Perfect powers in an alternating sum of consecutive cubes

The D(-k2)-triple {1,k2+1,k2+4} with k prime

Alan Filipin
Yasutsugu Fujita

January 2011

Let n be a nonzero integer. A set of m distinct positive integers is called a D(n)-m-tuple if the pr...

Some diophantine equations

Veluppillai, Manoranjitham

January 1977

For positive integers x, y, the equation x4 + (n2-2)y - z always has the trivial solution x - y. In ...

Infinitely many positive solutions of the diophantine equation x2 − kxy + y2 + x = 0

Marlewski, A.
Zarzycki, P.

January 2004

AbstractWe prove that the equation x2 − kxy + y2 + x = 0 with k ϵ N+ has an infinite number of posit...

Perfect powers in an alternating sum of consecutive cubes

Pranabesh Das
Pallab Kanti Dey
Bibekananda Maji
Sudhansu Sekhar Rout

January 2020

In this paper, we consider the problem about finding out perfect powers in an alternating sum of con...

Perfect powers that are sums of consecutive like powers

Patel, Vandita

This thesis is concerned with finding integer solutions to certain Diophantine equations. In doing s...

On the power values of the sum of three squares in arithmetic progression

Le, Maohua
Soydan, Gokhan

January 2022

In this paper, using a deep result on the existence of primitive divisors of Lehmer numbers due to Y...

A diophantine problem concerning cubes

Choudhry, Ajai

February 2005

AbstractThis paper deals with the problem of finding n integers such that their pairwise sums are cu...

On the diophantine equation (xk − 1)(yk − 1) = (zk − 1)

Bugeaud, Yann

December 2004

AbstractLet k ≥ 3 be an integer. We study the possible existence of pairs of distinct positive integ...

Diophantine equations with products of consecutive values of a quadratic polynomial

Yang, Shichun
Togbé, Alain
He, Bo

October 2011

AbstractLet a, b, c, d be given nonnegative integers with a,d⩾1. Using Chebyshevʼs inequalities for ...

Perfect powers that are sums of consecutive cubes

Bennett, Michael A.
Patel, Vandita
Siksek, Samir

January 2017

Euler noted the relation 63 = 33 + 43 + 53 and asked for other instances of cubes that are sums of ...

On a variant of a Diophantine equation of Cassels

Alain Togbe
Pingzhi Yuan

January 2011

Recently, Yuan and Li considered a variant y2=px(Ax2-2) of Cassels\u27 equation y2=3x(x2+2). They pr...

Almost perfect powers in consecutive integers (II)

Saradha, N.
Shorey, T.N.

December 2008

AbstractLet k ≥ 4 be an integer. We find all integers of the form byl where l ≥ 2 and the greatest p...

Products of Arithmetic Progressions which are Squares

Katayama, Shin-ichi

November 2017

In this short note, we shall give a result similar to Y. Zhang and T. Cai [5] which states the dioph...

On the Ternary Exponential Diophantine Equation Equating a Perfect Power and Sum of Products of Consecutive Integers

S. Subburam
Lewis Nkenyereye
N. Anbazhagan
S. Amutha
M. Kameswari
Woong Cho
Gyanendra Prasad Joshi

July 2021

Consider the Diophantine equation yn=x+x(x+1)+⋯+x(x+1)⋯(x+k), where x, y, n, and k are integers. In ...

A system of cubic diophantine equations

Mohanty, S.P.

May 1977

AbstractIn this paper we solve x3 + y + 1 − xyz = 0 completely and study a pair of simultaneous cubi...

The D(-k2)-triple {1,k2+1,k2+4} with k prime

Alan Filipin
Yasutsugu Fujita

January 2011

Let n be a nonzero integer. A set of m distinct positive integers is called a D(n)-m-tuple if the pr...

Some diophantine equations

Veluppillai, Manoranjitham

January 1977

For positive integers x, y, the equation x4 + (n2-2)y - z always has the trivial solution x - y. In ...

Infinitely many positive solutions of the diophantine equation x2 − kxy + y2 + x = 0

Marlewski, A.
Zarzycki, P.

January 2004

AbstractWe prove that the equation x2 − kxy + y2 + x = 0 with k ϵ N+ has an infinite number of posit...

Perfect powers in an alternating sum of consecutive cubes

Pranabesh Das
Pallab Kanti Dey
Bibekananda Maji
Sudhansu Sekhar Rout

January 2020

In this paper, we consider the problem about finding out perfect powers in an alternating sum of con...

Perfect powers that are sums of consecutive like powers

Patel, Vandita

This thesis is concerned with finding integer solutions to certain Diophantine equations. In doing s...

On the power values of the sum of three squares in arithmetic progression

Le, Maohua
Soydan, Gokhan

January 2022

In this paper, using a deep result on the existence of primitive divisors of Lehmer numbers due to Y...

A diophantine problem concerning cubes

Choudhry, Ajai

February 2005

AbstractThis paper deals with the problem of finding n integers such that their pairwise sums are cu...

On the diophantine equation (xk − 1)(yk − 1) = (zk − 1)

Bugeaud, Yann

December 2004

AbstractLet k ≥ 3 be an integer. We study the possible existence of pairs of distinct positive integ...

Diophantine equations with products of consecutive values of a quadratic polynomial

Yang, Shichun
Togbé, Alain
He, Bo

October 2011

AbstractLet a, b, c, d be given nonnegative integers with a,d⩾1. Using Chebyshevʼs inequalities for ...

Perfect powers that are sums of consecutive cubes

Bennett, Michael A.
Patel, Vandita
Siksek, Samir

January 2017

Euler noted the relation 63 = 33 + 43 + 53 and asked for other instances of cubes that are sums of ...

On a variant of a Diophantine equation of Cassels

Alain Togbe
Pingzhi Yuan

January 2011

Recently, Yuan and Li considered a variant y2=px(Ax2-2) of Cassels\u27 equation y2=3x(x2+2). They pr...

Almost perfect powers in consecutive integers (II)

Saradha, N.
Shorey, T.N.

December 2008

AbstractLet k ≥ 4 be an integer. We find all integers of the form byl where l ≥ 2 and the greatest p...

Products of Arithmetic Progressions which are Squares

Katayama, Shin-ichi

November 2017

In this short note, we shall give a result similar to Y. Zhang and T. Cai [5] which states the dioph...

On the Ternary Exponential Diophantine Equation Equating a Perfect Power and Sum of Products of Consecutive Integers

S. Subburam
Lewis Nkenyereye
N. Anbazhagan
S. Amutha
M. Kameswari
Woong Cho
Gyanendra Prasad Joshi

July 2021

Consider the Diophantine equation yn=x+x(x+1)+⋯+x(x+1)⋯(x+k), where x, y, n, and k are integers. In ...

A system of cubic diophantine equations

Mohanty, S.P.

May 1977

AbstractIn this paper we solve x3 + y + 1 − xyz = 0 completely and study a pair of simultaneous cubi...

The D(-k2)-triple {1,k2+1,k2+4} with k prime

Alan Filipin
Yasutsugu Fujita

January 2011

Let n be a nonzero integer. A set of m distinct positive integers is called a D(n)-m-tuple if the pr...

Some diophantine equations

Veluppillai, Manoranjitham

January 1977

For positive integers x, y, the equation x4 + (n2-2)y - z always has the trivial solution x - y. In ...

Infinitely many positive solutions of the diophantine equation x2 − kxy + y2 + x = 0

Marlewski, A.
Zarzycki, P.

January 2004

AbstractWe prove that the equation x2 − kxy + y2 + x = 0 with k ϵ N+ has an infinite number of posit...

Perfect powers in an alternating sum of consecutive cubes

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Perfect powers in an alternating sum of consecutive cubes

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