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Publication details

Combinatorial differential geometry and ideal Bianchi–Ricci identities II - the torsion case

Basic information
Original title:	Combinatorial differential geometry and ideal Bianchi–Ricci identities II - the torsion case
Authors:	Josef Janyška, Martin Markl

Further information
Citation:	JANYŠKA, Josef and Martin MARKL. Combinatorial differential geometry and ideal Bianchi–Ricci identities II - the torsion case (Combinatorial differential geometry and ideal Bianchi–Ricci identities II - the torsion case). Archivum Mathematicum, Brno: Masaryk University, 2012, vol. 48, No 1, p. 61-80. ISSN 0044-8753. doi:10.5817/AM2012-1-61.Export BibTeX @article{980449, author = {Janyška, Josef and Markl, Martin}, article_location = {Brno}, article_number = {1}, doi = {http://dx.doi.org/10.5817/AM2012-1-61}, keywords = {Natural operator; linear connection; torsion; reduction theorem; graph}, language = {eng}, issn = {0044-8753}, journal = {Archivum Mathematicum}, title = {Combinatorial differential geometry and ideal Bianchi–Ricci identities II - the torsion case}, url = {http://emis.muni.cz/journals/AM/12-1/am2052.pdf}, volume = {48}, year = {2012} }
Original language:	English
Field:	General mathematics
WWW:	http://emis.muni.cz/journals/AM/12-1/am2052.pdf
Type:	Article in Periodical
Keywords:	Natural operator; linear connection; torsion; reduction theorem; graph

This paper is a continuation of the paper J. Janyška and M. Markl, Combinatorial differential geometry and ideal Bianchi-Ricci identities, Advances in Geometry 11 (2011) 509-540, dealing with a general, not-necessarily torsion-free, connection. It characterizes all possible systems of generators for vector-field valued operators that depend naturally on a set of vector fields and a linear connection, describes the size of the space of such operators and proves the existence of an `ideal' basis consisting of operators with given leading terms which satisfy the (generalized) Bianchi--Ricci identities without corrections.

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