Treynor ratio: Difference between revisions

Revision as of 10:16, 27 February 2013

In mathematics, the Seifert conjecture states that every nonsingular, continuous vector field on the 3-sphere has a closed orbit. It is named after Herbert Seifert. In a 1950 paper, Seifert asked if such a vector field exists, but did not phrase non-existence as a conjecture. He also established the conjecture for perturbations of the Hopf fibration.

The conjecture was disproven in 1974 by Paul Schweitzer, who exhibited a $C^{1}$ counterexample. Schweitzer's construction was then modified by Jenny Harrison in 1988 to make a $C^{2 + δ}$ counterexample for some $δ > 0$ . The existence of smoother counterexamples remained an open question until 1993 when Krystyna Kuperberg constructed a very different $C^{\infty}$ counterexample. Later this construction was shown to have real analytic and piecewise linear versions.

References

V. Ginzburg and B. Gürel, A $C^{2}$ -smooth counterexample to the Hamiltonian Seifert conjecture in $R^{4}$ , Ann. of Math. (2) 158 (2003), no. 3, 953--976
J. Harrison, $C^{2}$ counterexamples to the Seifert conjecture, Topology 27 (1988), no. 3, 249--278.
G. Kuperberg A volume-preserving counterexample to the Seifert conjecture, Comment. Math. Helv. 71 (1996), no. 1, 70--97.
K. Kuperberg A smooth counterexample to the Seifert conjecture, Ann. of Math. (2) 140 (1994), no. 3, 723--732.
G. Kuperberg and K. Kuperberg, Generalized counterexamples to the Seifert conjecture, Ann. of Math. (2) 143 (1996), no. 3, 547--576.
H. Seifert, Closed integral curves in 3-space and isotopic two-dimensional deformations, Proc. Amer. Math. Soc. 1, (1950). 287--302.
P. A. Schweitzer, Counterexamples to the Seifert conjecture and opening closed leaves of foliations, Ann. of Math. (2) 100 (1974), 386--400.

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+In [[mathematics]], the '''Seifert conjecture''' states that every nonsingular, continuous [[vector field]] on the [[3-sphere]] has a closed orbit.  It is named after [[Herbert Seifert]].  In a 1950 paper, Seifert asked if such a vector field exists, but did not phrase non-existence as a conjecture.  He also established the conjecture for perturbations of the [[Hopf fibration]].
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+The conjecture was disproven in 1974 by [[Paul Schweitzer]], who exhibited a <math>C^1</math> counterexample.  Schweitzer's construction was then modified by [[Jenny Harrison]] in 1988 to make a <math>C^{2+\delta}</math> counterexample for some <math>\delta > 0</math>.  The existence of smoother counterexamples remained an open question until 1993 when [[Krystyna Kuperberg]] constructed a very different <math>C^\infty</math> counterexample.  Later this construction was shown to have real analytic and piecewise linear versions.
+==References==
+*V. Ginzburg and B. Gürel, ''[http://front.math.ucdavis.edu/math.DG/0110047 A <math>C^2</math>-smooth counterexample to the Hamiltonian Seifert conjecture in <math>R^4</math>]'',  Ann. of Math. (2) 158  (2003), no. 3, 953--976
+*J. Harrison,  ''<math>C^2</math> counterexamples to the Seifert conjecture'', Topology  27  (1988),  no. 3, 249--278.
+*G. Kuperberg ''A volume-preserving counterexample to the Seifert conjecture'', Comment. Math. Helv.  71  (1996),  no. 1, 70--97.
+*K. Kuperberg ''A smooth counterexample to the Seifert conjecture'', Ann. of Math. (2) 140 (1994), no. 3, 723--732.
+*G. Kuperberg and K. Kuperberg, ''[http://front.math.ucdavis.edu/math.DS/9802040 Generalized counterexamples to the Seifert conjecture]'',  Ann. of Math. (2)  143  (1996),  no. 3, 547--576.
+*H. Seifert, ''Closed integral curves in 3-space and isotopic two-dimensional  deformations'',  Proc. Amer. Math. Soc.  1,  (1950). 287--302.
+*P. A. Schweitzer, ''Counterexamples to the Seifert conjecture and opening closed leaves of  foliations'', Ann. of Math. (2)  100  (1974), 386--400.
+==Further reading==
+*K. Kuperberg, ''[http://www.ams.org/notices/199909/fea-kuperberg.pdf Aperiodic dynamical systems]''. Notices Amer. Math. Soc.  46  (1999),  no. 9, 1035--1040.
+[[Category:Differential topology]]
+[[Category:Conjectures]]
+[[Category:Disproved conjectures]]

Treynor ratio: Difference between revisions

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