Spin canonical invariants of 4-manifolds and algebraic surfaces

Abstract

The paper is a colloquial-style discussion of invariants of algebraic surfaces analogous to the Donaldson polynomials, arising from moduli spaces of ``jumping'' Yang--Mills instantons, or moduli spaces of jumping vector bundles. The invariants have the following applications: (1) to the Van de Ven conjecture that the Kodaira dimension is a diffeomorphism invariant; (2) to proving that algebraic surfaces with pg > 0 have a proper sublattice of H2(X,) invariant under diffeomorphism; (3) to proving the same result as (2) for surfaces with pg = 0, in particular the Barlow surface.

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