Quadratic residues and the combinatorics of sign multiplication

A recurrent pattern in the list of quadratic residues mod a prime and in the values of the liouville λ function

Walum, Herbert

February 1980

AbstractCertain patterns of values of totally multiplicative functions are studied. The main theorem...

A Counting Proof for When 2 Is a Quadratic Residue

Chandrasekhar, Karthik
Ehrenborg, Richard
Beukers, F.

January 2020

Using the group consisting of the eight Möbius transformations x, – x, 1/x,−1/x, (x−1)/(x+1),(x+1)/(...

Quadratic Residues and the Frobenius Coin Problem

Spivey, Michael Z.

January 2007

An odd prime p has (p-1)/2 quadratic residues mod p, and for relatively prime p and q there are (p-1...

Quadratic residues and the combinatorics of sign multiplication

Wright, Steve

April 2008

AbstractIf S is a nonempty finite set of positive integers, we find a criterion both necessary and s...

Patterns of quadratic residues and nonresidues for infinitely many primes

Wright, Steve

March 2007

AbstractIf S is a nonempty, finite subset of the positive integers, we address the question of when ...

An Exploration of Quadratic Residues in Finite Fields

Kessler, Ian

April 2014

If an element in a given field can be expressed as a product of two equivalent elements that are als...

Counting additive decompositions of quadratic residues in finite fields

Blackburn, Simon R
Konyagin, Sergei V
Shparlinski, Igor E

January 2015

We say that a set S is additively decomposed into two sets A and B if S = {a+b: a ∈ A, b ∈ B}. A. Sá...

DISTRIBUTION OF RESIDUES MODULO p- II F. LUCA AND R.

On Prof
T. C. Vasudevan

January 2016

Abstract. In this article, we shall study a problem of the following nature. Given a natural number ...

QUADRATIC RESIDUES AND DIFFERENCE SETS

Vsevolod F. Lev
Jack Sonn
Vsevolod F. Lev
Jack Sonn

January 2016

Abstract. It has been conjectured by Sárközy that with finitely many exceptions, the set of quadra...

Supplement to On Translations of Quadratic Residues

Brandt, Bruce

January 1999

Let n and k be arbitrary positive integers. We will tend to be concerned with small k and with n whi...

Supplement to On Translations of Quadratic Residues

Brandt, Bruce

January 1999

Let n and k be arbitrary positive integers. We will tend to be concerned with small k and with n whi...

A note on Linnik’s theorem on quadratic non-residues

Balister, Paul
Bollobás, Béla
Lee, Jonathan D.
Morris, Robert
Riordan, Oliver

April 2019

We present a short and purely combinatorial proof of Linnik’s theorem: for any ε\u3e 0 there exists ...

A note on Linnik’s theorem on quadratic non-residues

Balister, P
Bollobás, B
Lee, J
Morris, R
Riordan, O

January 2019

We present a short and purely combinatorial proof of Linnik’s theorem: for any ε>0 there exist...

A note on the dth power residue symbol of Fq[t]

Hu, Su

September 2008

AbstractThis paper will generalize the main results of Steve Wright [S. Wright, Quadratic residues a...

Prescribing the binary digits of squarefree numbers and quadratic residues

Dietmann, R
Elsholtz, C
Shparlinski, IE

December 2017

We study the equidistribution of multiplicatively defined sets, such as the squarefree integers, qua...

A recurrent pattern in the list of quadratic residues mod a prime and in the values of the liouville λ function

Walum, Herbert

February 1980

AbstractCertain patterns of values of totally multiplicative functions are studied. The main theorem...

A Counting Proof for When 2 Is a Quadratic Residue

Chandrasekhar, Karthik
Ehrenborg, Richard
Beukers, F.

January 2020

Using the group consisting of the eight Möbius transformations x, – x, 1/x,−1/x, (x−1)/(x+1),(x+1)/(...

Quadratic Residues and the Frobenius Coin Problem

Spivey, Michael Z.

January 2007

An odd prime p has (p-1)/2 quadratic residues mod p, and for relatively prime p and q there are (p-1...

Quadratic residues and the combinatorics of sign multiplication

Wright, Steve

April 2008

AbstractIf S is a nonempty finite set of positive integers, we find a criterion both necessary and s...

Patterns of quadratic residues and nonresidues for infinitely many primes

Wright, Steve

March 2007

AbstractIf S is a nonempty, finite subset of the positive integers, we address the question of when ...

An Exploration of Quadratic Residues in Finite Fields

Kessler, Ian

April 2014

If an element in a given field can be expressed as a product of two equivalent elements that are als...

Counting additive decompositions of quadratic residues in finite fields

Blackburn, Simon R
Konyagin, Sergei V
Shparlinski, Igor E

January 2015

We say that a set S is additively decomposed into two sets A and B if S = {a+b: a ∈ A, b ∈ B}. A. Sá...

DISTRIBUTION OF RESIDUES MODULO p- II F. LUCA AND R.

On Prof
T. C. Vasudevan

January 2016

Abstract. In this article, we shall study a problem of the following nature. Given a natural number ...

QUADRATIC RESIDUES AND DIFFERENCE SETS

Vsevolod F. Lev
Jack Sonn
Vsevolod F. Lev
Jack Sonn

January 2016

Abstract. It has been conjectured by Sárközy that with finitely many exceptions, the set of quadra...

Supplement to On Translations of Quadratic Residues

Brandt, Bruce

January 1999

Let n and k be arbitrary positive integers. We will tend to be concerned with small k and with n whi...

Supplement to On Translations of Quadratic Residues

Brandt, Bruce

January 1999

Let n and k be arbitrary positive integers. We will tend to be concerned with small k and with n whi...

A note on Linnik’s theorem on quadratic non-residues

Balister, Paul
Bollobás, Béla
Lee, Jonathan D.
Morris, Robert
Riordan, Oliver

April 2019

We present a short and purely combinatorial proof of Linnik’s theorem: for any ε\u3e 0 there exists ...

A note on Linnik’s theorem on quadratic non-residues

Balister, P
Bollobás, B
Lee, J
Morris, R
Riordan, O

January 2019

We present a short and purely combinatorial proof of Linnik’s theorem: for any ε>0 there exist...

A note on the dth power residue symbol of Fq[t]

Hu, Su

September 2008

AbstractThis paper will generalize the main results of Steve Wright [S. Wright, Quadratic residues a...

Prescribing the binary digits of squarefree numbers and quadratic residues

Dietmann, R
Elsholtz, C
Shparlinski, IE

December 2017

We study the equidistribution of multiplicatively defined sets, such as the squarefree integers, qua...

A recurrent pattern in the list of quadratic residues mod a prime and in the values of the liouville λ function

Walum, Herbert

February 1980

AbstractCertain patterns of values of totally multiplicative functions are studied. The main theorem...

A Counting Proof for When 2 Is a Quadratic Residue

Chandrasekhar, Karthik
Ehrenborg, Richard
Beukers, F.

January 2020

Using the group consisting of the eight Möbius transformations x, – x, 1/x,−1/x, (x−1)/(x+1),(x+1)/(...

Quadratic Residues and the Frobenius Coin Problem

Spivey, Michael Z.

January 2007

An odd prime p has (p-1)/2 quadratic residues mod p, and for relatively prime p and q there are (p-1...

Quadratic residues and the combinatorics of sign multiplication

Abstract

Extracted data

Quadratic residues and the combinatorics of sign multiplication

Abstract

Extracted data

Related items

Related items