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Stephen Rallis was born on 17 May, 1942 in Bennington, Vermont, is a Stephen James Rallis was mathematician. Discover Stephen Rallis'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 69 years old?

Popular As Stephen Rallis
Occupation N/A
Age 69 years old
Zodiac Sign Taurus
Born 17 May, 1942
Birthday 17 May
Birthplace Bennington, Vermont
Date of death 17 April, 2012
Died Place N/A
Nationality Vermont

We recommend you to check the complete list of Famous People born on 17 May. He is a member of famous mathematician with the age 69 years old group.

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Stephen Rallis Net Worth

His net worth has been growing significantly in 2023-2024. So, how much is Stephen Rallis worth at the age of 69 years old? Stephen Rallis’s income source is mostly from being a successful mathematician. He is from Vermont. We have estimated Stephen Rallis's net worth, money, salary, income, and assets.

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

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Timeline

1942

Stephen James Rallis (May 17, 1942 – April 17, 2012) was an American mathematician who worked on group representations, automorphic forms, the Siegel–Weil formula, and Langlands L-functions.

1964

Rallis received a B.A. in 1964 from Harvard University, a Ph.D. in 1968 from the Massachusetts Institute of Technology, and spent 1968–1970 at the Institute for Advanced Study in Princeton.

1970

Beginning in the 1970s, Rallis and Gérard Schiffmann wrote a series of papers on the Weil representation.

This led to Rallis's work with Kudla in which they developed a far-reaching generalization of the Siegel–Weil formula: the regularized Siegel–Weil formula and the first term identity.

These results have prompted other mathematicians to extend Siegel–Weil to other cases.

1977

After two years at Stony Brook, two years at Universite de Strasbourg, and several visiting positions, he joined the faculty at Ohio State University in 1977 and stayed there for the rest of his career.

1984

Rallis' 1984 paper giving proofs of certain examples of the Howe duality conjecture was the start of his work on what is now known as "The Rallis Inner Product Formula" which relates the inner product of a pair of theta functions to a special value or residue of a Langlands L-function.

This cornerstone of what Wee Teck Gan et al. term the Rallis program on the theta correspondence has found wide applications.

Rallis then adapted the classical idea of doubling a quadratic space to create the "Piatetski–Shapiro and Rallis Doubling Method" for constructing integral representations of L-functions, and thus they obtained the first general result on L-functions for all classical groups.

Also, using the "Rallis tower property" from his 1984 paper on the Howe duality conjecture, Rallis with Ginzburg and Soudry studied global exceptional correspondences and found new examples of functorial lifts.

1990

The 1990 Wolf Prize to Piatetski–Shapiro cites this work with Rallis as one of Piatetski–Shapiro's main achievements.

In 1990, Rallis gave an invited address on his work "Poles of Standard L-functions" at the 1990 International Congress of Mathematicians in Kyoto.

1992

Whereas it had previously been assumed that all the L-functions constructed by the Rankin–Selberg integral method were a subset of those constructed by the Langlands–Shahidi method, the 1992 paper by Rallis with Piatetski-Shapiro and Schiffmann on the Rankin–Selberg integrals for the group G_2 showed this was not the case and opened the way for determining many new examples of L-functions represented by Rankin–Selberg integrals.

The L-functions studied by Rallis are important because of their connections with the Langlands functoriality conjecture.

Rallis with David Soudry and David Ginzburg wrote a series of papers culminating in their book "The descent map from automorphic representations of GL(n) to classical groups".

Their automorphic descent method constructs an explicit inverse map to the (standard) Langlands functorial lift and has had major applications to the analysis of functoriality.

2003

In 2003, the conference "Automorphic Representations, L-Functions and Applications: Progress and Prospects" was held in honor of Rallis's 60th birthday and according to the conference proceedings, "reflects the depth and breadth of Rallis's influence".

2004

In a series of papers between 2004 and 2009, David Ginzburg, Dihua Jiang, and Stephen Rallis proved one direction of the global Gan–Gross–Prasad conjecture.

Rallis's ideas had a significant and lasting impact on the theory of automorphic forms.

His mathematical life was characterized by several long term collaborations with several mathematicians including Stephen Kudla, Herve Jacquet, and Ilya Piatetski-Shapiro.

2015

In January, 2015, the Journal of Number Theory published a special issue in honor of Steve Rallis's contributions to mathematics.

Rallis has the distinction of having his biography included in the MacTutor History of Mathematics archive.