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) 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

[math]\displaystyle{ \text{Ext}_{A_*}^{s,*}(Z/pZ,Z/pZ). \, }[/math]

(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.

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