Richard M. Friedberg (born October 8, 1935), is a theoretical physicist who has contributed to a wide variety of problems in mathematics and physics. These include

mathematical logic Mathematical logic is the study of formal logic within mathematics. Major subareas include model theory, proof theory, set theory, and recursion theory. Research in mathematical logic commonly addresses the mathematical properties of formal ...

number theory Number theory (or arithmetic or higher arithmetic in older usage) is a branch of pure mathematics devoted primarily to the study of the integers and integer-valued functions. German mathematician Carl Friedrich Gauss (1777–1855) said, "Mat ...

, solid state physics,

general relativity General relativity, also known as the general theory of relativity and Einstein's theory of gravity, is the geometric theory of gravitation published by Albert Einstein in 1915 and is the current description of gravitation in modern physics ...

particle physics Particle physics or high energy physics is the study of fundamental particles and forces that constitute matter and radiation. The fundamental particles in the universe are classified in the Standard Model as fermions (matter particles) an ...

quantum optics Quantum optics is a branch of atomic, molecular, and optical physics dealing with how individual quanta of light, known as photons, interact with atoms and molecules. It includes the study of the particle-like properties of photons. Photons have ...

, genome research, and the foundations of quantum physics.

Early life

Friedberg was born in Manhattan on Oct 8, 1935, the child of cardiologist Charles K. Friedberg, and playwright Gertrude Tonkonogy.

Academic work

Friedberg's most well-known work dates back to the mid-1950s. As an undergraduate at Harvard, he published several papers over a period of 2–3 years. The first paper introduced the priority method, a common technique in computability theory, in order to prove the existence of

recursively enumerable set In computability theory, a set ''S'' of natural numbers is called computably enumerable (c.e.), recursively enumerable (r.e.), semidecidable, partially decidable, listable, provable or Turing-recognizable if: *There is an algorithm such that th ...

s with incomparable degrees of unsolvability.“Two Recursively Enumerable Sets Not Recursive in Each Other”, olution of Post’s problem Proc. Natl. Acad. Sci. vol. 43, p. 236 (1957) ommunicated_by_ ommunicated_by_Kurt_Gödel">Kurt_Gödel.html"_;"title="ommunicated_by_Kurt_Gödel">ommunicated_by_Kurt_Gödel In_1968,_Friedberg_proved_independently_what_became_known_as_Bell's_theorem.html" ;"title="Kurt_Gödel.html" ;"title="Kurt_Gödel.html" ;"title="ommunicated by Kurt Gödel">ommunicated by Kurt Gödel">Kurt_Gödel.html" ;"title="ommunicated by Kurt Gödel">ommunicated by Kurt Gödel In 1968, Friedberg proved independently what became known as Bell's theorem">Bell’s inequality, not knowing that J. S. Bell had proved it a few years earlier. He showed it to the physicist and historian Max Jammer, who somehow managed to insert it into his book “The Conceptual Development of Quantum Mechanics”, although the latter bears the publication date 1966. This caused Friedberg some embarrassment later when classmates at Harvard, knowing of the result only through Jammer’s book, supposed that Friedberg was the first discoverer. (A letter from Friedberg to Jammer dated May 1971 begins, “It was nice of you to remember what I showed you in 1968. I finally got around to writing it up in 1969, but just then I found out about Bell’s 1964 paper (Physics 1, 195) which had anticipated my ‘discovery’ by three years. So I did not publish.”) More recently, Friedberg worked on the foundations of quantum mechanics in collaboration with the late

Pierre Hohenberg Pierre C. Hohenberg (3 October 1934 – 15 December 2017) was a French-American theoretical physicist, who worked primarily on statistical mechanics. Hohenberg studied at Harvard, where he earned his bachelor's degree in 1956 and a master's degr ...

. Friedberg is also known for his love of music and poetry. He wrote poems in several letters to cognitive scientist and writer Douglas Hofstadter in 1989. The last letter contains two sonnets ”The Electromagnetic Spectrum” and "Fermions and Bosons". These letters also include critiques and analyses of topics in ''

Metamagical Themas ''Metamagical Themas'' is an eclectic collection of articles that Douglas Hofstadter wrote for the popular science magazine ''Scientific American'' during the early 1980s. The anthology was published in 1985 by Basic Books. The volume is subst ...

'', a collection of articles that Hofstadter wrote for Scientific American during the early 1980s. Friedberg wrote an informal book on number theory titled "An Adventurer's Guide to Number Theory"."An Adventurer’s Guide to Number Theory", R. Friedberg. New York: McGraw-Hill, 1968; reissued by Dover Publications, 1994. In the book, he states, "The difference between the theory of numbers and arithmetic is like the difference between poetry and grammar."

Selected publications

* "Two Recursively Enumerable Sets Not Recursive in Each Other", Richard Friedberg, Proc. Natl. Acad. Sci. vol. 43, p. 236 (1957) K._Gödel.html" ;"title="Kurt_Gödel.html" ;"title="ommunicated by Kurt Gödel">K. Gödel">Kurt_Gödel.html" ;"title="ommunicated by Kurt Gödel">K. Gödel * "A criterion for completeness of degrees of unsolvability", Richard. M. Friedberg, Journal of Symbolic Logic, Volume 22, Issue 2 June 1957, pp. 159–160. * "A Learning Machine: Part I", R.M. Friedberg, IBM Journal of Research and Development (Volume: 2, Issue: 1, Jan. 1958). * "Three theorems on recursive enumeration. I. Decomposition. II. Maximal set. III. Enumeration without duplication", Richard M. Friedberg, Journal of Symbolic Logic, Volume 23, Issue 3 September 1958, pp. 309–316. * "Dual Trees and Resummation Theorems", R. Friedberg, J. Math. Phys. vol. 16, p 20 (1974). * "The Electrostatics and Magnetostatics of a Conducting Disc", R. Friedberg, Am. J. Phys vol. 61, p. 1084 (1993). * "Path Integrals in Polar Variables with Spontaneously Broken Symmetry", R. Friedberg, J. Math Phys. vol. 36, p. 2675 (1995). * "Derivation of Regge’s Action from Einstein’s Theory of General Relativity", R. Friedberg and T. D. Lee, Nucl. Phys. B 242, 145 (1984). * "Frequency Shifts in Emission and Absorption by Resonant Systems of Two-Level Atoms", (with S. R. Hartmann and J. T. Manassah), Phys. Reports 7C, 101 (1973). * "Efficient Sorting of Genomic Permutation by Translocation, inversion and block interchange" S. Yancopoulos, O. Attie, Friedberg, Bioinformatics vol. 21, pp 3352–59 (2005).

Early life

Academic work

Selected publications

References

See also