Some remarks on the Kronheimer-Mrowka classes of algebraic surfaces

Abstract

Define the Donaldson series of a simply connected 4-manifold by q(X) = Σd qd(X)/d! Recently Kronheimer and Mroka have announced the result that the Donaldson series of so called simple 4-manifolds can be written as q(X) = eQ/2Σi=1p ai eKi where Q is the intersection form and the Ki ∈ H2(X,) are the Kronheimer-Mrowka classes. We prove that for simple simply connected algebraic surfaces the Ki are algebraic classes and that they are closely related to the canonical class KX. For simple simply connected minimal surfaces of general type we prove Ki2 KX2 with equality if and only if Ki = KX. Remark: although no gauge theory is used in this paper it should have a cross reference with the as yet non existent e-print service for low dimensional topology.

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