Rodion Kuzmin

Rodion Kuzmin
Rodion Kuzmin
	Rodion Kusmin, circa 1926
Born	9 October 1891; Riabye village in the Haradok district
Died	March 24, 1949 (aged 57); Leningrad
Nationality	Russian
Alma mater	Saint Petersburg State University nee Petrograd University
Known for	Gauss–Kuzmin distribution, number theory and mathematical analysis.
	Scientific career
Fields	Mathematics
Institutions	Perm State University, Tomsk Polytechnic University, Saint Petersburg State Polytechnical University
Doctoral advisor	James Victor Uspensky

Rodion Osievich Kuzmin (Russian: Родион Осиевич Кузьмин, Nov. 9, 1891, Riabye village in the Haradok district – March 24, 1949, Leningrad) was a Russian mathematician, known for his works in number theory and analysis.[1] His name is sometimes transliterated as Kusmin. He was an Invited Speaker of the ICM in 1928 in Bologna.[2]

Selected results

In 1928, Kuzmin solved[3] the following problem due to Gauss (see Gauss–Kuzmin distribution): if x is a random number chosen uniformly in (0, 1), and

x={\frac {1}{k_{1}+{\frac {1}{k_{2}+\cdots }}}}

is its continued fraction expansion, find a bound for

\Delta _{n}(s)=\mathbb {P} \left\{x_{n}\leq s\right\}-\log _{2}(1+s),

where

x_{n}={\frac {1}{k_{n+1}+{\frac {1}{k_{n+2}+\cdots }}}}.

Gauss showed that Δ_n tends to zero as n goes to infinity, however, he was unable to give an explicit bound. Kuzmin showed that

|\Delta _{n}(s)|\leq Ce^{-\alpha {\sqrt {n}}}~,

where C,α > 0 are numerical constants. In 1929, the bound was improved to C 0.7ⁿ by Paul Lévy.

In 1930, Kuzmin proved[4] that numbers of the form a^b, where a is algebraic and b is a real quadratic irrational, are transcendental. In particular, this result implies that Gelfond–Schneider constant

2^{\sqrt {2}}=2.6651441426902251886502972498731\ldots

is transcendental. See Gelfond–Schneider theorem for later developments.

He is also known for the Kusmin-Landau inequality: If $f$ is continuously differentiable with monotonic derivative $f'$ satisfying $\Vert f'(x)\Vert \geq \lambda >0$ (where $\Vert \cdot \Vert$ denotes the Nearest integer function) on a finite interval $I$ , then

\sum _{n\in I}e^{2\pi if(n)}\ll \lambda ^{-1}.

Notes

Venkov, B. A.; Natanson, I. P. "R. O. Kuz'min (1891–1949) (obituary)". Uspekhi Matematicheskikh Nauk. 4 (4): 148–155.
Kuzmin, R. "Sur un problème de Gauss." In Atti del Congresso Internazionale dei Matematici: Bologna del 3 al 10 de settembre di 1928, vol. 6, pp. 83–90. 1929.
Kuzmin, R.O. (1928). "On a problem of Gauss". Dokl. Akad. Nauk SSSR: 375–380.
Kuzmin, R. O. (1930). "On a new class of transcendental numbers". Izvestiya Akademii Nauk SSSR (math.). 7: 585–597.

External links

Rodion Kuzmin at the Mathematics Genealogy Project (The chronology there is apparently wrong, since J. V. Uspensky lived in USA from 1929.)

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[1] Venkov, B. A.; Natanson, I. P. "R. O. Kuz'min (1891–1949) (obituary)". Uspekhi Matematicheskikh Nauk. 4 (4): 148–155.

[2] Kuzmin, R. "Sur un problème de Gauss." In Atti del Congresso Internazionale dei Matematici: Bologna del 3 al 10 de settembre di 1928, vol. 6, pp. 83–90. 1929.

[3] Kuzmin, R.O. (1928). "On a problem of Gauss". Dokl. Akad. Nauk SSSR: 375–380.

[4] Kuzmin, R. O. (1930). "On a new class of transcendental numbers". Izvestiya Akademii Nauk SSSR (math.). 7: 585–597.