Roger Heath-Brown


David Rodney "Roger" Heath-Brown FRS, is a British mathematician working in the field of analytic number theory.

Education

He was an undergraduate and graduate student of Trinity College, Cambridge; his research supervisor was Alan Baker.

Career and research

In 1979 he moved to the University of Oxford, where from 1999 he held a professorship in pure mathematics. He retired in 2016.
Heath-Brown is known for many striking results. He proved that there are infinitely many prime numbers of the form x3 + 2y3.
In collaboration with S. J. Patterson in 1978 he proved the Kummer conjecture on cubic Gauss sums in its equidistribution form.
He has applied Burgess's method on character sums to the ranks of elliptic curves in families.
He proved that every non-singular cubic form over the rational numbers in at least ten variables represents 0.
Heath-Brown also showed that Linnik's constant is less than or equal to 5.5. More recently, Heath-Brown is known for his pioneering work on the so-called determinant method. Using this method he was able to prove a conjecture of Serre in the four variable case in 2002. This particular conjecture of Serre was later dubbed the "dimension growth conjecture" and this was almost completely solved by various works of Browning, Heath-Brown, and Salberger by 2009.

Awards and honours

The London Mathematical Society has awarded Heath-Brown the Junior Berwick Prize, the Senior Berwick Prize, and the Pólya Prize. He was made a Fellow of the Royal Society in 1993, and a corresponding member of the Göttingen Academy of Sciences in 1999.
He was an invited speaker in International Congress of Mathematicians 2010, Hyderabad on the topic of "Number Theory."
In 2012 he became a fellow of the American Mathematical Society.

Other

In September of 2007, he co-authored the preface to the Oxford University Sixth Edition of An Introduction to the Theory of Numbers by G.H. Hardy and E.M. Wright.