Age, Biography and Wiki

Joel Lee Brenner was born on 2 August, 1912 in Boston, is an American mathematician. Discover Joel Lee Brenner'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 85 years old?

Popular As N/A
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Age 85 years old
Zodiac Sign Leo
Born 2 August, 1912
Birthday 2 August
Birthplace Boston
Date of death 14 November, 1997
Died Place Palo Alto, California
Nationality Russia

We recommend you to check the complete list of Famous People born on 2 August. He is a member of famous mathematician with the age 85 years old group.

Joel Lee Brenner Height, Weight & Measurements

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Joel Lee Brenner Net Worth

His net worth has been growing significantly in 2023-2024. So, how much is Joel Lee Brenner worth at the age of 85 years old? Joel Lee Brenner’s income source is mostly from being a successful mathematician. He is from Russia. We have estimated Joel Lee Brenner's net worth, money, salary, income, and assets.

Net Worth in 2024 $1 Million - $5 Million
Salary in 2024 Under Review
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Source of Income mathematician

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Timeline

1912

Joel Lee Brenner (August 2, 1912 – ) was an American mathematician who specialized in matrix theory, linear algebra, and group theory.

He is known as the translator of several popular Russian texts.

1930

In 1930 Brenner earned a B.A. degree with major in chemistry from Harvard University.

In graduate study there he was influenced by Hans Brinkmann, Garrett Birkhoff, and Marshall Stone.

Brenner later described some of his reminiscences of his student days at Harvard and of the state of American mathematics in the 1930s in an article for American Mathematical Monthly.

1931

In 1931 S. A. Gershgorin described geometric bounds on the eigenvectors in terms of the matrix elements.

This result known as the Gershgorin circle theorem has been used as a basis for extension.

1936

He was granted the Ph.D. in February 1936.

Joel Lee Brenner was a member of the American Mathematical Society from 1936.

Beasley relates that he

1951

In 1951 Brenner published his findings about matrices with quaternion entries.

He developed the idea of a characteristic root of a quaternion matrix (an eigenvalue) and shows that they must exist.

He also shows that a quaternion matrix is unitarily-equivalent to a triangular matrix.

1956

He was a teaching professor at some dozen colleges and universities and was a Senior Mathematician at Stanford Research Institute from 1956 to 1968.

He published over one hundred scholarly papers, 35 with coauthors, and wrote book reviews.

In 1956 he became a Senior Mathematician at Stanford Research Institute.

1959

Brenner, in collaboration with Donald W. Bushaw and S. Evanusa, assisted in the translation and revision of Felix Gantmacher's Applications of the Theory of Matrices (1959).

In 1959 Brenner generalized propositions by Alexander Ostrowski and G. B. Price on minors of a diagonally dominant matrix.

His work is credited with stimulating a reawakening of interest in the permanent of a matrix.

One of the challenges in linear algebra is to find the eigenvalues and eigenvectors of a square matrix of complex numbers.

1960

In 1960 Brenner proposed the following research problem in group theory: For which An does there exist an element an such that every element g is similar to a commutator of an? Brenner states that the property is true for 4 < n < 10; in symbols it may be expressed

1963

Brenner translated Nikolaj Nikolaevič Krasovskii's book Stability of motion: applications of Lyapunov's second method to differential systems and equations with delay (1963).

He also translated and edited the book Problems in differential equations by Aleksei Fedorovich Filippov.

Brenner translated Problems in Higher Algebra by D. K. Faddeev and I.S. Sominiski.

The exercises in this book covered complex numbers, roots of unity, as well as some linear algebra and abstract algebra.

1964

In 1964 Brenner reported on Theorems of Gersgorin Type.

1967

In 1967 at University of Wisconsin—Madison, working in the Mathematics Research Center, he produced a technical report New root-location theorems for partitioned matrices.

1968

In 1968 Brenner, following Alston Householder, published "Gersgorin theorems by Householder’s proof".

1970

In 1970 he published the survey article (21 references) "Gersgorin theorems, regularity theorems, and bounds for determinants of partitioned matrices".

The article was extended with "Some determinantal identities".

1971

In 1971 Brenner extended his geometry of the spectrum of a square complex matrix deeper into abstract algebra with his paper "Regularity theorems and Gersgorin theorems for matrices over rings with valuation".

He writes, "Theorems can be extended to non-commutative domains, in particular to quaternion matrices. Secondly, the ring of polynomials has a valuation ... a different type of regularity ..."

The alternating groups are simple groups, and in 1971 Brenner began a series of articles titled "Covering theorems for finite simple groups".

He was interested in the cycle type of cyclic permutations, and when An ⊂ C C, where C is a conjugacy class of a certain type.

1974

In the solution by Eric S. Rosenthal to a problem in the American Mathematical Monthly posted by Harry D. Ruderman, Kuhn's work from 1974 was cited.

A query was made and prompted an article by Brenner and Lyndon.

The version of the fundamental theorem stated was as follows:

Brenner ultimately acquired 35 coauthors in his publications.

Given an ordered set Ω with n elements, the even permutations on it determine the alternating group An.

1981

In 1981 Brenner and Roger Lyndon collaborated to polish an idea due to H. W. Kuhn for proving the fundamental theorem of algebra.