Symmetric monoidal category

Results: 12



#Item
1Category theory / Algebra / Mathematics / Monoidal categories / Monoid / Enriched category / Adjoint functors / Cartesian closed category / Coproduct / Bicategory / Functor / Sheaf

Monoidal Indeterminates and Categories of Possible WorldsI C. Hermida, R. D. Tennent∗ School of Computing, Queen’s University, Kingston, Canada K7L 3N6 Abstract Given any symmetric monoidal category C, a small symmet

Add to Reading List

Source URL: maggie.cs.queensu.ca

Language: English - Date: 2011-12-16 22:41:04
2Mathematics / Algebra / Abstract algebra / Homotopy theory / Category theory / Algebraic topology / Functors / Higher category theory / Simplicial set / Nerve / Model category / Monoidal category

HIGHER CATEGORIES IN A NUT-SHELL These are notes for a talk at the Max Planck Institute for Mathematics in SpringThe goal was to convince the audience that the necessary definitions for a good model of (symmetric

Add to Reading List

Source URL: people.mpim-bonn.mpg.de

Language: English - Date: 2015-06-17 03:57:55
3Algebra / Mathematics / Abstract algebra / Homotopy theory / Algebraic topology / Category theory / Functors / Monoidal categories / Highly structured ring spectrum / Model category / Symmetric spectrum / Commutative ring spectrum

MODEL CATEGORIES OF DIAGRAM SPECTRA M. A. MANDELL, J. P. MAY, S. SCHWEDE and B. SHIPLEY [Received 24 May 1999; revised 5 JanuaryContents Part I. Diagram spaces and diagram spectra .

Add to Reading List

Source URL: www.math.uni-bonn.de

Language: English - Date: 2003-11-07 09:15:32
4Category theory / Monoidal categories / Homotopy theory / Algebraic topology / Adjoint functors / Monoid / PRO / Model category / Highly structured ring spectrum / Monad / Symmetric monoidal category / Functor

ALGEBRAS AND MODULES IN MONOIDAL MODEL CATEGORIES STEFAN SCHWEDE and BROOKE E. SHIPLEY [Received 4 September 1998; revised 1 DecemberIntroduction

Add to Reading List

Source URL: www.math.uni-bonn.de

Language: English - Date: 2003-11-07 09:15:30
5Homotopy theory / Monoidal categories / Algebras / Category theory / Ring theory / Monoid / Model category / Differential graded algebra / Spectrum / Symmetric spectrum / Quillen adjunction / Ring

Young Women in Topology Bonn, June 25 – 27, 2010 Why HZ-algebra spectra are differential graded algebras ? Varvara Karpova

Add to Reading List

Source URL: www.math.uni-bonn.de

Language: English - Date: 2010-07-29 06:56:07
6Algebra / Monoidal categories / Category theory / Mathematics / Braided monoidal category / String diagram / PRO / Symmetric monoidal category / Monoid / Morphism of algebraic varieties / Sheaf / Monoidal functor

PDF Document

Add to Reading List

Source URL: ect.bell-labs.com

Language: English - Date: 2011-06-20 13:54:38
7Category theory / Algebraic structures / Operad theory / Monoidal categories / Algebraic topology / Monoid / E∞-operad / Highly structured ring spectrum / Algebra / Abstract algebra / Mathematics

DEFINITIONS: OPERADS, ALGEBRAS AND MODULES J. P. MAY Let S be a symmetric monoidal category with product ⊗ and unit object κ. Definition 1. An operad C in S consists of objects C (j), j ≥ 0, a unit map η : κ → C

Add to Reading List

Source URL: www.math.uchicago.edu

Language: English - Date: 2002-02-19 11:36:00
8Abstract algebra / Enriched category / Monoidal functor / Monoidal natural transformation / Monoid / Closed monoidal category / Adjoint functors / Natural transformation / PRO / Category theory / Algebra / Monoidal categories

Theory and Applications of Categories, Vol. 29, No. 19, 2014, pp. 496–541. SEQUENTIAL MULTICATEGORIES CLAUDIO PISANI Abstract. We study the monoidal closed category of symmetric multicategories, especially in relation

Add to Reading List

Source URL: www.emis.de

Language: English - Date: 2014-09-15 10:43:00
9Monoidal categories / Morphisms / Adjoint functors / Monoid / Epimorphism / Category of abelian groups / Functor / Abelian category / Monad / Category theory / Abstract algebra / Algebra

Theory and Applications of Categories, Vol. 27, No. 10, 2012, pp. 210–221. DESCENT IN MONOIDAL CATEGORIES BACHUKI MESABLISHVILI Abstract. We consider a symmetric monoidal closed category V = (V , ⊗, I, [−, −]) t

Add to Reading List

Source URL: www.emis.de

Language: English - Date: 2012-10-09 13:31:00
10Monoidal natural transformation / Closed monoidal category / Braided monoidal category / Traced monoidal category / Compact closed category / Monoid / Sheaf / Functor / Coproduct / Category theory / Monoidal categories / Algebra

Finite Dimensional Vector Spaces are Complete for Traced Symmetric Monoidal Categories Masahito Hasegawa1 , Martin Hofmann2 , and Gordon Plotkin3 1 2

Add to Reading List

Source URL: homepages.inf.ed.ac.uk

Language: English - Date: 2007-11-08 11:24:19
UPDATE