George Kempf


George Rushing Kempf was a mathematician who worked on algebraic geometry, who proved the Riemann–Kempf singularity theorem, the Kempf–Ness theorem, the Kempf vanishing theorem, and who introduced Kempf varieties.

Mumford on Kempf

'I met George in 1970 when he burst on the algebraic geometry scene with a spectacular PhD thesis. His thesis gave a wonderful analysis of the singularities of the subvarieties $W_r$ of the Jacobian of a curve obtained by adding the curve to itself $r$ times inside its Jacobian. This was one of the major themes that he pursued throughout his career: understanding the interaction of a curve with its Jacobian and especially to the map from the $r$-fold symmetric product of the curve to the Jacobian. In his thesis he gave a determinantal representation both
of $W_r$ and of its tangent cone at all its singular points, which gives you a complete understanding of the nature of these singularities' - D. Mumford
'One of the things that distinguished his work was the total mastery with which he used higher cohomology. A paper which, I believe, every new student of algebraic geometry should read, is his elementary proof of the Riemann-Roch theorem on curves: “Algebraic Curves” in Crelle, 1977. That such an old result could be treated with new insight was the work of a master.' - D. Mumford