Age, Biography and Wiki
László Pyber was born on 8 May, 1960, is a mathematician. Discover László Pyber'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 63 years old?
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64 years old |
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Taurus |
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8 May 1960 |
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8 May |
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We recommend you to check the complete list of Famous People born on 8 May.
He is a member of famous mathematician with the age 64 years old group.
László Pyber Height, Weight & Measurements
At 64 years old, László Pyber height not available right now. We will update László Pyber's Height, weight, Body Measurements, Eye Color, Hair Color, Shoe & Dress size soon as possible.
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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.
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László Pyber Net Worth
His net worth has been growing significantly in 2022-2023. So, how much is László Pyber worth at the age of 64 years old? László Pyber’s income source is mostly from being a successful mathematician. He is from . We have estimated
László Pyber's net worth
, money, salary, income, and assets.
| Net Worth in 2023 |
$1 Million - $5 Million |
| Salary in 2023 |
Under Review |
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Pending |
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Under Review |
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mathematician |
László Pyber Social Network
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Timeline
In 2017, he was the recipient of an ERC Advanced Grant.
In 2016, Pyber and Endre Szabó proved that in a finite simple group L of Lie type, a generating set A of L either grows, i.e., |A| ≥ |A| for some ε depending only on the Lie rank of L, or A=L. This implies that diameters of Cayley graphs of finite simple groups of bounded rank are polylogarithmic in the size of the group, partially resolving a well-known conjecture of László Babai.
In 2011, Pyber and Andrei Jaikin-Zapirain obtained a surprisingly explicit formula for the number of random elements needed to generate a finite d-generator group with high probability. They also explored related questions for profinite groups and settled several open problems.
In 2007, he was awarded the Academics Prize by the Hungarian Academy of Sciences.
In 2004, Pyber settled several questions in subgroup growth by completing the investigation of the spectrum of possible subgroup growth types.
He has also contributed to the study of permutation groups. In 1993, he provided an upper bound for the order of a 2-transitive group of degree n not containing An avoiding the use of the classification of finite simple groups. Together with Tomasz Łuczak, Pyber proved the conjecture of McKay that for every ε>0, there is a constant C such that C randomly chosen elements invariably generate the symmetric group Sn with probability greater than 1-ε.
Pyber has made fundamental contributions in enumerating finite groups of a given order n. In 1993, he proved that if the prime power decomposition of n is n=p1 ⋯ pk and μ=max(g1,...,gk), then the number of groups of order n is at most
Pyber received his Ph.D. from the Hungarian Academy of Sciences in 1989 under the direction of László Lovász and Gyula O.H. Katona with the thesis Extremal Structures and Covering Problems.
Pyber has solved a number of conjectures in graph theory. In 1985, he proved the conjecture of Paul Erdős and Tibor Gallai that edges of a simple graph with n vertices can be covered with at most n-1 circuits and edges. In 1986, he proved the conjecture of Paul Erdős that a graph with n vertices and its complement can be covered with n/4+2 cliques.
László Pyber (born 8 May 1960 in Budapest) is a Hungarian mathematician. He is a researcher at the Alfréd Rényi Institute of Mathematics, Budapest. He works in combinatorics and group theory.
