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- Seiberg–Witten_invariant abstract "In mathematics, Seiberg–Witten invariants are invariants of compact smooth 4-manifolds introduced by Witten (1994), using the Seiberg–Witten theory studied by Seiberg and Witten (1994a, 1994b) during their investigations of Seiberg–Witten gauge theory.Seiberg–Witten invariants are similar to Donaldson invariants and can be used to prove similar (but sometimes slightly stronger) results about smooth 4-manifolds. They are technically much easier to work with than Donaldson invariants; for example, the moduli spaces of solutions of the Seiberg–Witten equations tend to be compact, so one avoids the hard problems involved in compactifying the moduli spaces in Donaldson theory. For detailed descriptions of Seiberg–Witten invariants see (Donaldson 1996), (Moore 2001), (Morgan 1996), (Nicolaescu 2000), (Scorpan 2005, Chapter 10). For the relation to symplectic manifolds and Gromov–Witten invariants see (Taubes 2000). For the early history see (Jackson 1995).".
- Seiberg–Witten_invariant wikiPageID "14407762".
- Seiberg–Witten_invariant wikiPageRevisionID "552452738".
- Seiberg–Witten_invariant author2Link "Edward Witten".
- Seiberg–Witten_invariant authorLink "Nathan Seiberg".
- Seiberg–Witten_invariant first "Ch.".
- Seiberg–Witten_invariant id "S/s120080".
- Seiberg–Witten_invariant last "Nash".
- Seiberg–Witten_invariant last "Seiberg".
- Seiberg–Witten_invariant last "Witten".
- Seiberg–Witten_invariant title "Seiberg-Witten equations".
- Seiberg–Witten_invariant txt "yes".
- Seiberg–Witten_invariant year "1994".
- Seiberg–Witten_invariant subject Category:4-manifolds.
- Seiberg–Witten_invariant subject Category:Partial_differential_equations.
- Seiberg–Witten_invariant comment "In mathematics, Seiberg–Witten invariants are invariants of compact smooth 4-manifolds introduced by Witten (1994), using the Seiberg–Witten theory studied by Seiberg and Witten (1994a, 1994b) during their investigations of Seiberg–Witten gauge theory.Seiberg–Witten invariants are similar to Donaldson invariants and can be used to prove similar (but sometimes slightly stronger) results about smooth 4-manifolds.".
- Seiberg–Witten_invariant label "Seiberg–Witten invariant".
- Seiberg–Witten_invariant sameAs Seiberg%E2%80%93Witten_invariant.
- Seiberg–Witten_invariant sameAs Q7446569.
- Seiberg–Witten_invariant sameAs Q7446569.
- Seiberg–Witten_invariant wasDerivedFrom Seiberg–Witten_invariant?oldid=552452738.