Leroy Milton Kelly (May 8, 1914 – February 21, 2002[1]) was an American mathematician whose research primarily concerned combinatorial geometry.[2] In 1986 he settled a conjecture of Jean-Pierre Serre by proving that n points in complex 3-space, not all lying on a plane, determine an ordinary line—that is, a line containing only two of the n points. He taught at Michigan State University.
Kelly received his Ph.D. at the University of Missouri in 1948, advised by Leonard Mascot Blumenthal.[2][3]