Diophantine Quadruples
Florian Luca (Mathematics Institute, National Autonomous University of Mexico)
MSI Computational Mathematics (formerly AdvCom) Seminar SeriesDATE: 2007-01-15
TIME: 11:00:00 - 12:00:00
LOCATION: John Dedman Seminar Room G35
CONTACT: JavaScript must be enabled to display this email address.
ABSTRACT:
A Diophantine $m$-tuple is a set of $m$-positive integers ${a_1,a_2,ldots,a_m}$ such as the product of any two of them plus $1$ is a square. For example, ${1,3,8,120}$ is a Diophantine quadruple. There are infinitely many Diophantine quadruples. It is conjectured that there is no Diophantine quintuple but this has not been proved yet. In my talk, I will survey what is known about this subject along with variations of it with rational contents, or polynomial contents, or replacing the squares by larger powers, etc. The talk will be aimed at a general audience.
BIO:
http://www.matmor.unam.mx/personal/fluca.htm
