Completely bounded multilinear maps and C*-algebraic cohomology.
E. Christensen, E.G. Effros (1987)
Inventiones mathematicae
Similarity:
E. Christensen, E.G. Effros (1987)
Inventiones mathematicae
Similarity:
D.L. JOHNSON (1969)
Inventiones mathematicae
Similarity:
Christopher Deninger (1991)
Inventiones mathematicae
Similarity:
M. Kaneda, N. Shimada, M. Tezuka (1990)
Mathematische Zeitschrift
Similarity:
D.L. JOHNSON (1969)
Inventiones mathematicae
Similarity:
J.F. MCCLENDON (1969)
Inventiones mathematicae
Similarity:
Michishige Tezuka (1994)
Mathematische Zeitschrift
Similarity:
E. Cline, B. Parshall, L. Scott (1977)
Inventiones mathematicae
Similarity:
A. Dickenstein, C. sessa (1985)
Inventiones mathematicae
Similarity:
Victor A. Abrashkin (1990)
Inventiones mathematicae
Similarity:
W. Kucharz (2005)
Annales Polonici Mathematici
Similarity:
A Nash cohomology class on a compact Nash manifold is a mod 2 cohomology class whose Poincaré dual homology class can be represented by a Nash subset. We find a canonical way to define Nash cohomology classes on an arbitrary compact smooth manifold M. Then the Nash cohomology ring of M is compared to the ring of algebraic cohomology classes on algebraic models of M. This is related to three conjectures concerning algebraic cohomology classes.