arXiv:math/0005127 Abstract

arXiv:math/0005127 [math.AG]Abstract References Reviews Resources

Decomposition of the Hochschild Complex of a Scheme in Arbitrary Characteristic

Published 2000-05-12, updated 2001-10-18Version 5

The paper has been withdrawn by the author, due a gap in the proof of Theorem 6.1. The gap was discovered by M. Van den Bergh. Theorem 6.1 is used to prove the main result of the paper, namely Theorem 0.7 (decomposition in arbitrary characteristic). At this time we do not have an alternate proof. Other results of the paper (Theorems 0.2, 0.3, 0.6 and 3.1) are not effected by this problem, and they remain valid.

Comments: Paper withdrawn by author, due to gap in proof of main result

Categories: math.AG, math.AC, math.KT, math.QA, math.RA

Subjects: 16E40, 14F10, 18G10, 13H10

Keywords: arbitrary characteristic, hochschild complex, decomposition, van den bergh, remain valid

Related articles: Most relevant | Search more

arXiv:2107.02204 [math.AG] (Published 2021-07-05)

Hilbert Schemes with Two Borel-fixed Points in Arbitrary Characteristic

Andrew P. Staal

arXiv:math/0006071 [math.AG] (Published 2000-06-09, updated 2010-06-18)

New Ideas for Resolution of Singularities in Arbitrary Characteristic

Tohsuke Urabe

arXiv:math/0701002 [math.AG] (Published 2006-12-29)

Equisingular Deformations of Plane Curves in Arbitrary Characteristic

Antonio Campillo, Gert-Martin Greuel, Christoph Lossen

arXiv Analytics

arXiv:math/0005127 [math.AG]Abstract References Reviews Resources

Decomposition of the Hochschild Complex of a Scheme in Arbitrary Characteristic

Links

Toolbox

arXiv:math/0005127 [math.AG]AbstractReferencesReviewsResources

Decomposition of the Hochschild Complex of a Scheme in Arbitrary Characteristic

Links

Toolbox

arXiv:math/0005127 [math.AG]Abstract References Reviews Resources