Litcius/Paper detail

Asymptotic freedom and noninteger dimensionality

Subhash Kak

2021Scientific Reports26 citationsDOIOpen Access PDF

Abstract

This paper shows that below a critical value of dimensionality that lies between two and three, the potential between objects begins to fall as the energy levels increase. For dimensionality below two, the potential becomes constant irrespective of separation and the force between them disappears, which represents a new paradigm of asymptotic freedom. Since asymptotic freedom is at the basis of many applications such as those associated with strange metals, unconventional superconductors, and fractional quantum Hall states, the new paradigm can have novel applications. It also is of relevance to the study of anomalous mechanical effects that are important in metamaterials.

Topics & Concepts

Curse of dimensionalityDegrees of freedom (physics and chemistry)Asymptotic freedomStatistical physicsPhysicsMetamaterialBasis (linear algebra)Theoretical physicsConstant (computer programming)Value (mathematics)SuperconductivityRelevance (law)Computer scienceMathematicsQuantum mechanicsArtificial intelligenceLawStatisticsGeometryProgramming languageQuantum chromodynamicsPolitical scienceQuantum, superfluid, helium dynamicsAdvanced Mathematical Theories and ApplicationsTopological Materials and Phenomena