On a certain construction of graded Lie algebras with derivation
DOI10.1016/0393-0440(95)00048-8zbMath0888.46048OpenAlexW2050530453MaRDI QIDQ1816949
Publication date: 21 May 1998
Published in: Journal of Geometry and Physics (Search for Journal in Brave)
Full work available at URL: http://cds.cern.ch/record/284450
graded Lie algebrasdifferential algebra\(K\)-cyclegraded derivationConnes' theorygraded involutive differential algebraunital \(*\)-algebra
Unified quantum theories (81V22) Noncommutative topology (46L85) Noncommutative differential geometry (46L87) (K)-theory and operator algebras (including cyclic theory) (46L80) Automorphisms, derivations, other operators for Lie algebras and super algebras (17B40) Graded Lie (super)algebras (17B70)
Related Items (3)
Cites Work
- Unnamed Item
- Unnamed Item
- Non-commutative geometry: A physicist's brief survey
- Gravity in non-commutative geometry
- Connes' noncommutative differential geometry and the standard model
- Remarks on Alain Connes' approach to the standard model in non-commutative geometry
- On the structure of a differential algebra used by Connes and Lott
- Differential algebras in non-commutative geometry
- Classification of all simple graded Lie algebras whose Lie algebra is reductive. I
- Irreducible representations of the osp(2,1) and spl(2,1) graded Lie algebras
- A DETAILED ACCOUNT OF ALAIN CONNES' VERSION OF THE STANDARD MODEL IN NON-COMMUTATIVE GEOMETRY: I AND II.
- NONCOMMUTATIVE GEOMETRY AND GRADED ALGEBRAS IN ELECTROWEAK INTERACTIONS
- A DETAILED ACCOUNT OF ALAIN CONNES’ VERSION OF THE STANDARD MODEL IN NON-COMMUTATIVE DIFFERENTIAL GEOMETRY III
- Deriving the standard model from the simplest two-point K cycle
This page was built for publication: On a certain construction of graded Lie algebras with derivation
