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[[File:Thomas_Joannes_Stieltjes.jpg|thumb|Thomas Joannes Stieltjes.]]'''Thomas Joannes Stieltjes''' (29 December 1856 – 31 December 1894) was a Dutch [[Mathematician (nonfiction)|mathematician]]. He was born in Zwolle and died in Toulouse, France. He was a pioneer in the field of moment problems and contributed to the study of continued fractions.
[[File:Thomas_Joannes_Stieltjes.jpg|thumb|Thomas Joannes Stieltjes.]]'''Thomas Joannes Stieltjes''' (29 December 1856 – 31 December 1894) was a Dutch [[Mathematician (nonfiction)|mathematician]]. He was a pioneer in the field of moment problems and contributed to the study of continued fractions. The Thomas Stieltjes Institute for Mathematics at Leiden University, dissolved in 2011, was named after him, as is the [[Riemann–Stieltjes integral (nonfiction)|Riemann–Stieltjes integral]].


The Thomas Stieltjes Institute for Mathematics at the University of Leiden, dissolved in 2011, was named after him, as is the Riemann–Stieltjes integral.
== Biography ==


Stieltjes began a correspondence with [[Charles Hermite (nonfiction)|Charles Hermite]] which lasted for the rest of his life. Stieltjes originally wrote to Hermite concerning celestial mechanics, but the subject quickly turned to mathematics and he began to devote his spare time to mathematical research.
Stieltjes was born in Zwolle on 29 December 1856. His father (who had the same first names) was a civil engineer and politician. Stieltjes Sr. was responsible for the construction of various harbors around Rotterdam, and also seated in the Dutch parliament. Stieltjes Jr. went to university at the Polytechnical School in Delft in 1873. Instead of attending lectures, he spent his student years reading the works of [[Carl Friedrich Gauss (nonfiction)|Carl Friedrich Gauss]] and [[Carl Gustav Jacob Jacobi (nonfiction)|Carl Gustav Jacob Jacobi]] the consequence of this being he failed his examinations. There were 2 further failures (in 1875 and 1876), and his father despaired. His father was friends with [[H. G. van de Sande Bakhuyzen (nonfiction)|H. G. van de Sande Bakhuyzen]] (who was the director of Leiden University), and Stieltjes Jr. was able to get a job as an assistant at Leiden Observatory.


Stieltjes worked on almost all branches of analysis, continued fractions and number theory, and for his work, he is sometimes called "the father of the analytic theory of continued fractions".
Soon afterwards, Stieltjes began a correspondence with [[Charles Hermite (nonfiction)|Charles Hermite]] which lasted for the rest of his life. Stieltjes originally wrote to Hermite concerning celestial mechanics, but the subject quickly turned to mathematics and he began to devote his spare time to mathematical research.


His work is also seen as important as a first step towards the theory of Hilbert spaces. Other important contributions to mathematics that he made involved discontinuous functions and divergent series, differential equations, interpolation, the gamma function and elliptic functions.
The director of Leiden Observatory, van de Sande-Bakhuyzen, responded quickly to Stieltjes' request on 1 January 1883 to stop his observational work to allow him to work more on mathematical topics. He married [[Elizabeth Intveld (nonfiction)|Elizabeth Intveld]] in May 1883. She also encouraged him to move from astronomy to mathematics. And in September, Stieltjes was asked to substitute at University of Delft for F J van den Berg. From then until December of that year, he lectured on [[Analytical geometry (nonfiction)|analytical geometry]] and on [[Descriptive geometry (nonfiction)|descriptive geometry]]. He resigned his post at the observatory at the end of that year.
 
In 1884, Stieltjes applied for a chair in Groningen. He was initially accepted, but in the end turned down by the Department of Education, since he lacked the required diplomas. In 1884, Hermite and professor [[David Bierens de Haan (nonfiction)|David Bierens de Haan]] arranged for an honorary doctorate to be granted to Stieltjes by Leiden University, enabling him to become a professor. In 1885, he was appointed as member of the Royal Dutch Academy of Sciences (Koninklijke Nederlandse Akademie van Wetenschappen, KNAW), the next year he became foreign member.[1] In 1889, he was appointed professor of differential and integral calculus at Toulouse University.
 
== Research ==
 
Stieltjes worked on almost all branches of analysis, [[Continued fraction (nonfiction)|continued fractions]], and [[Number theory (nonfiction)|number theory]], and for his work, he is sometimes called "the father of the analytic theory of continued fractions".
 
His work is also seen as important as a first step towards the theory of [[Hilbert spaces (nonfiction)|Hilbert space]]. Other important contributions to mathematics that he made involved [[Discontinuous function (nonfiction)|discontinuous functions]] and [[Divergent series (nonfiction)|divergent series]], [[Differential equation (nonfiction)|differential equations]], [[Interpolation (nonfiction)|interpolation]], the [[Gamma function (nonfiction)|gamma function]], and [[Elliptic function (nonfiction)|elliptic functions]]. He became known internationally because of the [[Riemann–Stieltjes integral (nonfiction)|Riemann–Stieltjes integral]].
 
== Awards ==
 
Stieltjes' work on continued fractions earned him the [[Ormoy Prize (nonfiction)|Ormoy Prize]] of the Académie des Sciences.


== In the News ==
== In the News ==


<gallery mode="traditional" widths="200px" heights="200px">
<gallery>
File:Charles Hermite circa 1901.jpg|Link=Charles Hermite (nonfiction)|[[Charles Hermite (nonfiction)|Hermite]]: "I turn with terror and horror from this lamentable scourge of continuous functions with no derivatives."
File:Charles Hermite circa 1901.jpg|link=Charles Hermite (nonfiction)|[[Charles Hermite (nonfiction)|Hermite]]: "I turn with terror and horror from this lamentable scourge of continuous functions with no derivatives."
</gallery>
</gallery>


== Fiction cross-reference ==
== Fiction cross-reference ==
* [[Crimes against mathematical constants]]
* [[Gnomon algorithm]]
* [[Mathematics]]


== Nonfiction cross-reference ==
== Nonfiction cross-reference ==


* [[Charles Hermite (nonfiction)]]
* [[Jean Gaston Darboux (nonfiction)]] - Doctoral advisor
* [[Charles Hermite (nonfiction)]] - Doctoral advisor
* [[Lebesgue–Stieltjes integral (nonfiction)]]
* [[Laplace–Stieltjes transform (nonfiction)]]
* [[Riemann–Stieltjes integral (nonfiction)]]
* [[Stieltjes matrix (nonfiction)]]
* [[Stieltjes moment problem (nonfiction)]]
* [[Stieltjes transformation (nonfiction)]] (and Stieltjes inversion formula)
* [[Stieltjes–Wigert polynomials (nonfiction)]]
* [[Chebyshev–Markov–Stieltjes inequalities (nonfiction)]]
* [[Annales de la Faculté des Sciences de Toulouse (nonfiction)]] co-founded by Stieltjes


External links:
== External links ==


* [https://en.wikipedia.org/wiki/Thomas_Joannes_Stieltjes Thomas Joannes Stieltjes] @ Wikipedia
* [https://en.wikipedia.org/wiki/Thomas_Joannes_Stieltjes Thomas Joannes Stieltjes] @ Wikipedia

Latest revision as of 04:23, 31 December 2020

Thomas Joannes Stieltjes.

Thomas Joannes Stieltjes (29 December 1856 – 31 December 1894) was a Dutch mathematician. He was a pioneer in the field of moment problems and contributed to the study of continued fractions. The Thomas Stieltjes Institute for Mathematics at Leiden University, dissolved in 2011, was named after him, as is the Riemann–Stieltjes integral.

Biography

Stieltjes was born in Zwolle on 29 December 1856. His father (who had the same first names) was a civil engineer and politician. Stieltjes Sr. was responsible for the construction of various harbors around Rotterdam, and also seated in the Dutch parliament. Stieltjes Jr. went to university at the Polytechnical School in Delft in 1873. Instead of attending lectures, he spent his student years reading the works of Carl Friedrich Gauss and Carl Gustav Jacob Jacobi — the consequence of this being he failed his examinations. There were 2 further failures (in 1875 and 1876), and his father despaired. His father was friends with H. G. van de Sande Bakhuyzen (who was the director of Leiden University), and Stieltjes Jr. was able to get a job as an assistant at Leiden Observatory.

Soon afterwards, Stieltjes began a correspondence with Charles Hermite which lasted for the rest of his life. Stieltjes originally wrote to Hermite concerning celestial mechanics, but the subject quickly turned to mathematics and he began to devote his spare time to mathematical research.

The director of Leiden Observatory, van de Sande-Bakhuyzen, responded quickly to Stieltjes' request on 1 January 1883 to stop his observational work to allow him to work more on mathematical topics. He married Elizabeth Intveld in May 1883. She also encouraged him to move from astronomy to mathematics. And in September, Stieltjes was asked to substitute at University of Delft for F J van den Berg. From then until December of that year, he lectured on analytical geometry and on descriptive geometry. He resigned his post at the observatory at the end of that year.

In 1884, Stieltjes applied for a chair in Groningen. He was initially accepted, but in the end turned down by the Department of Education, since he lacked the required diplomas. In 1884, Hermite and professor David Bierens de Haan arranged for an honorary doctorate to be granted to Stieltjes by Leiden University, enabling him to become a professor. In 1885, he was appointed as member of the Royal Dutch Academy of Sciences (Koninklijke Nederlandse Akademie van Wetenschappen, KNAW), the next year he became foreign member.[1] In 1889, he was appointed professor of differential and integral calculus at Toulouse University.

Research

Stieltjes worked on almost all branches of analysis, continued fractions, and number theory, and for his work, he is sometimes called "the father of the analytic theory of continued fractions".

His work is also seen as important as a first step towards the theory of Hilbert space. Other important contributions to mathematics that he made involved discontinuous functions and divergent series, differential equations, interpolation, the gamma function, and elliptic functions. He became known internationally because of the Riemann–Stieltjes integral.

Awards

Stieltjes' work on continued fractions earned him the Ormoy Prize of the Académie des Sciences.

In the News

Fiction cross-reference

Nonfiction cross-reference

External links