Next Article in Journal
p-Topologicalness—A Relative Topologicalness in ⊤-Convergence Spaces
Previous Article in Journal
A General Algorithm for the Split Common Fixed Point Problem with Its Applications to Signal Processing
Article Menu

Export Article

Open AccessReview
Mathematics 2019, 7(3), 227; https://doi.org/10.3390/math7030227

The Prouhet Tarry Escott Problem: A Review

1
TATA Realty-SASTRA Srinivasa Ramanujan Research Chair for Number Theory, SASTRA Deemed University, Thanjavur 613401, India
2
Department of Mathematics, SASTRA Deemed University, Thanjavur 613401, India
*
Author to whom correspondence should be addressed.
Received: 28 December 2018 / Revised: 23 February 2019 / Accepted: 24 February 2019 / Published: 1 March 2019
Full-Text   |   PDF [337 KB, uploaded 1 March 2019]   |  

Abstract

This paper presents a review of the Prouhet Tarry Escott problem. The solutions of the Prouhet Tarry Escott problem are significant because of its numerous applications. Available literature about the present topic has been critically examined. The ideal and non-ideal symmetric solutions of the problem are pointed out. The present work also aims to familiarize one with the different existing methods of obtaining the solutions of the Tarry Escott problem. Difficulties and possible future research directions are addressed. This review contributes a clear picture of the Prouhet Tarry Escott problem. View Full-Text
Keywords: Diophantine systems; equal sums of like powers; Prouhet Tarry Escott problem Diophantine systems; equal sums of like powers; Prouhet Tarry Escott problem
Figures

Figure 1

This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited (CC BY 4.0).
SciFeed

Share & Cite This Article

MDPI and ACS Style

Raghavendran, S.; Narayanan, V. The Prouhet Tarry Escott Problem: A Review. Mathematics 2019, 7, 227.

Show more citation formats Show less citations formats

Note that from the first issue of 2016, MDPI journals use article numbers instead of page numbers. See further details here.

Related Articles

Article Metrics

Article Access Statistics

1

Comments

[Return to top]
Mathematics EISSN 2227-7390 Published by MDPI AG, Basel, Switzerland RSS E-Mail Table of Contents Alert
Back to Top