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Line 1: {{User:SDZeroBot/NPP sorting/header\|count=24\|date=8 August 2025\|ts=0113:4751, 8 August 2025 (UTC)}} {\| class="wikitable sortable" Line 14: \| Yang–Baxter operators are [[invertible]] [[linear operator\|linear]] [[endomorphisms]] with applications in [[theoretical physics]] and [[topology]]. They are named after [[theoretical physicists]] [[Yang Chen-Ning]] and [[Rodney Baxter]]. These [[mathematical operator\|operators]] are particularly notable for providing solutions to the quantum [[Yang–Baxter equation]], which originated in [[statistical mechanics]], and for their use in constructing [[Knot invariant\|invariants]] of [[knot theory\|knots]], links, and three-dimensional [[manifolds]]. \| Start \| data-sort-value=~~7045~~7050 \| [[Special:Contribs/GregariousMadness\|GregariousMadness]] (~~7045~~7050) \| \|- Line 28: \| 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). \| Stub \| data-sort-value=~~3185~~3187 \| [[Special:Contribs/Samuel Adrian Antz\|Samuel Adrian Antz]] (~~3185~~3187) \| \|- Line 35: \| 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. \| C \| data-sort-value=~~903~~905 \| [[Special:Contribs/Stepwise Continuous Dysfunction\|Stepwise Continuous Dysfunction]] (~~903~~905) \| \|- Line 56: \| The 1859 City of Adelaide colonial by-election was held on 13 May 1859 to elect one of six members for [[Electoral district of City of Adelaide\|City of Adelaide]] in the [[South Australian House of Assembly]], after sitting member [[William Henville Burford]] resigned on 29 April 1859. \| Stub \| data-sort-value=~~8001~~8012 \| [[Special:Contribs/Milkk7\|Milkk7]] (~~8001~~8012) \| \|- Line 77: \| 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]]. \| Start \| data-sort-value=~~3185~~3187 \| [[Special:Contribs/Samuel Adrian Antz\|Samuel Adrian Antz]] (~~3185~~3187) \| \|- Line 168: \| The Atominstitute ({{langx\|de\|[[:de:Atominstitut\|Atominstitut]]}}) is an [[Austria\|Austrian]] [[University]] research facility with its own inhouse [[nuclear reactor]] located in [[Vienna]]. The institute most known member is 2022 [[Nobel laureate]] [[Anton Zeilinger]]. \| C \| data-sort-value=~~1265~~1266 \| [[Special:Contribs/FrankBierFarmer\|FrankBierFarmer]] (~~1265~~1266) \| \|- Line 178: \| \|} <span style="font-style: italic; font-size: 85%;">Last updated by [[User:SDZeroBot\|SDZeroBot]] <sup>''[[User:SD0001\|operator]] / [[User talk:SD0001\|talk]]''</sup> at 0113:4751, 8 August 2025 (UTC)</span>

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