We give a survey of a variety of recent results about the distribution and some geometric
properties of points (x, y) on modular hyperbolas xy ≡ a\;(\mod m). We also outline a very …

We prove an effective version of a result due to Einsiedler, Mozes, Shah and Shapira on the
asymptotic distribution of primitive rational points on expanding closed horospheres in the …

We consider the set of m× n matrices with rational entries having numerator and
denominator of size at most H and obtain various upper bounds on the number of such …

On some matrix counting problems - Mohammadi - 2024 - Journal of the London
Mathematical Society - Wiley Online Library Skip to Article Content Skip to Article …

We consider the equation over a finite field q of q elements, with variables from arbitrary
sets. The question of solvability of such and more general equations has recently been …

SOME COUNTING QUESTIONS FOR MATRIX PRODUCTS Page 1 Bull. Aust. Math. Soc. 110
(2024), 32–43 doi:10.1017/S0004972723001004 SOME COUNTING QUESTIONS FOR …

A rather old conjecture asserts that if m= p is prime then, for any fixed ε> 0 and sufficiently
large p, for every integer a there are integers x and y with| x|,| y|≤ p1/2+ ε and such that a≡ …

For a prime power $ q $, we study the distribution of determinent of matrices with restricted
entries over a finite field $\mathbbm {F} _q $ of $ q $ elements. More precisely, let $ N_d …

arxiv:2307.03156v1 [math.NT] 6 Jul 2023 Page 1 arxiv:2307.03156v1 [math.NT] 6 Jul 2023
Some applications of representation theory to the sum–product phenomenon ID Shkredov …

Let A be a set in a prime field F p. We prove that d× d matrices with entries in A determine
almost| A| 3+ 1 4 5 distinct determinants and almost| A| 2− 1 6 distinct permanents when| A …