Operads: Proceedings of Renaissance Conferences: Proceedings of Renaissance ConferencesAmerican Mathematical Soc., 1997 - Всего страниц: 443 "Operads" are mathematical devices which model many sorts of algebras (such as associative, commutative, Lie, Poisson, alternative, Leibniz, etc., including those defined up to homotopy, such as A*w-algebras). Since the notion of an operad appeared in the seventies in algebraic topology, there has been a renaissance of this theory due to the discovery of relationships with graph cohomology, Koszul duality, representation theory, combinatorics, cyclic cohomology, moduli spaces, knot theory, and quantum field theory. This renaissance was recognized at a special session "Moduli Spaces, Operads, and Representation Theory" of the AMS meeting in Hartford, CT (March 1995) and at a conference "Operérades et Algèbre Homotopique" held at the Centre International de Rencontres Math'matiques at Luminy, France (May-June 1995). Both meetings drew a diverse group of researchers. The authors have arranged the contributions so as to emphasize certain themes around which the renaissance of operads took place: homotopy algebra, algebraic topology, polyhedra and combinatorics, and applications to physics. |
Содержание
1 | |
9 | |
15 | |
Relating the associahedron and the permutohedron | 33 |
Combinatorial models for real configuration spaces and Enoperads | 37 |
From operads to physically inspired theories | 53 |
Operades des algebres k + 1 aires | 83 |
Coproduct and cogroups in the category of graded dual Leibniz algebras | 115 |
Deformations of algebras over a quadratic operad | 207 |
Qrings and the homology of the symmetric groups | 235 |
Operadic tensor products and smash products | 287 |
Homotopy Gerstenhaber algebras and topological field theory | 305 |
Intertwining operator algebras genuszero modular functors and genuszero conformal field theories | 335 |
Modular functor and representation theory of sl2 at a rational level | 357 |
Quantum generalized cohomology | 407 |
Noncommutative reciprocity laws associated to finite groups | 421 |
Cohomology of monoids in monoidal categories | 137 |
Distributive laws bialgebras and cohomology | 167 |
Другие издания - Просмотреть все
Operads: Proceedings of Renaissance Conferences Jean-Louis Loday,James D. Stasheff,Alexander A. Voronov Недоступно для просмотра - 1997 |
Operads: Proceedings of Renaissance Conferences Jean-Louis Loday,James D. Stasheff,Alexander A. Voronov Недоступно для просмотра - 1996 |
Часто встречающиеся слова и выражения
abelian group action admissible representations algebra structure algèbres associative algebra bialgebra bracket canonical cells cellular coaction coalgebra cochain cohomology commutative complex composition conformal field theory construction corresponding d'algèbres defined definition denote diagram differential dimension distributive law dual Leibniz algebras element equivalent example fiber finite formula G-algebra genus-zero modular functor Gerstenhaber given graded dual Leibniz graded Lie algebra graded vector space homogeneous homology homomorphism homotopy Hopf algebra identity induced irreducible isomorphism Koszul l'espace Leibniz algebras Lemma linear map Math Mathematics Milnor moduli space monad monoidal category monoidal structure morphism natural Nishida relations notation obtained operad permutation polynomial preoperad PROOF proposition punctures Q-module Q-ring quadratic operad quotient resp ring satisfying singular vector Stasheff Steenrod symmetric groups tensor product Theorem topological triple vector bundle vectoriel Verma module vertex operator algebras Weyl modules zero