**Paul Kelly**was born in Riverside, California. At high school his interests were certainly not directed only towards mathematics for he also had a fascination with language, writing poems and humorous essays. He attended the University of California at Los Angeles receiving his B.A. and M.A. degrees from UCLA. He then transferred to the University of Wisconsin- Madison, where his doctoral work was supervised by Rudolph Langer. He obtained his Ph.D. in 1942 for his thesis

*On Isometric Transformations*. However by this time the United States had entered World War II so Kelly's career had to be put on hold while he undertook war work.

He spent three years as a First Lieutenant in the U.S. Air Force and then, in 1946, he was appointed to the mathematics department at the University of Southern California in Los Angeles as an Instructor. In autumn 1949 he moved to the University of California, Santa Barbara, where he spent the rest of his career. His early days at Santa Barbara are remembered in an obituary written by colleagues:-

Kelly became Chairman of the Mathematics department at Santa Barbara in 1957. During the five years that he led the Department the number of academic staff more than doubled and the department set up the structure for its Ph.D. programme. Kelly retired in 1982.Those of us who knew Paul J Kelly when he first came to Santa Barbara in the fall of1949remember an ebullient creator of spontaneous games with elaborate rules such as Obstacle Croquet, a game often played by G.I. math and physics majors who turned car headlights onto the bumpy stretch of grass that comprised the gaming field. Students of those and later days who found joy in mathematics, have remembered him with gratitude, laughter and often the recollection of a favourite one-liner, story, or joke even as they gave him credit for inspiring them to devote their lives to teaching, or doing math or for developing in them an appreciation of the field and its satisfying beauty.

Let us look briefly at some of the Kelly's mathematical papers, which were mainly on topics in geometry and graph theory, and at his books. In 1945 he published *On isometries of square sets* which proved a special case of a conjecture made by Ulam. Ulam conjectured that if two topological spaces *R*_{1} and *R* have the property that the Cartesian product *R*_{1}× *R*_{1} is homeomorphic to the Cartesian product *R* × *R*, then the space *R*_{1} is homeomorphic to the space *R*. In this paper Kelly proved the conjecture for the case of certain isometries of a class of finite metric spaces. This paper was published in the *Bulletin of the American Mathematical Society*, as was his papers *On isometries of product sets* of 1948 and *On Minkowski bodies of constant width* of 1949. To understand the purpose of this last mentioned paper we need the concept of an entire subset of a metric space, namely one with the property that the addition of any point to the subset increases its diameter. In 1934 T Bonnesen and W Fenchel proved that in Euclidean n-space an entire subset is a convex body of constant width, and conversely. Kelly showed that this theorem went over to entire subsets of Minkowski *n*-space.

Examples of papers by Kelly on graph theory are *A congruence theorem for trees* published in the *Pacific Journal* in 1957, *On some mappings related to graphs* published in the same journal in 1964, and *The minimal regular graph containing a given graph* co-authored with Paul Erdős and published in 1967.

We mention three texts written by Kelly, each with a different co-author. In 1953 he wrote *Projective geometry and projective metrics* jointly with Herbert Busemann. Coxeter, in a review, gives a good idea of the contents:-

Kelly's 1979 textThe first two chapters contain a treatment of the real projective plane, using coordinates from the beginning and alternating between synthetic and analytic arguments. ... In Chapter III, the affine plane is derived by singling out(or omitting)one line, thus obtaining affine coordinates. There is an excellent treatment of convex sets, convex curves, and supporting lines. ... Chapter IV is a highly original account of projective metrics, including perpendicularity and motions. ... A "Minkowskian" metric is introduced into the affine plane by taking a closed, strictly convex, centrally symmetrical curve K, and calling it a unit circle. ... Another important metric is that of Hilbert, where the interior of a convex domain D is metrized by means of the logarithm of a cross ratio. ... In the final chapter most of the foregoing ideas are extended from two to three dimensions.

*Geometry and convexity*was written jointly with Max L Weiss. V P Soltan writes:-

The third text we mention is... the reader will find a basic treatment of convex body theory. The book is easy to read, notation is kept simple, and the proofs are clear and complete. No special prerequisite knowledge is assumed. The student is led by the hand from motivation to definition, concrete examples, and theorems. ... this book should contribute to the awakening interest in convex set theory as a text for undergraduate students.

*The non-Euclidean, hyperbolic plane : Its structure and consistency*which Kelly wrote jointly with Gordon Matthews and published in 1981. The authors write that it is:-

We record details of his character and interests given in an obituary written by colleagues Gordon Baker, Andrew Bruckner, Ernest Michael, and Adil Yaqub [1]:-... especially directed to college students who may become secondary teachers.

[Paul Kelly]was a zestful, original conversationalist of wide-ranging interests. Both the sly and the broad social satire in Austen and Trollope gave him great pleasure. However, he complained that there were few humorists among today's writers who entertained him as Thurber, Benchley, and White had done. ... Paul Kelly had a wonderful sense of language, the comic, the human tragi-comic condition, and the crucial role of timing in any enterprise. ... Paul was also a sports enthusiast who wished he'd been big enough to play football. He contented himself with baseball, tennis and golf. When his health no longer permitted any of these, he took up darts and billiards again. Always he was a knowledgeable, opinionated, engaged spectator who joked that he timed major surgeries to coincide with the Olympics or other major sporting events. ... Any collection of memories about Paul would be incomplete without a mention of his love of particular music, musicians, and works of art. He had a special fondness for Mozart's Horn Concertos, Schubert's Trout Quintet, and almost all Delius and Satie. He wished he had learned to play the clarinet since he enjoyed jazz. Bernini's sculptures brought him enduring delight, and those of us who heard him will never forget his voice as he stood in front of Van Gogh's "Poet's Garden" saying in tones of mingled acceptance and astonishment, "He must be a great painter; he's made me believe in a yellow sky."

**Article by:** *J J O'Connor* and *E F Robertson*