In 2009 T.-J. Li and W. Zhang defined an almost complex structure J on a manifold X to be C^\infty-pure-and-full if the second de Rham cohomology group can be decomposed as a direct sum of the subgroups whose elements are cohomology classes admitting J-invariant and J-anti-invariant representatives. It turns out (see T. Draghici, T.-J. Li and W. Zhang (2010)) that any almost complex structure on a 4-dimensional compact manifold is C^\infty-pure-and-full. We study the J-invariant and J-anti-invariant cohomology subgroups on almost complex manifolds, possibly non-compact. In particular, we prove an analytic continuation result for anti-invariant forms on almost complex manifolds. - See more at: http://www.ams.org/journals/proc/2014-142-11/S0002-9939-2014-11578-4/#sthash.yZn8gAfE.dpuf
On non-pure forms on almost complex manifolds / R., Hind; Medori, Costantino; Tomassini, Adriano. - In: PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY. - ISSN 0002-9939. - 142:11(2014), pp. 3909-3922. [10.1090/S0002-9939-2014-11578-4]
On non-pure forms on almost complex manifolds
MEDORI, Costantino;TOMASSINI, Adriano
2014-01-01
Abstract
In 2009 T.-J. Li and W. Zhang defined an almost complex structure J on a manifold X to be C^\infty-pure-and-full if the second de Rham cohomology group can be decomposed as a direct sum of the subgroups whose elements are cohomology classes admitting J-invariant and J-anti-invariant representatives. It turns out (see T. Draghici, T.-J. Li and W. Zhang (2010)) that any almost complex structure on a 4-dimensional compact manifold is C^\infty-pure-and-full. We study the J-invariant and J-anti-invariant cohomology subgroups on almost complex manifolds, possibly non-compact. In particular, we prove an analytic continuation result for anti-invariant forms on almost complex manifolds. - See more at: http://www.ams.org/journals/proc/2014-142-11/S0002-9939-2014-11578-4/#sthash.yZn8gAfE.dpufI documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
