Moduli spaces over manifolds with involutions
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Publication:1318102
DOI10.1007/BF01445098zbMath0788.58012MaRDI QIDQ1318102
Publication date: 15 May 1994
Published in: Mathematische Annalen (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/165078
4-manifoldsinvolutionsmoduli spacegauge theorystable bundleanti-self-dual connectionssingular connectionbounded metric
Moduli problems for differential geometric structures (58D27) Real algebraic and real-analytic geometry (14P99)
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Cites Work
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- A unique continuation theorem for solutions of elliptic partial differential equations or inequalities of second order
- The index theorem for topological manifolds
- Self-dual connections on 4-manifolds with indefinite intersection matrix
- Quasiconformal 4-manifolds
- Instantons on \({\mathbb{C}}{\mathbb{P}}_ 2\)
- Pseudofree orbifolds
- Connections with \(L^ p \)bounds on curvature
- Classification of singular Sobolev connections by their holonomy
- Stable vector bundles and instantons
- Moduli of vector bundles on the projective plane
- Gauge theory for embedded surfaces. I
- The quotient space of the complex projective plane under conjugation is a 4-sphere
- Finite Group Actions on the Moduli Space of Self-Dual Connections. I
- RANK 2 VECTOR BUNDLES OVER A COMPLEX QUADRIC SURFACE
- Connected sums of self-dual manifolds and deformations of singular spaces
- Differentiable periodic maps
- Quotients of complex manifolds and moduli spaces of Klein surfaces
- Self-duality in four-dimensional Riemannian geometry
