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Consider a region consisting of several individual conductors with a definite charge density in the region between these conductors. The second uniqueness theorem states that if the total charge on each conductor and the charge density in the in-between region are known, then the electric field can be uniquely determined.
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Pappus and Guldinus's theorems are powerful mathematical principles that are used for finding the surface area and volume of composite shapes. For example, consider a cylindrical storage tank with a conical top. Finding the surface area or volume can be challenging for such complex shapes. These theorems are particularly useful in calculating the volume and surface area of such systems. Here, the cylindrical storage tank with a conical top can be broken down into two simple shapes: a...
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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.
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Related Experiment Video

Updated: Jun 15, 2025

Author Spotlight: Exploring Microglial Interactions with Stress-Response Circuitry Using the Limited Bedding and Nesting Model
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Author Spotlight: Exploring Microglial Interactions with Stress-Response Circuitry Using the Limited Bedding and Nesting Model

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The bunkbed conjecture is false.

Nikita Gladkov1, Igor Pak1, Aleksandr Zimin2

  • 1Department of Mathematics, University of California, Los Angeles, CA 90095.

Proceedings of the National Academy of Sciences of the United States of America
|June 13, 2025
PubMed
Summary
This summary is machine-generated.

Researchers provide a counterexample to Kasteleyn's bunkbed conjecture using a planar graph. This finding, based on recent work, challenges a long-standing mathematical hypothesis.

Keywords:
bunkbed conjecturecounterexamplehypergraphpercolation on graphsrandom network

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Area of Science:

  • Graph Theory
  • Mathematical Physics

Background:

  • The bunkbed conjecture, proposed by Kasteleyn in 1985, is a significant unsolved problem in mathematical physics.
  • This conjecture relates to properties of planar graphs and their associated matrices.

Purpose of the Study:

  • To provide an explicit counterexample to the bunkbed conjecture.
  • To test the validity of Kasteleyn's hypothesis using computational graph theory.

Main Methods:

  • Construction of a large planar graph with 7,222 vertices.
  • Leveraging recent advancements in graph theory and computational methods, building upon Hollom's 2024 work.

Main Results:

  • An explicit counterexample to the bunkbed conjecture has been successfully generated.
  • The counterexample is a planar graph comprising 7,222 vertices.

Conclusions:

  • The bunkbed conjecture, as stated by Kasteleyn, is shown to be false.
  • This result necessitates a re-evaluation of related theoretical frameworks in graph theory and mathematical physics.