Segal's Burnside ring conjecture, or, more briefly, the Segal conjecture, is a theorem in homotopy theory, a branch of mathematics. The theorem relates...
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conjecture Kelvin's conjecture Kouchnirenko's conjecture Mertens conjecture Pólya conjecture, 1919 (1958) Ragsdale conjecture Schoenflies conjecture (disproved...
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based on big data, machine learning and artificial intelligence. Segal's Burnside conjecture provides a description of the stable cohomotopy theory of the...
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equivariant K-theory. The Atiyah–Segal completion theorem in that subject was a major motivation for the Segal conjecture, which he formulated. He has made...
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2307/2007071. JSTOR 2007071. Carlsson, Gunnar (1983). "G.B. Segal's Burnside Ring Conjecture for (Z/2)^k". Topology. 22 (1): 83–103. doi:10.1016/0040-9383(83)90046-0...
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the Segal conjecture for elementary abelian groups, which provided the algebraic starting point for Gunnar Carlsson's solution of the full conjecture. At...
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topology, Brown–Gitler spectrum is related to the concepts of the Segal conjecture (proven in 1984) and the Burnside ring. Brown–Gitler spectra have had...
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in the case that the group is algebraic over the complex numbers. Segal conjecture Greenlees, J.P.C. (1996). "An introduction to equivariant K-theory...
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Burnside ring for compact groups is described in (tom Dieck 1987). The Segal conjecture relates the Burnside ring to homotopy. Burnside category Burnside,...
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Some of his later work concerns a circle of ideas surrounding the Segal conjecture, transfer homomorphisms, and stable splittings of classifying spaces...
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Katey Sagal (redirect from Katey Segal)
Alders 10 episodes 2016 The Big Bang Theory Susan Episode: "The Conjugal Conjecture" This Is Us Lanie Schultz Episode: "The Big Three" 2016–2017 Brooklyn...
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extended to all compact Lie groups by incorporating results from Graeme Segal's thesis, that extension was complicated. However a simpler and more general...
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Shing-Tung Yau (section Calabi conjecture)
recognition of his contributions to partial differential equations, the Calabi conjecture, the positive energy theorem, and the Monge–Ampère equation. Yau is considered...
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KO → KU is a Z {\displaystyle \mathbb {Z} } ./2-Galois extension. Segal conjecture Mathew, Akhil; Meier, Lennart (2015). "Affineness and chromatic homotopy...
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Cartan–Hadamard conjecture. He discovered that the so-called Weil representation, previously introduced in quantum mechanics by Irving Segal and David Shale...
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conversations with Quillen, Segal soon introduced another approach to constructing algebraic K-theory under the name of Γ-objects. Segal's approach is a homotopy...
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obtained results similar to Fatou's. In 1916 he formulated the Bieberbach conjecture, stating a necessary condition for a holomorphic function to map the open...
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Herbert Grötzsch and Lars Ahlfors in different contexts. Teichmüller's main conjecture stated that variation of conformal structure can be realised uniquely...
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(2^{190738}-1)+4)\times 2^{95369}+3} If the first Hardy–Littlewood conjecture holds, then cousin primes have the same asymptotic density as twin primes...
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K-theory, Quillen worked on the Adams conjecture, formulated by Frank Adams, in homotopy theory. His proof of the conjecture used techniques from the modular...
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homological mirror symmetry program of Maxim Kontsevich, and the SYZ conjecture of Andrew Strominger, Shing-Tung Yau, and Eric Zaslow and its algebraic...
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Floer homology (redirect from Atiyah-Floer conjecture)
now called symplectic Floer homology, in his 1988 proof of the Arnold conjecture in symplectic geometry. Floer also developed a closely related theory...
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opening words of its first line, and as the Ode to Anactoria, based on a conjecture that its subject is Anactoria, a woman mentioned elsewhere by Sappho....
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Professor of History at the University of York 2 November 2006 The Poincaré conjecture June Barrow-Green, Lecturer in the History of Mathematics at the Open...
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compute area in two-dimensional examples. The homological mirror symmetry conjecture of Maxim Kontsevich states that the derived category of coherent sheaves...
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and not that long ago. Were there behavioural/temperament issues? Just conjecture. But it does seem odd that a good looking, charismatic performer, who...
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topic is due to the AdS/CFT correspondence where there is a number of conjectures relating higher-spin theories to weakly coupled conformal field theories...
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An important open problem involving bridges is the cycle double cover conjecture, due to Seymour and Szekeres (1978 and 1979, independently), which states...
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between different versions of string theory, and this has led to the conjecture that all consistent versions of string theory are subsumed in a single...
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extend justice to animals because they are rational beings. To support his conjecture, Porphyry argues that because animals have similar anatomy, psychology...
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