The sheaf $\alpha$ $\bullet$ X
Abstract
We introduce in a reduced complex space, a "new coherent sub-sheaf" of the sheaf which has the "universal pull-back property" for any holomorphic map, and which is in general bigger than the usual sheaf of holomorphic differential forms . We show that the meromorphic differential forms which are sections of this sheaf satisfy integral dependence equations over the symmetric algebra of the sheaf . This sheaf is also closely related to the normalized Nash transform. We also show that these meromorphic differential forms are locally square-integrable on any dimensional cycle in and that the corresponding functions obtained by integration on an analytic family of cycles are locally bounded and locally continuous on the complement of closed analytic subset.
Cite
@article{arxiv.1707.07962,
title = {The sheaf $\alpha$ $\bullet$ X},
author = {Daniel Barlet},
journal= {arXiv preprint arXiv:1707.07962},
year = {2017}
}