for analyzing beam bending, particularly in applications like building floor supports. This theorem utilizes the geometric properties of the elastic curve, which depicts how a beam deforms under load, to simplify the calculations of deflections and slopes.
The theorem is divided into two parts. The first part connects the angle between tangents at any two points on the beam's elastic curve to the area under a curve derived by...
364
Parseval's Theorem01:18

Parseval's Theorem

708
Parseval's theorem is a fundamental concept in signal processing and harmonic analysis. It asserts that for a periodic function, the average power of the signal over one period equals the sum of the squared magnitudes of all its complex Fourier coefficients. This theorem, named after Marc-Antoine Parseval, provides a powerful tool for analyzing the energy distribution in signals.
Interestingly, Parseval's theorem also holds for the trigonometric form of the Fourier series, which...
708

You might also read

Related Articles

Articles linked to this work by shared authors, journal, and citation graph.

Sort by
Same author

Quantum entanglement, stratified spaces, and topological matter: towards entanglement-sensitive Langlands data.

Reports on progress in physics. Physical Society (Great Britain)·2026
Same author

Hyperbolic band theory.

Science advances·2021
Same journal

The TaMYB55-TaSnRK1α1-TabZIP9 module confers heat stress tolerance in wheat.

Proceedings of the National Academy of Sciences of the United States of America·2026
Same journal

Superstatistics approach to turbulent circulation fluctuations.

Proceedings of the National Academy of Sciences of the United States of America·2026
Same journal

A molecular timescale for evolution of cobamide biosynthesis.

Proceedings of the National Academy of Sciences of the United States of America·2026
Same journal

Pierre Chambon, a pioneer of molecular biology and gene regulation in eukaryotes.

Proceedings of the National Academy of Sciences of the United States of America·2026
Same journal

Granulosa cell glycogen fuels the avascular corpus luteum.

Proceedings of the National Academy of Sciences of the United States of America·2026
Same journal

Synthetic essentiality of TRAIL/TNFSF10 in VHL-deficient renal cell carcinoma.

Proceedings of the National Academy of Sciences of the United States of America·2026
See all related articles
JoVE
x logofacebook logolinkedin logoyoutube logo
ABOUT JoVE
OverviewLeadershipBlogJoVE Help Center
AUTHORS
Publishing ProcessEditorial BoardScope & PoliciesPeer ReviewFAQSubmit
LIBRARIANS
TestimonialsSubscriptionsAccessResourcesLibrary Advisory BoardFAQ
RESEARCH
JoVE JournalMethods CollectionsJoVE Encyclopedia of ExperimentsArchive
EDUCATION
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab ManualFaculty Resource CenterFaculty Site
Terms & Conditions of Use
Privacy Policy
Policies

Related Experiment Video

Updated: Oct 2, 2025

Optimized Fabrication Procedure for High-Quality Graphene-based Moiré Superlattice Devices
11:24

Optimized Fabrication Procedure for High-Quality Graphene-based Moiré Superlattice Devices

Published on: July 11, 2025

7.3K

Automorphic Bloch theorems for hyperbolic lattices.

Joseph Maciejko1,2, Steven Rayan3,4

  • 1Department of Physics, University of Alberta, Edmonton, AB T6G 2E1, Canada; maciejko@ualberta.ca rayan@math.usask.ca.

Proceedings of the National Academy of Sciences of the United States of America
|February 26, 2022
PubMed
Summary
This summary is machine-generated.

Researchers established a generalized Bloch theorem for hyperbolic lattices, confirming band theory

Keywords:
Bloch theoremalgebraic geometryband theoryhyperbolic latticesquantum matter

More Related Videos

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry
12:14

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry

Published on: August 12, 2013

22.0K
Detection of Architectural Distortion in Prior Mammograms via Analysis of Oriented Patterns
13:44

Detection of Architectural Distortion in Prior Mammograms via Analysis of Oriented Patterns

Published on: August 30, 2013

43.1K

Related Experiment Videos

Last Updated: Oct 2, 2025

Optimized Fabrication Procedure for High-Quality Graphene-based Moiré Superlattice Devices
11:24

Optimized Fabrication Procedure for High-Quality Graphene-based Moiré Superlattice Devices

Published on: July 11, 2025

7.3K
The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry
12:14

The Generation of Higher-order Laguerre-Gauss Optical Beams for High-precision Interferometry

Published on: August 12, 2013

22.0K
Detection of Architectural Distortion in Prior Mammograms via Analysis of Oriented Patterns
13:44

Detection of Architectural Distortion in Prior Mammograms via Analysis of Oriented Patterns

Published on: August 30, 2013

43.1K

Area of Science:

  • Condensed Matter Physics
  • Quantum Matter
  • Non-Euclidean Geometry

Background:

  • Hyperbolic lattices represent synthetic quantum matter with particles hopping on hyperbolic space.
  • Previous hyperbolic band theory described eigenstates as automorphic functions and the Brillouin zone as a Jacobian.
  • Key questions remained regarding band theory applicability, Bloch theorem rigor, and finite lattice description.

Purpose of the Study:

  • To rigorously establish a generalized Bloch theorem for hyperbolic lattices.
  • To determine the conditions under which hyperbolic band theory applies to finite lattices.
  • To investigate the role of non-abelian translation groups and irreducible representations in hyperbolic band theory.

Main Methods:

  • Formulation of periodic boundary conditions for finite hyperbolic lattices.
  • Mathematical analysis of translation group properties and irreducible representations (irreps).
  • Connection of higher-dimensional irreps to moduli spaces of holomorphic vector bundles.

Main Results:

  • A generalized Bloch theorem is rigorously proved for finite hyperbolic lattices.
  • The theorem's validity depends on lattice geometry and may involve higher-dimensional irreducible representations.
  • For many finite lattices, only 1D irreps appear, making the previously developed hyperbolic band theory exact.

Conclusions:

  • Hyperbolic band theory can be rigorously established for finite lattices.
  • The generalized Bloch theorem provides a framework for understanding quantum matter on non-Euclidean spaces.
  • This work bridges theoretical concepts with potential experimental realizations of hyperbolic quantum systems.