User:SDZeroBot/NPP sorting/STEM/Physics: Difference between revisions

 

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| In [[Kaluza–Klein theory]], a unification of [[general relativity]] and [[electromagnetism]], the five-fimensional Kaluza–Klein–Riemann curvature tensor (or Kaluza–Klein–Riemann–Christoffel curvature tensor) is the generalization of the four-dimensional [[Riemann curvature tensor]] (or Riemann–Christoffel curvature tensor).

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| The [[Ising model]] is a prototypical model in [[statistical physics]]. The model consists of discrete variables that represent magnetic dipole moments of atomic "spins" that can be in one of two states (+1 or −1). The spins are arranged in a graph, usually a lattice (where the local structure repeats periodically in all directions), allowing each spin to interact with its neighbors.

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| In [[differential geometry]] and in particular [[Yang–Mills theory]], Uhlenbeck's singularity theorem is a result allowing the removal of a [[Singularity (mathematics)|singularity]] of a [[Four-dimensional Yang–Mills theory|four-dimensional Yang–Mills]] field with finite energy using gauge. It states as a consequence that Yang–Mills fields with finite energy on flat [[euclidean space]] arise from Yang–Mills fields on the curved [[sphere]], its [[one-point compactification]].

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| Thomas L. Gilbert (November 24, 1922 – May 19, 2016) was an American physicist, a specialist in statistical physics.

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| In [[gauge theory]], the Yang–Mills moduli space (short YM moduli space, also instanton moduli space) is the [[moduli space]] of the [[Yang–Mills equations]], hence the space of its solutions up to [[gauge]]. It is used in [[Donaldson's theorem]], proven in and improved in , which was listed as a contribution for [[Simon Donaldson]] winning the [[Fields Medal]] in 1986, and to defined the [[Donaldson invariant|Donaldson invariants]] used to study four-dimensional smooth manifolds (short 4-manifolds).

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