Matches in SemOpenAlex for { <https://semopenalex.org/work/W4294057495> ?p ?o ?g. }
Showing items 1 to 67 of
67
with 100 items per page.
- W4294057495 abstract "For the special linear group $mathrm{SL}_2(mathbb{C})$ and for the singular quadratic Danielewski surface $x y = z^2$ we give explicitly a finite number of complete polynomial vector fields that generate the Lie algebra of all polynomial vector fields on them. Moreover, we give three unipotent one-parameter subgroups that generate a subgroup of algebraic automorphisms acting infinitely transitively on $x y = z^2$." @default.
- W4294057495 created "2022-09-01" @default.
- W4294057495 creator A5012084159 @default.
- W4294057495 date "2022-08-30" @default.
- W4294057495 modified "2023-10-14" @default.
- W4294057495 title "Integrable generators of Lie algebras of vector fields on $mathrm{SL}_2(mathbb{C})$ and on $xy = z^2$" @default.
- W4294057495 doi "https://doi.org/10.48550/arxiv.2208.14434" @default.
- W4294057495 hasPublicationYear "2022" @default.
- W4294057495 type Work @default.
- W4294057495 citedByCount "0" @default.
- W4294057495 crossrefType "posted-content" @default.
- W4294057495 hasAuthorship W4294057495A5012084159 @default.
- W4294057495 hasBestOaLocation W42940574951 @default.
- W4294057495 hasConcept C114614502 @default.
- W4294057495 hasConcept C118615104 @default.
- W4294057495 hasConcept C118712358 @default.
- W4294057495 hasConcept C121332964 @default.
- W4294057495 hasConcept C129844170 @default.
- W4294057495 hasConcept C134306372 @default.
- W4294057495 hasConcept C136119220 @default.
- W4294057495 hasConcept C202444582 @default.
- W4294057495 hasConcept C205633959 @default.
- W4294057495 hasConcept C2524010 @default.
- W4294057495 hasConcept C2781311116 @default.
- W4294057495 hasConcept C33923547 @default.
- W4294057495 hasConcept C51568863 @default.
- W4294057495 hasConcept C62520636 @default.
- W4294057495 hasConcept C77926391 @default.
- W4294057495 hasConcept C90119067 @default.
- W4294057495 hasConcept C91188154 @default.
- W4294057495 hasConcept C9376300 @default.
- W4294057495 hasConcept C9652623 @default.
- W4294057495 hasConceptScore W4294057495C114614502 @default.
- W4294057495 hasConceptScore W4294057495C118615104 @default.
- W4294057495 hasConceptScore W4294057495C118712358 @default.
- W4294057495 hasConceptScore W4294057495C121332964 @default.
- W4294057495 hasConceptScore W4294057495C129844170 @default.
- W4294057495 hasConceptScore W4294057495C134306372 @default.
- W4294057495 hasConceptScore W4294057495C136119220 @default.
- W4294057495 hasConceptScore W4294057495C202444582 @default.
- W4294057495 hasConceptScore W4294057495C205633959 @default.
- W4294057495 hasConceptScore W4294057495C2524010 @default.
- W4294057495 hasConceptScore W4294057495C2781311116 @default.
- W4294057495 hasConceptScore W4294057495C33923547 @default.
- W4294057495 hasConceptScore W4294057495C51568863 @default.
- W4294057495 hasConceptScore W4294057495C62520636 @default.
- W4294057495 hasConceptScore W4294057495C77926391 @default.
- W4294057495 hasConceptScore W4294057495C90119067 @default.
- W4294057495 hasConceptScore W4294057495C91188154 @default.
- W4294057495 hasConceptScore W4294057495C9376300 @default.
- W4294057495 hasConceptScore W4294057495C9652623 @default.
- W4294057495 hasLocation W42940574951 @default.
- W4294057495 hasOpenAccess W4294057495 @default.
- W4294057495 hasPrimaryLocation W42940574951 @default.
- W4294057495 hasRelatedWork W1580893357 @default.
- W4294057495 hasRelatedWork W1789225268 @default.
- W4294057495 hasRelatedWork W1985218657 @default.
- W4294057495 hasRelatedWork W2023018138 @default.
- W4294057495 hasRelatedWork W2106602561 @default.
- W4294057495 hasRelatedWork W2322914805 @default.
- W4294057495 hasRelatedWork W2963005948 @default.
- W4294057495 hasRelatedWork W3095336029 @default.
- W4294057495 hasRelatedWork W4243743258 @default.
- W4294057495 hasRelatedWork W4294057495 @default.
- W4294057495 isParatext "false" @default.
- W4294057495 isRetracted "false" @default.
- W4294057495 workType "article" @default.