SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W2952616657> ?p ?o ?g. }

Showing items 1 to 77 of 77 with 100 items per page.

W2952616657 abstract "The subject of this paper are two Hopf algebras which are the non-commutative analogues of two different groups of formal power series. The first group is the set of invertible series with the multiplication, while the second group is the set of formal diffeomorphisms with the composition. The motivation to introduce these Hopf algebras comes from the study of formal series with non-commutative coefficients. Invertible series with non-commutative coefficients still form a group, and we interpret the corresponding new non-commutative Hopf algebra as an alternative to the natural Hopf algebra given by the co-ordinate ring of the group, which has the advantage of being functorial in the algebra of coefficients. For the formal diffeomorphisms with non-commutative coefficients, this interpretation fails, because in this case the composition is not associative anymore. However, we show that for the dual non-commutative algebra there exists a natural co-associative co-product defining a non-commutative Hopf algebra. Moreover, we give an explicit formula for the antipode, which represents a non-commutative version of the Lagrange inversion formula, and we show that its coefficients are related to planar binary trees. Then we extend these results to the semi-direct co-product of the previous Hopf algebras, and to series in several variables. Finally, we show how the non-commutative Hopf algebras of formal series are related to some renormalization Hopf algebras, which are combinatorial Hopf algebras motivated by the renormalization in quantum field theory, and to the renormalization functor given by the double tensor algebra on a bi-algebra." @default.
W2952616657 created "2019-06-27" @default.
W2952616657 creator A5001976274 @default.
W2952616657 creator A5031437350 @default.
W2952616657 creator A5040427357 @default.
W2952616657 date "2006-01-01" @default.
W2952616657 modified "2023-09-26" @default.
W2952616657 title "Non-commutative Hopf algebra of formal diffeomorphisms" @default.
W2952616657 cites W100621036 @default.
W2952616657 cites W1525973579 @default.
W2952616657 cites W1571192943 @default.
W2952616657 cites W1576793073 @default.
W2952616657 cites W1661352576 @default.
W2952616657 cites W1769302818 @default.
W2952616657 cites W1843351660 @default.
W2952616657 cites W1987490190 @default.
W2952616657 cites W2003902795 @default.
W2952616657 cites W2006279941 @default.
W2952616657 cites W2013390303 @default.
W2952616657 cites W2026297875 @default.
W2952616657 cites W2052576418 @default.
W2952616657 cites W2061587711 @default.
W2952616657 cites W2077583969 @default.
W2952616657 cites W2083887405 @default.
W2952616657 cites W2084649487 @default.
W2952616657 cites W2090301842 @default.
W2952616657 cites W2319308948 @default.
W2952616657 cites W2914659449 @default.
W2952616657 cites W356550032 @default.
W2952616657 cites W84695432 @default.
W2952616657 hasPublicationYear "2006" @default.
W2952616657 type Work @default.
W2952616657 sameAs 2952616657 @default.
W2952616657 citedByCount "3" @default.
W2952616657 countsByYear W29526166572017 @default.
W2952616657 countsByYear W29526166572020 @default.
W2952616657 crossrefType "journal-article" @default.
W2952616657 hasAuthorship W2952616657A5001976274 @default.
W2952616657 hasAuthorship W2952616657A5031437350 @default.
W2952616657 hasAuthorship W2952616657A5040427357 @default.
W2952616657 hasBestOaLocation W29526166572 @default.
W2952616657 hasConcept C130856480 @default.
W2952616657 hasConcept C136119220 @default.
W2952616657 hasConcept C138354692 @default.
W2952616657 hasConcept C169171071 @default.
W2952616657 hasConcept C183778304 @default.
W2952616657 hasConcept C202444582 @default.
W2952616657 hasConcept C29712632 @default.
W2952616657 hasConcept C33923547 @default.
W2952616657 hasConcept C55192134 @default.
W2952616657 hasConceptScore W2952616657C130856480 @default.
W2952616657 hasConceptScore W2952616657C136119220 @default.
W2952616657 hasConceptScore W2952616657C138354692 @default.
W2952616657 hasConceptScore W2952616657C169171071 @default.
W2952616657 hasConceptScore W2952616657C183778304 @default.
W2952616657 hasConceptScore W2952616657C202444582 @default.
W2952616657 hasConceptScore W2952616657C29712632 @default.
W2952616657 hasConceptScore W2952616657C33923547 @default.
W2952616657 hasConceptScore W2952616657C55192134 @default.
W2952616657 hasLocation W29526166571 @default.
W2952616657 hasLocation W29526166572 @default.
W2952616657 hasOpenAccess W2952616657 @default.
W2952616657 hasPrimaryLocation W29526166571 @default.
W2952616657 hasRelatedWork W1967470162 @default.
W2952616657 hasRelatedWork W2062169824 @default.
W2952616657 hasRelatedWork W2110815386 @default.
W2952616657 hasRelatedWork W2169972388 @default.
W2952616657 hasRelatedWork W2368004815 @default.
W2952616657 hasRelatedWork W2371361756 @default.
W2952616657 hasRelatedWork W2385926663 @default.
W2952616657 hasRelatedWork W3026822304 @default.
W2952616657 hasRelatedWork W3121201810 @default.
W2952616657 hasRelatedWork W3140232521 @default.
W2952616657 isParatext "false" @default.
W2952616657 isRetracted "false" @default.
W2952616657 magId "2952616657" @default.
W2952616657 workType "article" @default.