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The | In [[mathematics]], '''Hall's conjecture''' is an open question, {{As of|2012|lc=on}}, on the differences between [[Square number|perfect squares]] and [[perfect cube]]s. It asserts that a perfect square ''y''<sup>2</sup> and a perfect cube ''x''<sup>3</sup> that are not equal must lie a substantial distance apart. This question arose from consideration of the [[Mordell equation]] in the theory of [[integer point]]s on [[elliptic curve]]s. | ||
The original version of Hall's conjecture, formulated by [[Marshall Hall, Jr.]] in 1970, says that there is a positive constant ''C'' such that for any integers ''x'' and ''y'' for which ''y''<sup>2</sup> ≠ ''x''<sup>3</sup>, | |||
:<math> |y^2 - x^3| > C\sqrt{|x|}.</math> | |||
Hall suggested that perhaps ''C'' could be taken as 1/5, which was consistent with all the data known at the time the conjecture was proposed. Danilov showed in 1982 that the exponent 1/2 on the right side (that is, the use of |''x''|<sup>1/2</sup>) can't be replaced by any higher power: for no δ > 0 is there a constant ''C'' such that |''y''<sup>2</sup> - ''x''<sup>3</sup>| > C|''x''|<sup>1/2 + δ</sup> whenever ''y''<sup>2</sup> ≠ ''x''<sup>3</sup>. | |||
In 1965, Davenport proved an analogue of the above conjecture in the case of polynomials: | |||
if ''f''(''t'') and ''g''(''t'') are nonzero polynomials over '''C''' such that | |||
''g''(''t'')<sup>3</sup> ≠ ''f''(''t'')<sup>2</sup> in '''C'''[''t''], then | |||
:<math> \deg(g(t)^2 - f(t)^3) \geq \frac{1}{2}\deg f(t) + 1.</math> | |||
The ''weak'' form of Hall's conjecture, due to Stark and Trotter around 1980, replaces the square root on the right side of the inequality by any exponent ''less'' than 1/2: for any ''ε'' > 0, there is some constant ''c''(ε) depending on ε such that for any integers ''x'' and ''y'' for which ''y''<sup>2</sup> ≠ ''x''<sup>3</sup>, | |||
:<math> |y^2 - x^3| > c(\varepsilon) x^{1/2-\varepsilon}.</math> | |||
The original, ''strong'', form of the conjecture with exponent 1/2 has never been disproved, although it is no longer believed to be true and the term ''Hall's conjecture'' now generally means the version with the ε in it. For example, in 1998 Elkies found the example | |||
447884928428402042307918<sup>2</sup> - 5853886516781223<sup>3</sup> = -1641843, | |||
for which compatibility with Hall's conjecture would require ''C'' to be less than .0214 ≈ 1/50, so roughly 10 times smaller than the original choice of 1/5 that Hall suggested. | |||
The weak form of Hall's conjecture would follow from the [[ABC conjecture]].<ref>{{cite book | last=Schmidt | first=Wolfgang M. | authorlink=Wolfgang M. Schmidt | title=Diophantine approximations and Diophantine equations | series=Lecture Notes in Mathematics | volume=1467 | publisher=[[Springer-Verlag]] | year=1996 | edition=2nd | isbn=3-540-54058-X | zbl=0754.11020 | pages=205–206 }}</ref> A generalization to other perfect powers is [[Pillai's conjecture]]. | |||
==Notes== | |||
{{reflist}} | |||
==References== | |||
* {{cite book |last=Guy | first=Richard K. | authorlink=Richard K. Guy | title=Unsolved problems in number theory | publisher=[[Springer-Verlag]] |edition=3rd | year=2004 |isbn=978-0-387-20860-2 | zbl=1058.11001 | at=D9 }} | |||
* {{cite book| last=Hall, Jr. | first=Marshall | year=1971 | chapter=The Diophantine equation ''x''<sup>3</sup> - ''y''<sup>2</sup> = ''k'' | pages=173–198 | title=Computers in Number Theory | editor1-first=A.O.L. | editor1-last=Atkin | editor1-link=A. O. L. Atkin | editor2-first=B. J. |editor2-last=Birch | editor2-link=Bryan John Birch | isbn=0-12-065750-3 | zbl=0225.10012}} | |||
==External links== | |||
* [http://www.math.harvard.edu/~elkies/hall.html], page of [[Noam Elkies]] on the problem. | |||
* [http://ijcalvo.galeon.com/hall.htm], table of ''good examples'' of ''Marshall Hall's conjecture'' by Ismael Jimenez Calvo. | |||
[[Category:Number theory]] | |||
[[Category:Conjectures]] | |||
Revision as of 00:06, 11 December 2013
In mathematics, Hall's conjecture is an open question, Template:As of, on the differences between perfect squares and perfect cubes. It asserts that a perfect square y2 and a perfect cube x3 that are not equal must lie a substantial distance apart. This question arose from consideration of the Mordell equation in the theory of integer points on elliptic curves.
The original version of Hall's conjecture, formulated by Marshall Hall, Jr. in 1970, says that there is a positive constant C such that for any integers x and y for which y2 ≠ x3,
Hall suggested that perhaps C could be taken as 1/5, which was consistent with all the data known at the time the conjecture was proposed. Danilov showed in 1982 that the exponent 1/2 on the right side (that is, the use of |x|1/2) can't be replaced by any higher power: for no δ > 0 is there a constant C such that |y2 - x3| > C|x|1/2 + δ whenever y2 ≠ x3.
In 1965, Davenport proved an analogue of the above conjecture in the case of polynomials: if f(t) and g(t) are nonzero polynomials over C such that g(t)3 ≠ f(t)2 in C[t], then
The weak form of Hall's conjecture, due to Stark and Trotter around 1980, replaces the square root on the right side of the inequality by any exponent less than 1/2: for any ε > 0, there is some constant c(ε) depending on ε such that for any integers x and y for which y2 ≠ x3,
The original, strong, form of the conjecture with exponent 1/2 has never been disproved, although it is no longer believed to be true and the term Hall's conjecture now generally means the version with the ε in it. For example, in 1998 Elkies found the example
4478849284284020423079182 - 58538865167812233 = -1641843,
for which compatibility with Hall's conjecture would require C to be less than .0214 ≈ 1/50, so roughly 10 times smaller than the original choice of 1/5 that Hall suggested.
The weak form of Hall's conjecture would follow from the ABC conjecture.[1] A generalization to other perfect powers is Pillai's conjecture.
Notes
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References
- 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534
External links
- [1], page of Noam Elkies on the problem.
- [2], table of good examples of Marshall Hall's conjecture by Ismael Jimenez Calvo.
- ↑ 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534