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- Bog, paperback
- Engelsk
- Indgår i serie
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Beskrivelse
This book describes an invariant, l, of oriented rational homology 3-spheres which is a generalization of work of Andrew Casson in the integer homology sphere case. Let R(X) denote the space of conjugacy classes of representations of p(X) into SU(2). Let (W,W,F) be a Heegaard splitting of a rational homology sphere M. Then l(M) is declared to be an appropriately defined intersection number of R(W) and R(W) inside R(F). The definition of this intersection number is a delicate task, as the spaces involved have singularities. A formula describing how l transforms under Dehn surgery is proved. The formula involves Alexander polynomials and Dedekind sums, and can be used to give a rather elementary proof of the existence of l. It is also shown that when M is a Z-homology sphere, l(M) determines the Rochlin invariant of M.
Detaljer
- SprogEngelsk
- Sidetal150
- Udgivelsesdato23-03-1992
- ISBN139780691025322
- Forlag Princeton University Press
- FormatPaperback
Størrelse og vægt
10 cm
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