Výsledky vyhledávání - "Giorgis Petridis"

Akademický článek

Publikováno v: Discrete Analysis (2021)

A question of Bukh on sums of dilates, Discrete Analysis 2021:13, 21 pp. Let $A$ and $B$ be subsets of an Abelian group. Their sumset $A+B$ is defined to be the set of all $a+b$ such that $a\in A$ and $b\in B$. Many questions in additive combinatori

Externí odkaz: https://doaj.org/article/0e27120813d34557b7af7cc1aa578c19

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Akademický článek

Products of Differences over Arbitrary Finite Fields

Autor: Brendan Murphy, Giorgis Petridis

Publikováno v: Discrete Analysis (2018)

Products of Differences over Arbitrary Finite Fields, Discrete Analysis 2018:18, 42 pp. A central problem in arithmetic combinatorics is the Erdős-Szemerédi sum-product problem, which asks whether it is true that if $A$ is a finite set of integers

Externí odkaz: https://doaj.org/article/a88eb8b4abb54a9da1cefa2c9532002a

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An Energy Bound in the Affine Group

Autor: Misha Rudnev, Giorgis Petridis, Audie Warren, Oliver Roche-Newton

Publikováno v: International Mathematics Research Notices. 2022:1154-1172

We prove a nontrivial energy bound for a finite set of affine transformations over a general field and discuss a number of implications. These include new bounds on growth in the affine group, a quantitative version of a theorem by Elekes about rich

Externí odkaz: https://explore.openaire.eu/search/publication?articleId=doi_dedup___::677e32ef297aa8e73ce26667ad9264f8
https://doi.org/10.1093/imrn/rnaa130

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Bounds of Trilinear and Trinomial Exponential Sums

Autor: Giorgis Petridis, Igor E. Shparlinski, Simon Macourt, Ilya D. Shkredov

Publikováno v: SIAM Journal on Discrete Mathematics. 34:2124-2136

We prove, for a sufficiently small subset $\mathcal{A}$ of a prime residue field, an estimate on the number of solutions to the equation $(a_1-a_2)(a_3-a_4) = (a_5-a_6)(a_7-a_8)$ with all variables in $\mathcal{A}$. We then derive new bounds on trili

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https://doi.org/10.1137/20m1325502

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Bounds of Trilinear and Quadrilinear Exponential Sums

Autor: Giorgis Petridis, Igor E. Shparlinski

Publikováno v: Journal d'Analyse Mathématique. 138:613-641

We use an estimate of Aksoy Yazici, Murphy, Rudnev and Shkredov (2016) on the number of solutions of certain equations involving products and differences of sets in prime finite fields to give an explicit upper bound on trilinear exponential sums whi

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https://doi.org/10.1007/s11854-019-0028-4

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On the Pinned Distances Problem in Positive Characteristic

Autor: Brendan Murphy, Giorgis Petridis, Thang Pham, Misha Rudnev, Sophie Stevens

We study the Erd\H os-Falconer distance problem for a set $A\subset \mathbb{F}^2$, where $\mathbb{F}$ is a field of positive characteristic $p$. If $\mathbb{F}=\mathbb{F}_p$ and the cardinality $|A|$ exceeds $p^{5/4}$, we prove that $A$ determines an

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http://arxiv.org/abs/2003.00510

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10. Pseudorandomness of large sets in finite fields

Autor: Giorgis Petridis

Publikováno v: Combinatorics and Finite Fields

Externí odkaz: https://explore.openaire.eu/search/publication?articleId=doi_________::677951879adf92e58290437d9e7d1bb9
https://doi.org/10.1515/9783110642094-010

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Refined Estimates Concerning Sumsets Contained in the Roots of Unity

Autor: Giorgis Petridis, Brandon Hanson

We prove that the clique number of the Paley graph is at most $\sqrt{p/2} + 1$, and that any supposed additive decompositions of the set of quadratic residues can only come from co-Sidon sets.
7 pages. The second version already included a corol

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http://arxiv.org/abs/1905.09134

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Bisectors and pinned distances

Autor: Ben Lund, Giorgis Petridis

We prove, under suitable conditions, a lower bound on the number of pinned distances determined by small subsets of two-dimensional vector spaces over fields. For finite subsets of the Euclidean plane we prove an upper bound for their bisector energy

Externí odkaz: https://explore.openaire.eu/search/publication?articleId=doi_dedup___::333c9bf319132e925d03a31be4b7a1e8
http://arxiv.org/abs/1810.00765

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The cardinality of sumsets: different summands

Autor: Brendan Murphy, Eyvindur A. Palsson, Giorgis Petridis

Publikováno v: Acta Arithmetica. 167:375-395

Let $h$ be a positive integer and $A, B_1, B_2,\dots, B_h$ be finite sets in a commutative group. We bound $|A+B_1+...+B_h|$ from above in terms of $|A|, |A+B_1|,\dots,|A+B_h|$ and $h$. Extremal examples, which demonstrate that the bound is asymptoti

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https://doi.org/10.4064/aa167-4-4

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