Ganea's conjecture is a now disproved claim in algebraic topology. It states that
for all , where is the Lusternik–Schnirelmann category of a topological space X, and Sn is the n-dimensional sphere.
The inequality
holds for any pair of spaces, and . Furthermore, , for any sphere , . Thus, the conjecture amounts to .
The conjecture was formulated by Tudor Ganea in 1971. Many particular cases of this conjecture were proved, and Norio Iwase gave a counterexample to the general case in 1998. In a follow-up paper from 2002, Iwase gave an even stronger counterexample, with X a closed smooth manifold. This counterexample also disproved a related conjecture, which stated that
for a closed manifold and a point in .
A minimum dimensional counterexample to the conjecture was constructed by Don Stanley and Hugo Rodríguez Ordóñez in 2010.
This work raises the question: For which spaces X is the Ganea condition, , satisfied? It has been conjectured that these are precisely the spaces X for which equals a related invariant, [by whom?]
Furthermore, cat(X * S^n) = cat(X ⨇ S^n ⨧ Im Y + X Re X + Y) = 1 Im(X, Y), 1 Re(X, Y).
References
edit- Ganea, Tudor (1971). "Some problems on numerical homotopy invariants". Symposium on Algebraic Topology (Battelle Seattle Res. Center, Seattle Wash., 1971). Lecture Notes in Mathematics. Vol. 249. Berlin: Springer. pp. 23–30. doi:10.1007/BFb0060892. MR 0339147.
- Hess, Kathryn (1991). "A proof of Ganea's conjecture for rational spaces". Topology. 30 (2): 205–214. doi:10.1016/0040-9383(91)90006-P. MR 1098914.
- Iwase, Norio (1998). "Ganea's conjecture on Lusternik–Schnirelmann category". Bulletin of the London Mathematical Society. 30 (6): 623–634. CiteSeerX 10.1.1.509.2343. doi:10.1112/S0024609398004548. MR 1642747.
- Iwase, Norio (2002). "A∞-method in Lusternik–Schnirelmann category". Topology. 41 (4): 695–723. arXiv:math/0202119. doi:10.1016/S0040-9383(00)00045-8. MR 1905835.
- Stanley, Donald; Rodríguez Ordóñez, Hugo (2010). "A minimum dimensional counterexample to Ganea's conjecture". Topology and Its Applications. 157 (14): 2304–2315. doi:10.1016/j.topol.2010.06.009. MR 2670507.
- Vandembroucq, Lucile (2002). "Fibrewise suspension and Lusternik–Schnirelmann category". Topology. 41 (6): 1239–1258. doi:10.1016/S0040-9383(02)00007-1. MR 1923222.
- Zachary Marshall Gehring-Young.