This lecture announces results concerning compact complex manifolds M which are Kähler outside an analytic subset Y of codimension at least 2 (the authors conjecture that such a manifold has always a Kähler modification). The question is to determine to what extent the “exceptional” subset Y is an obstruction for M to be Kähler. The results are restricted to the case when Y is a curve. The first theorem asserts that the (n−1, n−1)-current defined by Y always yields to an obstruction in the spirit of Harvey-Lawson’s criterion when M is not Kähler. The authors also obtain numerical conditions.
Compact complex manifolds which are Kähler outside an analytic subset / Alessandrini, Lucia; Bassanelli, Giovanni. - (1996), pp. 27-34. (Intervento presentato al convegno Seminari di geometria del Dip. di Matematica dell'Università di Bologna tenutosi a Bologna nel 1994 - 1995).
Compact complex manifolds which are Kähler outside an analytic subset
ALESSANDRINI, Lucia;BASSANELLI, Giovanni
1996-01-01
Abstract
This lecture announces results concerning compact complex manifolds M which are Kähler outside an analytic subset Y of codimension at least 2 (the authors conjecture that such a manifold has always a Kähler modification). The question is to determine to what extent the “exceptional” subset Y is an obstruction for M to be Kähler. The results are restricted to the case when Y is a curve. The first theorem asserts that the (n−1, n−1)-current defined by Y always yields to an obstruction in the spirit of Harvey-Lawson’s criterion when M is not Kähler. The authors also obtain numerical conditions.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
