Timeline for Is there an example of a Killing vector field on a complete Riemannian manifold with finite volume?

Current License: CC BY-SA 3.0

15 events

when toggle format	what		by	license	comment
Feb 3, 2016 at 0:10	vote	accept	italo lira
Feb 2, 2016 at 23:56	vote	accept	italo lira
Feb 2, 2016 at 23:56
Feb 2, 2016 at 19:33	answer	added	Sebastian Goette		timeline score: 5
S Jan 31, 2016 at 20:55	history	edited	Joonas Ilmavirta	CC BY-SA 3.0	Language editing and a tag.
S Jan 31, 2016 at 20:55	history	suggested	Semsem	CC BY-SA 3.0	Language editing
Jan 31, 2016 at 20:12	review	Suggested edits
S Jan 31, 2016 at 20:55
Jan 27, 2016 at 0:57	comment	added	italo lira		I tried to find Killing vector fields with this property on surfaces of revolution but in the examples that build the liminf was zero. The motivation of this question is to find a vector field X on a complete manifold with finite volume such that $\rm{div} X$ is integrable and $$ \displaystyle\int_{M} (\rm{div} X) d\nu_{g} =0 $$ but the vector field X does not satisfy the hypothesis of the Karp's theorem in On Stokes’ Theorem for noncompact manifolds , 1981.
Jan 26, 2016 at 14:07	comment	added	Holonomia		@italo lira: Do you know the answer when $M$ is a surface i.e. $dim(M)=2$ ?
Jan 25, 2016 at 16:30	comment	added	italo lira		Sorry, I made mistakes, the correct is Is there ..... ? Thank you very much.
S Jan 25, 2016 at 3:21	history	edited	Michael Albanese	CC BY-SA 3.0	Fixed mathjax
S Jan 25, 2016 at 3:21	history	suggested	Silvia Ghinassi	CC BY-SA 3.0	Fixed mathjax
Jan 25, 2016 at 3:20	comment	added	Silvia Ghinassi		Do you mean "Is there [...]?"?
Jan 25, 2016 at 3:20	review	Suggested edits
S Jan 25, 2016 at 3:21
Jan 24, 2016 at 16:28	review	First posts
Jan 24, 2016 at 16:33
Jan 24, 2016 at 16:23	history	asked	italo lira	CC BY-SA 3.0