László Pyber

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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.

Biography[edit]

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.^[1]

In 2007, he was awarded the Academics Prize by the Hungarian Academy of Sciences.^[2]

In 2017, he was the recipient of an ERC Advanced Grant.^[3]

Mathematical contributions[edit]

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.^[4] In 1986, he proved the conjecture of Paul Erdős that a graph with n vertices and its complement can be covered with n²/4+2 cliques.^[5]

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 A_n avoiding the use of the classification of finite simple groups.^[6] 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 S_n with probability greater than 1-ε.^[7]

Pyber has made fundamental contributions in enumerating finite groups of a given order n. In 1993, he proved^[8] that if the prime power decomposition of n is n=p₁^g₁ ⋯ p_k^g_k and μ=max(g₁,...,g_k), then the number of groups of order n is at most

${\displaystyle n^{({\frac {2}{27}}+o(1))\mu ^{2}}.}$

In 2004, Pyber settled several questions in subgroup growth by completing the investigation of the spectrum of possible subgroup growth types.^[9]

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.^[10] They also explored related questions for profinite groups and settled several open problems.

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., |A³| ≥ |A|^1+ε for some ε depending only on the Lie rank of L, or A³=L.^[11] 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.

References[edit]

External links[edit]

• Pyber's home page.
• Pyber's nomination for Hungarian Academy of Sciences membership
• László Pyber at the Mathematics Genealogy Project