Content deleted Content added
Updating report |
Updating report |
||
Line 1:
{{User:SDZeroBot/NPP sorting/header|count=
{| class="wikitable sortable"
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=
|
|-
Line 70:
| 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=
|
|-
Line 190:
| Stub
| data-sort-value=166 | [[Special:Contribs/Gukecavoran|Gukecavoran]] (166)
|
|-
| 2014-10-05
| [[C-Wave Quantum Computing]] <small>(Conceptual 4D-hypersphere framework for quantum computation)</small>
| C-Wave quantum computing is a conceptual framework that extends the Bloch-sphere representation of qubits to a four-dimensional (4D) hypersphere, adding time (''T'') as a fourth axis. This revision formalises the parameter C as an information-capacity measure per mode and connects the concept to established quantum information theory.
| Start
| data-sort-value=40 | [[Special:Contribs/Harold Foppele|Harold Foppele]] (40)
|
|}
<span style="font-style: italic; font-size: 85%;">Last updated by [[User:SDZeroBot|SDZeroBot]] <sup>''[[User:SD0001|operator]] / [[User talk:SD0001|talk]]''</sup> at
| |||