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現代数学の系譜 工学物理雑談 古典ガロア理論も読む49 (658レス)
現代数学の系譜 工学物理雑談 古典ガロア理論も読む49 http://rio2016.5ch.net/test/read.cgi/math/1514376850/
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574: 現代数学の系譜 雑談 古典ガロア理論も読む ◆e.a0E5TtKE [sage] 2018/01/18(木) 23:11:47.44 ID:gGT+ehE7 >>570 補足 Swinnerton-Dyerさんが出てくるね(^^ https://en.wikipedia.org/wiki/Littlewood_conjecture Littlewood conjecture (抜粋) Connection to further conjectures[edit] It is known that this would follow from a result in the geometry of numbers, about the minimum on a non-zero lattice point of a product of three linear forms in three real variables: the implication was shown in 1955 by J. W. S. Cassels and Swinnerton-Dyer.[1] This can be formulated another way, in group-theoretic terms. There is now another conjecture, expected to hold for n ? 3: it is stated in terms of G = SLn(R), Γ = SLn(Z), and the subgroup D of diagonal matrices in G. Conjecture: for any g in G/Γ such that Dg is relatively compact (in G/Γ), then Dg is closed. This in turn is a special case of a general conjecture of Margulis on Lie groups. (引用終り) https://en.wikipedia.org/wiki/Peter_Swinnerton-Dyer Peter Swinnerton-Dyer (抜粋) Sir Henry Peter Francis Swinnerton-Dyer, 16th Baronet KBE FRS (born 2 August 1927), commonly known as Peter Swinnerton-Dyer, is an English mathematician specialising in number theory at University of Cambridge. As a mathematician he is best known for his part in the Birch and Swinnerton-Dyer conjecture relating algebraic properties of elliptic curves to special values of L-functions, which was developed with Bryan Birch during the first half of the 1960s with the help of machine computation, and for his work on the Titan operating system. (引用終り) https://en.wikipedia.org/wiki/Birch_and_Swinnerton-Dyer_conjecture Birch and Swinnerton-Dyer conjecture http://rio2016.5ch.net/test/read.cgi/math/1514376850/574
575: 現代数学の系譜 雑談 古典ガロア理論も読む ◆e.a0E5TtKE [sage] 2018/01/18(木) 23:43:17.75 ID:gGT+ehE7 >>574 補足 この文が、だれがいつ書いたのか不明だが・・・ ”that contributed to Lindenstrauss' Fields Medal in 2010.”とあってね へー、「Lindenstrauss' Fields Medal in 2010」なのか〜、と思った次第 私も、不勉強だね〜。全然ピントこなかったな〜(^^ https://www.york.ac.uk/ University of York https://www.york.ac.uk/media/mathematics/documents/Littlewood.pdf (抜粋) Littlewood's Conjecture (1930) Littlewood's Conjecture is at the heart of multiplicative Diophantine approximation and has motivated many recent breakthrough developments such as the work of Einsiedler, Katok and Lindenstrauss [5] that contributed to Lindenstrauss' Fields Medal in 2010. The conjecture is well known for its strong links with dynamical systems and ergodic theory (indeed, the measure rigidity conjecture of Margulis [7] regarding the dynamics on SL3(R)=SL3(Z) implies Littlewood's Conjecture) and is currently a part of a major research trend world-wide. It has been in the spotlight at many recent major workshops and conferences including the 2010 ICM in Hyderabad. (引用終り) http://rio2016.5ch.net/test/read.cgi/math/1514376850/575
600: 現代数学の系譜 雑談 古典ガロア理論も読む ◆e.a0E5TtKE [sage] 2018/01/20(土) 10:16:03.55 ID:gQefYikW >>574 Current statusのところに図があって、これなかなか綺麗な図だなと(^^ https://en.wikipedia.org/wiki/Birch_and_Swinnerton-Dyer_conjecture Birch and Swinnerton-Dyer conjecture (抜粋) Current status A plot of Π _{p<= X}{{N_{p}}/{p}} for the curve y2 = x3 ? 5x as X varies over the first 100000 primes. The X-axis is log(log(X)) and Y-axis is in a logarithmic scale so the conjecture predicts that the data should form a line of slope equal to the rank of the curve, which is 1 in this case. For comparison, a line of slope 1 is drawn in red on the graph. (引用終り) http://rio2016.5ch.net/test/read.cgi/math/1514376850/600
625: 現代数学の系譜 雑談 古典ガロア理論も読む ◆e.a0E5TtKE [sage] 2018/01/20(土) 22:36:34.15 ID:gQefYikW >>574 補足 https://en.wikipedia.org/wiki/Littlewood_conjecture Littlewood conjecture (抜粋) References 3 M. Einsiedler; A. Katok; E. Lindenstrauss (2006-09-01). "Invariant measures and the set of exceptions to Littlewood's conjecture". Annals of Mathematics. 164 (2): 513?560. arXiv:math.DS/0612721?Freely accessible. doi:10.4007/annals.2006.164.513. MR 2247967. Zbl 1109.22004. (引用終り) これ、arXiv:mathのリンクから下記に入ると、”Ann. of Math. (2) 164 (2006)”版が公開されているね〜(^^ https://arxiv.org/abs/math/0612721 https://arxiv.org/pdf/math/0612721.pdf Invariant measures and the set of exceptions to Littlewood's conjecture Manfred Einsiedler, Anatole Katok, Elon Lindenstrauss (Submitted on 22 Dec 2006) We classify the measures on SL (k,R)/SL (k,Z) which are invariant and ergodic under the action of the group A of positive diagonal matrices with positive entropy. We apply this to prove that the set of exceptions to Littlewood's conjecture has Hausdorff dimension zero. Subjects: Dynamical Systems (math.DS); Number Theory (math.NT) Journal reference: Ann. of Math. (2) 164 (2006), no. 2, 513--560 (抜粋) Part 2. Positive entropy and the set of exceptions to Littlewood’s Conjecture 7. Definitions 11. The set of exceptions to Littlewood’s Conjecture The following well-known proposition gives the reduction of Littlewood’s conjecture to the dynamical question which we studied in Section 10; see also [24, §2] and [46, §30.3]. We include the proof for completeness. Proposition 11.1. The tuple (u, v) satisfies (11.1) liminf n→∞ n ||nu|| ||nv|| = 0, if and only if the orbit A+τu,v is unbounded where A+ is the semigroup (略) (引用終り) http://rio2016.5ch.net/test/read.cgi/math/1514376850/625
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