Forme de Blanchfield et cobordisme d'entrelacs bords.
Julien Duval (1986)
Commentarii mathematici Helvetici
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Displaying similar documents to “Hermitian forms on link modules.”
Forme de Blanchfield et cobordisme d'entrelacs bords.
On the Covariant Differential of an Almost Hermitian Structure.
J.M. Terrier (1975)
Commentarii mathematici Helvetici
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Character Modules
D.J. Fieldhouse (1971)
Commentarii mathematici Helvetici
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Pseudo-Hermitian Symmetric Spaces
R.A. Shapiro (1971)
Commentarii mathematici Helvetici
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Maximal hermitian forms over ...G .
Jorge F. Morales (1988)
Commentarii mathematici Helvetici
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Finitude du nombre des classes d'isomorphisme des structures isométriques entières.
Eva Bayer, Francoise Michel (1979)
Commentarii mathematici Helvetici
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Bilinear Forms on k-Vektorspaces of Denumerable Dimension in the Case of char (k) = 2.
H. Gross, Robert D. Engle (1965/66)
Commentarii mathematici Helvetici
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The module of a 2-component link.
J. Levine (1982)
Commentarii mathematici Helvetici
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On a simplicial complex associated with tilting modules.
Ch., Schofield, Aidan Riedtmann (1991)
Commentarii mathematici Helvetici
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On Four Dimensional Surgery and Applications
Sylvain E. Cappell, Julius L. Shaneson (1971)
Commentarii mathematici Helvetici
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Zwei elementare Sätze über positive Lösungen linearer homogener Gleichungssysteme.
H. Gross (1961)
Commentarii mathematici Helvetici
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Hermitian (a,b)-modules and Saito's "higher residue pairings"
Piotr P. Karwasz (2013)
Annales Polonici Mathematici
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Following the work of Daniel Barlet [Pitman Res. Notes Math. Ser. 366 (1997), 19-59] and Ridha Belgrade [J. Algebra 245 (2001), 193-224], the aim of this article is to study the existence of (a,b)-hermitian forms on regular (a,b)-modules. We show that every regular (a,b)-module E with a non-degenerate bilinear form can be written in a unique way as a direct sum of (a,b)-modules that admit either an (a,b)-hermitian or an (a,b)-anti-hermitian form or both; all three cases are possible,...