Corrigendum: Intersection homology with field coefficients: K ‐Witt spaces and K ‐Witt Bordism
2012; Wiley; Volume: 65; Issue: 11 Linguagem: Inglês
10.1002/cpa.21421
ISSN1097-0312
Autores Tópico(s)Algebraic Geometry and Number Theory
ResumoCommunications on Pure and Applied MathematicsVolume 65, Issue 11 p. 1639-1640 CorrigendumFree Access Corrigendum: Intersection homology with field coefficients: K-Witt spaces and K-Witt Bordism This article corrects the following: Intersection homology with field coefficients: K-Witt spaces and K-Witt bordism Greg Friedman, Volume 62Issue 9Communications on Pure and Applied Mathematics pages: 1265-1292 First Published online: June 15, 2009 Greg Friedman, Greg Friedman [email protected] Texas Christian University, Department of Mathematics, Box 298900, Fort Worth, TX 76129Search for more papers by this author Greg Friedman, Greg Friedman [email protected] Texas Christian University, Department of Mathematics, Box 298900, Fort Worth, TX 76129Search for more papers by this author First published: 28 August 2012 https://doi.org/10.1002/cpa.21421Citations: 2AboutPDF ToolsRequest permissionExport citationAdd to favoritesTrack citation ShareShare Give accessShare full text accessShare full-text accessPlease review our Terms and Conditions of Use and check box below to share full-text version of article.I have read and accept the Wiley Online Library Terms and Conditions of UseShareable LinkUse the link below to share a full-text version of this article with your friends and colleagues. Learn more.Copy URL Share a linkShare onEmailFacebookTwitterLinkedInRedditWechat No abstract is available for this article. Bibliography 1 Friedman, G. Intersection homology with field coefficients: K-Witt spaces and K-Witt bordism. Comm. Pure Appl. Math. 62 ( 2009), no. 9, 1265–1292. 10.1002/cpa.20291 Web of Science®Google Scholar 2 Friedman, G. K-Witt bordism in characteristic 2. Preprint, 2012. Available at: http://faculty.tcu.edu/gfriedman Google Scholar 3 Goresky, R. M. Intersection homology operations. Comment. Math. Helv. 59 ( 1984), no. 3, 485–505. 10.1007/BF02566362 Web of Science®Google Scholar Siegel, P. H. Witt spaces: a geometric cycle theory for KO-homology at odd primes. Amer. J. Math. 105 ( 1983), no. 5, 1067–1105. 10.2307/2374334 Web of Science®Google Scholar Citing Literature Volume65, Issue11November 2012Pages 1639-1640 ReferencesRelatedInformation
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