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The Clay Mathematics Institute (CMI) is a private, non-profit foundation dedicated to increasing and disseminating mathematical knowledge. Formerly based in Peterborough, New Hampshire, [1] the corporate address is now in Denver, Colorado. CMI's scientific activities are managed from the President's office in Oxford, United Kingdom. It gives ...
The Clay Research Award is an annual award given by the Oxford-based Clay Mathematics Institute to mathematicians to recognize their achievements in mathematical research. The following mathematicians have received the award:
The Clay Mathematics Institute officially designated the title Millennium Problem for the seven unsolved mathematical problems, the Birch and Swinnerton-Dyer conjecture, Hodge conjecture, Navier–Stokes existence and smoothness, P versus NP problem, Riemann hypothesis, Yang–Mills existence and mass gap, and the Poincaré conjecture at the ...
Work in, influence on or service to mathematics, particularly in relation to advancing the careers of women in mathematics United Kingdom: Berwick Prize: London Mathematical Society: Recognition of an outstanding piece of mathematical research United Kingdom: Clay Research Award: Clay Mathematics Institute: Major breakthroughs in mathematical ...
The Yang–Mills existence and mass gap problem is an unsolved problem in mathematical physics and mathematics, and one of the seven Millennium Prize Problems defined by the Clay Mathematics Institute, which has offered a prize of US$1,000,000 for its solution. The problem is phrased as follows: [1] Yang–Mills Existence and Mass Gap.
Millennium Prize Problems of Clay Mathematics Institute; Millennium Technology Prize of Finland This page was last edited on 29 ...
The Hodge conjecture is one of the Clay Mathematics Institute's Millennium Prize Problems, with a prize of $1,000,000 US for whoever can prove or disprove the Hodge conjecture. Motivation [ edit ]
Bombieri, Enrico (2006), "The Riemann Hypothesis", The Millennium Prize Problems, Clay Mathematics Institute Cambridge, MA: 107– 124 Moxley, Frederick (2021), "Complete solutions of inverse quantum orthogonal equivalence classes", Examples and Counterexamples , 1 : 100003, doi : 10.1016/j.exco.2021.100003