比利时vs摩洛哥足彩
,
university of california san diego
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math 209 - number theory seminar
james maynard
oxford university
polynomials representing primes
abstract:
it is a famous conjecture that any one variable polynomial satisfying some simple conditions should take infinitely many prime values. unfortunately, this isn't known in any case except for linear polynomials - the sparsity of values of higher degree polynomials causes substantial difficulties. if we look at polynomials in multiple variables, then there are a few polynomials known to represent infinitely many primes whilst still taking on `few' values; friedlander-iwaniec showed $x^2+y^4$ is prime infinitely often, and heath-brown showed the same for $x^3+2y^3$. we will demonstrate a family of multivariate sparse polynomials all of which take infinitely many prime values.
host: kiran kedlaya
february 16, 2017
1:00 pm
ap&m 7321
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