On quotients of real algebraic surfaces in \(\mathbb{C} \mathbb{P}^ 3\)
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Publication:1903599
DOI10.1016/0166-8641(95)00026-DzbMath0854.58037WikidataQ127442886 ScholiaQ127442886MaRDI QIDQ1903599
Publication date: 29 January 1996
Published in: Topology and its Applications (Search for Journal in Brave)
Yang-Mills and other gauge theories in quantum field theory (81T13) General geometric structures on low-dimensional manifolds (57M50) Group actions on manifolds and cell complexes in low dimensions (57M60) Differential complexes (58J10) Real algebraic and real-analytic geometry (14P99)
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Cites Work
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- Polynomial invariants for smooth four-manifolds
- Towards a classification of real algebraic surfaces
- Moduli spaces over manifolds with involutions
- Gauge theory for embedded surfaces. I
- The quotient space of the complex projective plane under conjugation is a 4-sphere
- A \(\Pi_*\)-module structure for \(\Theta_*\) and applications to transformation groups
- The quotient space of \(CP(2)\) by complex conjugation is the 4-sphere
- Progress in the topology of real algebraic varieties over the last six years
- On quotients of complex surfaces under complex conjugation.
- Splitting S 4 on RP 2 via the Branched Cover of CP 2 over S 4
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