scientific article; zbMATH DE number 1303174
From MaRDI portal
Publication:4249696
zbMath0931.11034MaRDI QIDQ4249696
Publication date: 31 August 1999
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Asymptotic results on arithmetic functions (11N37) Congruences; primitive roots; residue systems (11A07) Sieves (11N35)
Related Items (27)
On the largest prime factor of \(n!+2^n-1\) ⋮ Exponential sums in prime fields for modular forms ⋮ On the Lehmer conjecture and counting in finite fields ⋮ Romanov type problems ⋮ The distribution of sequences in residue classes ⋮ Prime divisors of sparse integers ⋮ The Markoff group of transformations in prime and composite moduli. With an appendix by Dan Carmon. ⋮ Periods of orbits modulo primes ⋮ On the distribution of sparse sequences in prime fields and applications ⋮ On the exponential large sieve inequality for sparse sequences modulo primes ⋮ Unified treatment of Artin-type problems ⋮ Positive lower density for prime divisors of generic linear recurrences ⋮ Algebraic algorithms for variants of subset sum ⋮ On sparsity of representations of polynomials as linear combinations of exponential functions ⋮ On \(n\)th order Euler polynomials of degree \(n\) that are Eisenstein ⋮ LOWER BOUNDS FOR PERIODS OF DUCCI SEQUENCES ⋮ Multiplicative congruences with variables from short intervals ⋮ Reductions of points on elliptic curves ⋮ Character sums with exponential functions over smooth numbers ⋮ Multiplicative Energy of Shifted Subgroups and Bounds On Exponential Sums with Trinomials in Finite Fields ⋮ Finite sets containing near-primitive roots ⋮ Multiplicative subgroups avoiding linear relations in finite fields and a local-global principle ⋮ Average results on the order of \(a\) modulo \(p\) ⋮ On gaps between quadratic non-residues in the Euclidean and Hamming metrics ⋮ Cut-off phenomenon for the \(ax+b\) Markov chain over a finite field ⋮ Overview of the Work of Kumar Murty ⋮ Elements of large order on varieties over prime finite fields
This page was built for publication:
