- Doomsday conjecture
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In algebraic topology, the doomsday conjecture was a conjecture about Ext groups over the Steenrod algebra made by Joel Cohen, named by Michael Barratt, published by Milgram (1971, conjecture 73) and disproved by Mahowald (1977). Minami (1995) stated a modified version called the new doomsday conjecture.
The original doomsday conjecture was that for any prime p and positive integer s there are only a finite number of permanent cycles in
Mahowald (1977) found an infinite number of permanent cycles for p = s = 2, disproving the conjecture. Minami's new doomsday conjecture is a weaker form stating (in the case p = 2) that there are no nontrivial permanent cycles in the image of (Sq0)n for n sufficiently large depending on s.
References
- Mahowald, Mark (1977), "A new infinite family in 2π * s", Topology. An International Journal of Mathematics 16 (3): 249–256, doi:10.1016/0040-9383(77)90005-2, ISSN 0040-9383, MR0445498
- Milgram (1971), "Problems presented to the 1970 AMS symposium on algebraic topology", Proc. Symp. Pure Math, 22, pp. 187–201
- Minami, Norihiko (1995), "The Adams spectral sequence and the triple transfer", American Journal of Mathematics 117 (4): 965–985, doi:10.2307/2374955, ISSN 0002-9327, MR1342837
- Minami, Norihiko (1998), "On the Kervaire invariant problem", in Mahowald, Mark E.; Priddy, Stewart, Homotopy theory via algebraic geometry and group representations (Evanston, IL, 1997), Contemp. Math., 220, Providence, R.I.: Amer. Math. Soc., ISBN 978-0-8218-0805-4, MR1642897
- Minami, Norihiko (1999), "The iterated transfer analogue of the new doomsday conjecture", Transactions of the American Mathematical Society 351 (6): 2325–2351, doi:10.1090/S0002-9947-99-02037-1, ISSN 0002-9947, MR1443884
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