7 research outputs found
PU(2) monopoles and links of top-level Seiberg-Witten moduli spaces
This is the first of two articles in which we give a proof - for a broad
class of four-manifolds - of Witten's conjecture that the Donaldson and
Seiberg-Witten series coincide, at least through terms of degree less than or
equal to c-2, where c is a linear combination of the Euler characteristic and
signature of the four-manifold. This article is a revision of sections 1-3 of
an earlier version of the article dg-ga/9712005, now split into two parts,
while a revision of sections 4-7 of that earlier version appears in a recently
updated dg-ga/9712005. In the present article, we construct virtual normal
bundles for the Seiberg-Witten strata of the moduli space of PU(2) monopoles
and compute their Chern classes.Comment: Journal fur die Reine und Angewandte Mathematik, to appear; 64 page
PU(2) monopoles. II: Top-level Seiberg-Witten moduli spaces and Witten's conjecture in low degrees
In this article we complete the proof---for a broad class of
four-manifolds---of Witten's conjecture that the Donaldson and Seiberg-Witten
series coincide, at least through terms of degree less than or equal to c-2,
where c is a linear combination of the Euler characteristic and signature of
the four-manifold. This article is a revision of sections 4--7 of an earlier
version, while a revision of sections 1--3 of that earlier version now appear
in a separate companion article (math.DG/0007190). Here, we use our
computations of Chern classes for the virtual normal bundles for the
Seiberg-Witten strata from the companion article (math.DG/0007190), a
comparison of all the orientations, and the PU(2) monopole cobordism to compute
pairings with the links of level-zero Seiberg-Witten moduli subspaces of the
moduli space of PU(2) monopoles. These calculations then allow us to compute
low-degree Donaldson invariants in terms of Seiberg-Witten invariants and
provide a partial verification of Witten's conjecture.Comment: Journal fur die Reine und Angewandte Mathematik, to appear; 65 pages.
Revision of sections 4-7 of version v1 (December 1997