John L. Hall (born 1934, Denver, Colo., U.S.) is an American physicist, who shared one-half of the 2005 Nobel Prize for Physics with Theodor W. Hänsch for their contributions to the development of laser spectroscopy, the use of lasers to determine the frequency (colour) of light emitted by atoms and molecules. (The other half of the prize went to Roy J. Glauber.)
Hall studied at the Carnegie Institute of Technology (B.S., 1956; M.S., 1958; Ph.D., 1961) in Pittsburgh. In 1961 he joined the Joint Institute for Laboratory Astrophysics (now known as JILA), a research institute operated by the National Bureau of Standards (later called the National Institute of Standards and Technology) and the University of Colorado at Boulder. He later taught at the university.
Working with Hänsch, Hall conducted prizewinning research on measuring optical frequencies (frequencies of visible light). Although a procedure (the optical frequency chain) had already been developed to make such measurements, it was so complex that it could be performed in only a few laboratories. The two men focused on developing Hänsch’s idea for the optical frequency comb technique. In the technique, ultrashort pulses of laser light create a set of precisely spaced frequency peaks that resemble the evenly spaced teeth of a hair comb, thereby providing a practical way of obtaining optical frequency measurements to an accuracy of 15 digits, or one part in one quadrillion. Offering important contributions, Hall helped Hänsch work out the details of the theory in 2000.
Practical applications of the work of Hall and Hänsch included the development of very accurate clocks, improved satellite-based navigation systems such as the Global Positioning System, and the synchronization of computer data networks. Their research was also used by physicists to verify Albert Einstein’s theory of special relativity to very high levels of precision and to test whether the values of fundamental physical constants related to optical frequencies were indeed constant or changed slightly over time.