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Mean value problem

From Wikipedia, the free encyclopedia

In mathematics, the mean value problem was posed by Stephen Smale in 1981.[1] This problem is still open in full generality. The problem asks:

For a given complex polynomial of degree [2]A and a complex number , is there a critical point of (i.e. ) such that

It was proved for .[1] For a polynomial of degree the constant has to be at least from the example , therefore no bound better than can exist.

Partial results

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The conjecture is known to hold in special cases; for other cases, the bound on could be improved depending on the degree , although no absolute bound is known that holds for all .

In 1989, Tischler showed that the conjecture is true for the optimal bound if has only real roots, or if all roots of have the same norm.[3][4]

In 2007, Conte et al. proved that ,[2] slightly improving on the bound for fixed .

In the same year, Crane showed that for .[5]

Considering the reverse inequality, Dubinin and Sugawa have proven that (under the same conditions as above) there exists a critical point such that .[6]

The problem of optimizing this lower bound is known as the dual mean value problem.[7]

See also

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Notes

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A.^ The constraint on the degree is used but not explicitly stated in Smale (1981); it is made explicit for example in Conte (2007). The constraint is necessary. Without it, the conjecture would be false: The polynomial f(z) = z does not have any critical points.

References

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  1. ^ a b Smale, S. (1981). "The Fundamental Theorem of Algebra and Complexity Theory" (PDF). Bulletin of the American Mathematical Society. New Series. 4 (1): 1–36. doi:10.1090/S0273-0979-1981-14858-8. Retrieved 23 October 2017.
  2. ^ a b Conte, A.; Fujikawa, E.; Lakic, N. (20 June 2007). "Smale's mean value conjecture and the coefficients of univalent functions" (PDF). Proceedings of the American Mathematical Society. 135 (10): 3295–3300. doi:10.1090/S0002-9939-07-08861-2. Retrieved 23 October 2017.
  3. ^ Tischler, D. (1989). "Critical Points and Values of Complex Polynomials". Journal of Complexity. 5 (4): 438–456. doi:10.1016/0885-064X(89)90019-8.
  4. ^ Smale, Steve. "Mathematical Problems for the Next Century" (PDF).
  5. ^ Crane, E. (22 August 2007). "A bound for Smale's mean value conjecture for complex polynomials" (PDF). Bulletin of the London Mathematical Society. 39 (5): 781–791. doi:10.1112/blms/bdm063. S2CID 59416831. Retrieved 23 October 2017.
  6. ^ Dubinin, V.; Sugawa, T. (2009). "Dual mean value problem for complex polynomials". Proceedings of the Japan Academy, Series A, Mathematical Sciences. 85 (9): 135–137. arXiv:0906.4605. Bibcode:2009arXiv0906.4605D. doi:10.3792/pjaa.85.135. S2CID 12020364. Retrieved 23 October 2017.
  7. ^ Ng, T.-W.; Zhang, Y. (2016). "Smale's mean value conjecture for finite Blaschke products". The Journal of Analysis. 24 (2): 331–345. arXiv:1609.00170. Bibcode:2016arXiv160900170N. doi:10.1007/s41478-016-0007-4. S2CID 56272500.