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Article

Title: Homotopy diagrams of algebras (English)
Author: Markl, Martin
Language: English
Journal: Proceedings of the 21st Winter School "Geometry and Physics"
Volume:
Issue: 2001
Year:
Pages: [161]-180
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Category: math
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Summary: The paper is concerned with homotopy concepts in the category of chain complexes. It is part of the author's program to translate [{\it J. M. Boardman} and {\it R. M. Vogt}, Homotopy invariant algebraic structures on topological spaces, Lect. Notes Math. 347, Springer-Verlag (1973; Zbl 0285.55012)] from topology to algebra.\par In topology the notion of operad extracts the essential algebraic information contained in the following example (endomorphism operad).\par The endomorphism operad ${\cal E}_X$ of a based space $X$ consists of the family ${\cal E}_X(j)$ $(j\ge 0)$ of spaces of based maps $X^j\to X$, together with the collection of continuous maps $$\gamma:{\cal E}_X(k)\times{\cal E}_X(j_1)\times\cdots\times{\cal E}_X(j_k)\to{\cal E}_X(j)$$ given by the formula $$\gamma(f; g_1,\dots, g_k)= f(g_1\times\cdots\times g_k),$$ where $k,j_1,\dots, j_k,j$ are such that $j= \sum^k_{s=1} j_s$.\par Operads have proved to be a convenient tool to investigate, for example! (English)
MSC: 12H05
MSC: 18G55
MSC: 55P48
MSC: 55U15
MSC: 55U35
idZBL: Zbl 1024.55012
idMR: MR1972432
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Date available: 2009-07-14T08:29:29Z
Last updated: 2012-09-18
Stable URL: http://hdl.handle.net/10338.dmlcz/701787
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