S. P. Novikov
Published 2000-04-12Version 1
Family of doublings of Hopf algeras based on the product of algebra and its dual are constructed and studied. Special cases of these construction may be considered as natural quantum analogs of rings of differential operators on groups. Such constructions appeared in 1966-67 in the authors works in the complex cobordism theory. These constructions do not leed to the Hopf algebras (except of the special case of the Drinfeld's quantum double which is not the same as the natural quantum analog of the ring of operators on groups). However, they have important ''almost Hopf'' properties important in particular in the topological and analytical applications.
Comments: LATEX, 5 pages
Journal: Russian Math Surveys 47 (1992) n 5 pp 198-199
The singular and the 2:1 anisotropic Dunkl oscillators in the plane
Hopf algebras: motivations and examples
Perturbation theory for the $Φ^4_3$ measure, revisited with Hopf algebras
