Age, Biography and Wiki
Thomas Royen was born on 6 July, 1947 in Frankfurt am Main, Germany, is a German statistician. Discover Thomas Royen's Biography, Age, Height, Physical Stats, Dating/Affairs, Family and career updates. Learn How rich is he in this year and how he spends money? Also learn how he earned most of networth at the age of 76 years old?
| Popular As |
Thomas Royen |
| Occupation |
N/A |
| Age |
76 years old |
| Zodiac Sign |
Cancer |
| Born |
6 July, 1947 |
| Birthday |
6 July |
| Birthplace |
Frankfurt am Main, Germany |
| Nationality |
Germany
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We recommend you to check the complete list of Famous People born on 6 July.
He is a member of famous with the age 76 years old group.
Thomas Royen Height, Weight & Measurements
At 76 years old, Thomas Royen height not available right now. We will update Thomas Royen's Height, weight, Body Measurements, Eye Color, Hair Color, Shoe & Dress size soon as possible.
| Physical Status |
| Height |
Not Available |
| Weight |
Not Available |
| Body Measurements |
Not Available |
| Eye Color |
Not Available |
| Hair Color |
Not Available |
Dating & Relationship status
He is currently single. He is not dating anyone. We don't have much information about He's past relationship and any previous engaged. According to our Database, He has no children.
| Family |
| Parents |
Not Available |
| Wife |
Not Available |
| Sibling |
Not Available |
| Children |
Not Available |
Thomas Royen Net Worth
His net worth has been growing significantly in 2023-2024. So, how much is Thomas Royen worth at the age of 76 years old? Thomas Royen’s income source is mostly from being a successful . He is from Germany. We have estimated Thomas Royen's net worth, money, salary, income, and assets.
| Net Worth in 2024 |
$1 Million - $5 Million |
| Salary in 2024 |
Under Review |
| Net Worth in 2023 |
Pending |
| Salary in 2023 |
Under Review |
| House |
Not Available |
| Cars |
Not Available |
| Source of Income |
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Thomas Royen Social Network
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| Wikipedia |
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Timeline
Thomas Royen (born 6 July 1947) is a retired German professor of statistics who has been affiliated with the University of Applied Sciences Bingen.
Royen was born in 1947 to Paul Royen, a professor with the institute for inorganic chemistry at the Goethe University Frankfurt and Elisabeth Royen, also a chemist.
From 1966 to 1971, he studied mathematics and physics at his father's university and the University of Freiburg.
After graduating, he worked as a tutor at the University of Freiburg, before transferring to the Technical University of Dortmund for his doctoral thesis.
After attaining his PhD in 1975 with a thesis called Über die Konvergenz gegen stabile Gesetze (On Convergence Against Stable Laws), he worked as a Wissenschaftlicher Assistent at Dortmund University's institute for statistics.
Married with children, Royen lives in Schwalbach am Taunus.
In 1977, Royen started working as a statistician for the pharmaceutical company Hoechst AG.
From 1979 to 1985, he worked at the company's own educational facility teaching mathematics and statistics.
Starting in 1985 until becoming an emeritus in 2010, he taught statistics and mathematics at the University of Applied Sciences Bingen in Rhineland-Palatinate.
Royen worked mainly on probability distributions, in particular multivariate chi-squares and gamma distributions, to improve some frequently used statistical test procedures.
Nearly half of his circa 30 publications were written when he was aged over sixty.
Because he was annoyed over some contradictory reviews and in a few cases also over the incompetence of a referee, he decided in his later years, when his actions had no influence anymore on his further career, to publish his papers on the online platform arXiv.org and sometimes in a less renowned Indian journal to fulfill, at least formally, the condition of a peer review.
On 17 July 2014, a few years after his retirement, when brushing his teeth, Royen had a flash of insight: how to use the Laplace transform of the multivariate gamma distribution to achieve a relatively simple proof for the Gaussian correlation inequality, a conjecture on the intersection of geometry, probability theory and statistics, formulated after work by Dunnett and Sobel (1955) and the American statistician Olive Jean Dunn (1958), that had remained unsolved since then.
He sent a copy of his proof to Donald Richards, an acquainted American mathematician, who had worked on a proof of the GCI for 30 years.
Richards immediately saw the validity of Royen's proof and subsequently helped him to transform the mathematical formulas into LaTeX.
When Royen contacted other reputed mathematicians, though, they didn't bother to investigate his proof, because Royen was relatively unknown, and these mathematicians therefore estimated the chance that Royen's proof would be false as very high.
Royen published this proof in an article with the title A simple proof of the Gaussian correlation conjecture extended to multivariate gamma distributions on arXiv and subsequently in the Far East Journal of Theoretical Statistics, a relatively unknown periodical based in Allahabad, India, for which Royen was at the time voluntarily working as a referee himself.
Due to this, his proof went at first largely unnoticed by the scientific community, until in late 2015 two Polish mathematicians, Rafał Latała and Dariusz Matlak, wrote a paper in which they reorganized Royen's proof in a way that was intended to be easier to follow.
In July 2015, Royen supplemented his proof with a further paper in arXiv Some probability inequalities for multivariate gamma and normal distributions.
Royen came to prominence in the spring of 2017 for a relatively simple proof for the Gaussian Correlation Inequality (GCI), a conjecture that originated in the 1950s, which he had published three years earlier without much recognition.
A proof of this conjecture, which lies at the intersection of geometry, probability theory and statistics, had eluded top experts for decades.
A 2017 article by Natalie Wolchover about Royen's proof in Quanta Magazine resulted in greater academic and public recognition for his achievement.
