Ravenel's conjectures
In mathematics, the Ravenel conjectures are a set of mathematical conjectures in the field of stable homotopy theory posed by Douglas Ravenel at the end of a paper published in 1984.[1] It was earlier circulated in preprint.[2] The problems involved have largely been resolved, with all but the "telescope conjecture" being proved in later papers by others.[3][4] The telescope conjecture is now generally believed not to be true, though there are some conflicting claims concerning it in the published literature, and is taken to be an open problem.[2] Ravenel's conjectures exerted influence on the field through the founding of the approach of chromatic homotopy theory.
The first of the seven conjectures, then the nilpotence conjecture, is now the nilpotence theorem. The telescope conjecture, which was #4 on the original list, remains of substantial interest because of its connection with the convergence of an Adams–Novikov spectral sequence. While opinion is against the truth of the original statement, investigations of associated phenomena (for a triangulated category in general) have become a research area in its own right.[5][6]
References
- ^ Ravenel, Douglas C. (1984). "Localization with Respect to Certain Periodic Homology Theories" (PDF). American Journal of Mathematics. 106 (2): 351–414. doi:10.2307/2374308. JSTOR 2374308. MR 0737778.
- ^ a b Hopkins, Michael J. (2008). "The mathematical work of Douglas C. Ravenel" (PDF). Homology, Homotopy and Applications. 10 (3, Proceedings of a Conference in Honor of Douglas C. Ravenel and W. Stephen Wilson): 1–13. doi:10.4310/HHA.2008.v10.n3.a1.
- ^ Devinatz, Ethan S.; Hopkins, Michael J.; Smith, Jeffrey H. (1988). "Nilpotence and stable homotopy theory. I". Annals of Mathematics. Second Series. 128 (2): 207–241. doi:10.2307/1971440. ISSN 0003-486X. JSTOR 1971440. MR 0960945.
- ^ Hopkins, Michael J.; Smith, Jeffrey H. (1998). "Nilpotence and Stable Homotopy Theory II". Annals of Mathematics. Second Series. 148 (1): 1–49. CiteSeerX 10.1.1.568.9148. doi:10.2307/120991. JSTOR 120991.
- ^ Brüning, Kristian (2007). "Subcategories of Triangulated Categories and the Smashing Conjecture" (PDF). Dissertation zur Erlangung des akademischen Grades: 25.
{{cite journal}}: Cite journal requires|journal=(help) - ^ Jack, Hall; David, Rydh (2016-06-27). "The telescope conjecture for algebraic stacks". Journal of Topology. 10 (3): 776–794. arXiv:1606.08413. doi:10.1112/topo.12021. S2CID 119336098.