Talk:Kosmann lift

Latest comment: 10 years ago by Mgvongoeden in topic von Göden lift

von Göden lift

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The "von Göden lift" (presumably related to user mgvongoeden?) does not seem to exist in the literature or even in google under this name. Also mathscinet does not know an author "von Göden".--Café Bene (talk) 15:08, 30 April 2014 (UTC)Reply

It's been called by the authors in the article: Godina M. and Matteucci P. (2003), Reductive G-structures and Lie derivatives, Journal of Geometry and Physics 47, 66–86 Mgvongoeden (talk) 18:22, 30 April 2014 (UTC)Reply
That Paper is online at http://arxiv.org/pdf/math/0201235v2.pdf and I was still not able to locate the Notion "von Göden lift" there. (But admiitedly I didn't search very Long.) Can you help me: At which page does it appear? --Café Bene (talk) 20:43, 1 May 2014 (UTC)Reply
Corollary 4.14. and Corollary 4.15., page 12. I think it was a kind of Bourbaki joke! However, Kosmann lift was not directly found by her, i.e., Yvette Kosmann-Schwarzbach. Mgvongoeden (talk) 21:04, 1 May 2014 (UTC)Reply
I must admit that I still don't get the joke. Some explanation?--Café Bene (talk) 13:40, 2 May 2014 (UTC)Reply
In Fatibene L., Ferraris M., Francaviglia M. and Godina M. (1996), A geometric definition of Lie derivative for Spinor Fields, in: Proceedings of the 6th International Conference on Differential Geometry and Applications, August 28th–September 1st 1995 (Brno, Czech Republic), Janyska J., Kolář I. & J. Slovák J.(Eds.), Masaryk University, Brno, pp. 549–558 and in Godina M. and Matteucci P. (2003), Reductive G-structures and Lie derivatives, Journal of Geometry and Physics 47, 66–86 is given the notion of Kosmann lift, so-called by these authors in honour of her original ad hoc prescription. The authors of the second paper [i.e., Godina M. and Matteucci P. (2003)] invented, for the transverse part to the Kosmann lift, the term "von Göden lift". Mgvongoeden (talk) 16:11, 2 May 2014 (UTC)Reply