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Generating curtis tables

Part of the Lecture Notes in Mathematics book series (LNM,volume 673)

Keywords

  • Homology Class
  • Full Cycle
  • Basis Cycle
  • Minimal Basis
  • Recursive Process

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References

  1. Bousfield, Curtis, Kan, Quillen, Rector, and Schlesinger, Topology 5 (1966) 331–342. MR 33 #8002.

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  2. Bousfield, A.K., and D.M. Kan, The homotopy spectral sequence etc., Topology 11 (1972) 79–106, especially pp. 101–102. MR 44 #1031.

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  3. Curtis, E.B. Simplical homotopy theory. Lecture notes, Aarhus Universitet, 1967. MR 42 #3785. Reprinted, slightly revised and enlarged, in Advances in Math. 6 (1971) 107–209. MR 43 #5529. Curtis table on p. 104 of Aarhus notes (to the 23-stem) and p. 190 of Advances (to the 16-stem).

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  4. Hansen, Wm. A., Computer calculation of the homology of the lambda algebra. Dissertation, Northwestern University, 1974.

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  5. Tangora, M.C., On the cohomology of the Steenrod algebra. Dissertation, Northwestern University, 1966. Slightly revised and condensed, Math. Z. 116 (1970) 18–64. MR 42 #1112. (A presentation of some of the ideas in Section 2 was condensed out of the published version.)

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  6. Tangora, M.C., Some remarks on the lambda algebra. Submitted to Proceedings of the March 1977 Conference on Topology at Evanston, Illinois.

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  7. Wang, J.S.P., On the cohomology of the mod-2 Steenrod algebra etc., Ill. J. Math. 11 (1967), 480–490. MR 35 #4917.

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  8. Whitehead, G.W. Recent advances in homotopy theory. Regional Conference Series (A.M.S.-Conference Board), 1970. MR 46 #8208. The table is on pp. 71–73 (to the 22-stem).

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© 1978 Springer-Verlag

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Tangora, M.C. (1978). Generating curtis tables. In: Hoffman, P., Piccinini, R.A., Sjerve, D. (eds) Algebraic Topology. Lecture Notes in Mathematics, vol 673. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0064700

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  • DOI: https://doi.org/10.1007/BFb0064700

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  • Print ISBN: 978-3-540-08930-8

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