Biography:Howard P. Robertson
Howard P. Robertson
|Born||January 27, 1903|
|Died||August 26, 1961 (aged 58)|
|Alma mater||University of Washington|
California Institute of Technology
|Known for||Friedmann–Lemaître–Robertson–Walker metric|
|Awards||Medal for Merit (1946)|
|Institutions||California Institute of Technology|
|Thesis||On Dynamical Space-Times Which Contain a Conformal Euclidean 3-Space (1925)|
|Doctoral advisor||Harry Bateman|
|Doctoral students||Abraham H. Taub|
Howard Percy "Bob" Robertson (January 27, 1903 – August 26, 1961) was an American mathematician and physicist known for contributions related to physical cosmology and the uncertainty principle. He was Professor of Mathematical Physics at the California Institute of Technology and Princeton University.
Robertson made important contributions to the mathematics of quantum mechanics, general relativity and differential geometry. Applying relativity to cosmology, he independently developed the concept of an expanding universe. His name is most often associated with the Poynting–Robertson effect, the process by which solar radiation causes a dust mote orbiting a star to lose angular momentum, which he also described in terms of general relativity.
During World War II, Robertson served with the National Defense Research Committee (NDRC) and the Office of Scientific Research and Development (OSRD). He served as Technical Consultant to the Secretary of War, the OSRD Liaison Officer in London, and the Chief of the Scientific Intelligence Advisory Section at Supreme Headquarters Allied Expeditionary Force.
After the war Robertson was director of the Weapons Systems Evaluation Group in the Office of the Secretary of Defense from 1950 to 1952, chairman of the Robertson Panel on UFOs in 1953 and Scientific Advisor to the NATO Supreme Allied Commander Europe (SACEUR) in 1954 and 1955. He was Chairman of the Defense Science Board from 1956 to 1961, and a member of the President's Science Advisory Committee (PSAC) from 1957 to 1961.
Howard Percy Robertson, was born in Hoquiam, Washington, on January 27, 1903, the oldest of five children of George Duncan Robertson, an engineer who built bridges in Washington state, and Anna McLeod, a nurse. His father died when he was 15 years old, but although money was short, all five siblings attended university. He entered the University of Washington in Seattle in 1918, initially with the intention of studying engineering, but he later switched to mathematics. He earned a Bachelor of Science degree in mathematics in 1922 and a Master of Science in mathematics and physics in 1923.
In 1923 Robertson married Angela Turinsky, a philosophy and psychology student at the University of Washington. They had two children: George Duncan, who became a surgeon, and Marietta, who later married California Institute of Technology (Caltech) historian Peter W. Fay. At the University of Washington he also met Eric Temple Bell, who encouraged him to pursue mathematics at Caltech. Robertson completed his PhD dissertation in mathematics and physics there in 1925 under the supervision of Harry Bateman, writing "On Dynamical Space-Times Which Contain a Conformal Euclidean 3-Space".
Upon receipt of his doctorate, Robertson received a National Research Council Fellowship to study at the University of Göttingen in Germany, where he met David Hilbert, Richard Courant, Albert Einstein, Werner Heisenberg, Erwin Schrödinger, Martin Schwarzschild, John von Neumann and Eugene Wigner. He found Max Born unsympathetic to his concept of an expanding universe, which Born considered "rubbish". He also spent six months at Ludwig Maximilian University of Munich, where he was a post-doctoral student of Arnold Sommerfeld.
Robertson returned to the United States in 1927, and became an assistant professor of mathematics at Caltech. In 1928, he accepted a position as an assistant professor of mathematical physics at Princeton University, where he became an associate professor in 1931, and a professor in 1938. He spent 1936 on sabbatical at Caltech. His interest in general relativity and differential geometry led to a series of papers in the 1920s that developed the subject.
Robertson wrote three important papers on the mathematics of quantum mechanics. In the first, written in German, he looked at the coordinate system required for the Schrödinger equation to be solvable. The second examined the relationship between the commutative property and Heisenberg's uncertainty principle. The third extended the second to the case of m observables. In 1931 he published a translation of Weyl's The Theory of Groups and Quantum Mechanics.
Yet perhaps Robertson's most notable achievements were in applying relativity to cosmology. He independently developed the concept of an expanding universe, which would imply distant galaxies as seen from Earth would be redshifted – a phenomenon previously confirmed by Vesto Slipher . Robertson went on to apply the theory of continuous groups in Riemann spaces to find all the solutions that describe the cosmological spaces.  This was extended by Arthur Geoffrey Walker in 1936, and is today widely known in the United States as the Robertson–Walker metric.
One of Robertson's landmark papers, a brief note in The Annals of Mathematics, entitled a "Note on the preceding paper: The two body problem in general relativity", solved that problem within a degree of approximation not improved on for several decades. Earlier work, such as the Schwarzschild metric, were for a central body that did not move, while Robertson's solution considered two bodies orbiting each other. Nevertheless, his solution failed to include gravitational radiation, so the bodies orbit forever, rather than approaching each other.
Yet Robertson's name is most often associated with the Poynting–Robertson effect, the process by which solar radiation causes a dust mote orbiting a star to lose angular momentum. This is related to radiation pressure tangential to the grain's motion. John Henry Poynting described it in 1903 based on the "luminiferous aether" theory, which was superseded by Einstein's theories of relativity. In 1937, Robertson described the effect in terms of general relativity.
Robertson developed the theory of invariants of tensors to derive the Kármán–Howarth equation in 1940, which was later used by George Batchelor and Subrahmanyan Chandrasekhar in the theory of axisymmetric turbulence to derive Batchelor–Chandrasekhar equation.
World War II
Aside from his work in physics, Robertson played a central role in American scientific intelligence during and after World War II. He was approached by Richard Tolman shortly after World War II began in 1939, and began working for the Committee for Passive Protection Against Bombing. This was absorbed with other groups into Division 2 of the National Defense Research Committee (NDRC), with Robertson engaged in the study of terminal ballistics.
In 1943, Robertson became the Office of Scientific Research and Development (OSRD) chief scientific liaison officer in London. He became close friends with Reginald Victor Jones, and Solly Zuckerman praised the work Robertson and Jones did on scrambling radar beams and beacons. In 1944 Robertson also became a Technical Consultant to the Secretary of War, and the Chief of the Scientific Intelligence Advisory Section at Supreme Headquarters Allied Expeditionary Force. His fluency in German helped him to interrogate German scientists, including rocket scientists involved in the V-2 rocket program. He was awarded the Medal for Merit for his contributions to the war effort.
After the war, Robertson accepted a professorship at Caltech in 1947. He would remain there for the rest of his career, except for long periods of government service. He was a Central Intelligence Agency classified employee and director of the Weapons System Evaluation Group in the Office of the Secretary of Defense, the Weapons System Evaluation Group in the Office of the Secretary of Defense from 1950 to 1952, and Scientific Advisor in 1954 and 1955 to the NATO Supreme Allied Commander Europe (SACEUR), General Alfred M. Gruenther. In 1953 he chaired the Robertson Panel, which investigated a wave of UFO reports in 1952. He was Chairman of the Defense Science Board from 1956 to 1961, and a member of the President's Science Advisory Committee (PSAC) from 1957 to 1961.
He was a member of the National Academy of Sciences, serving as its foreign secretary from 1958 until his death in 1961, the American Academy of Arts and Sciences, the American Mathematical Society, the American Physical Society, the American Astronomical Society, the American Philosophical Society, the Operational Research Society, and the Society for Industrial and Applied Mathematics.
In August 1961, Robertson was hospitalized after being injured in a car accident. He suffered a pulmonary embolism and died on August 26, 1961. He was survived by his wife and children. His papers were donated to the Caltech Archives by his daughter and son-in-law in 1971.
- "MacTutor History of Mathematics: Howard Percy Robertson". November 2006. http://turnbull.mcs.st-and.ac.uk/~history/Printonly/Robertson.html.
- Greenstein 1980, pp. 343–344.
- "The Archives Of The California Institute Of Technology: The Papers Of H. P. Robertson". July 2002. p. iii. http://findingaids.library.caltech.edu/14/01/Papers_of_H_P_Robertson.pdf.
- Howard P. Robertson at the Mathematics Genealogy Project
- Greenstein 1980, p. 346.
- Greenspan 2005, pp. 141–143.
- Rabi 2006, p. 38.
- Shenstone, Allen G. (24 February 1961). "Princeton & Physics". Princeton Alumni Weekly 61: 7, 20. https://books.google.com/books?id=8hJbAAAAYAAJ&pg=PA363.
- Physics Today 1961, p. 90.
- Greenstein 1980, p. 345.
- SIAM 1962, p. 745.
- Robertson 1927, pp. 481–496.
- Robertson & Weyl 1929, pp. 716–725.
- Robertson 1928, pp. 749–752.
- Robertson 1929, pp. 163–164.
- Robertson 1934, pp. 794–801.
- "Einstein Versus the Physical Review," Physics Today, vol. 58, no. 9, p. 43, September 1, 2005. doi:10.1063/1.2117822 (John T. Tate, Sr. was the editor who sent the paper to Robertson for review.)
- "Reviewing Einstein," Science, vol. 349, no. 6244, p. 149, July 10, 2015.
- SIAM 1962, p. 746.
- Robertson 1928a, pp. 835–848.
- Slipher, V. M. (1913). "The Radial Velocity of the Andromeda Nebula". Lowell Observatory Bulletin 1: 56–57. Bibcode: 1913LowOB...2...56S.
- Slipher, V. M. (1915). "Spectrographic Observations of Nebulae". Popular Astronomy 23: 21–24. Bibcode: 1915PA.....23...21S.
- Robertson 1929a, pp. 822–829.
- Robertson 1938, pp. 101–104.
- Robertson 1937, pp. 423–438.
- Robertson, H. P. (1940, April). The invariant theory of isotropic turbulence. In Mathematical Proceedings of the Cambridge Philosophical Society (Vol. 36, No. 2, pp. 209–223). Cambridge University Press doi:10.1017/S0305004100017199
- SIAM 1962, pp. 742–743.
- Jones 1978, pp. 378–379.
- Greenstein 1980, p. 358.
- Jacobsen 2014, pp. 93–95.
- Greenstein 1980, p. 350.
- "In memoriam: Howard P. Robertson". The Summer at Caltech: 23. October 1961. http://calteches.library.caltech.edu/216/1/thesummer.pdf. .
- SIAM 1962, p. 743.
- "Finding Aid for the H. P. Robertson Papers 1922–1980". Online Archives of California. http://www.oac.cdlib.org/findaid/ark:/13030/kt3s2026qn.
- Greenspan, Nancy Thorndike (2005). The End of the Certain World: The Life and Science of Max Born. New York: Basic Books. ISBN 978-0-7382-0693-6. OCLC 56534998.
- Greenstein, Jesse L. (1980). "Howard Percy Robertson – January 27, 1903 – August 26, 1961". Biographical Memoirs 51: 343–364.
- Jacobsen, Annie (2014). Operation Paperclip: The Secret Intelligence Program that Brought Nazi Scientists to America. Little, Brown. ISBN 978-0-316-22105-4.
- Jones, Reginald Victor (1978). The Wizard War: British Scientific Intelligence, 1939–1945. Coward, McCann & Geoghegan. ISBN 9780698108967. https://archive.org/details/wizardwarbritish00jonerich.
- Physics Today (1961). "Howard P. Robertson". Physics Today 14 (11): 90. doi:10.1063/1.3057266.
- Rabi, I. I. (2006). "Stories from the Early Days of Quantum Mechanics". Physics Today 59 (8): 36–41. doi:10.1063/1.2349731. Bibcode: 2006PhT....59h..36R. https://semanticscholar.org/paper/9dcf91012920a95e172aa829afc62919b6892af8.
- Robertson, H. P. (1927). "Dynamical space-times which contain a conformal Euclidean-space". Transactions of the American Mathematical Society 29 (3): 481–496. doi:10.1090/S0002-9947-1927-1501400-9. Bibcode: 1927TrAMS..29..481R. https://thesis.library.caltech.edu/4823/1/Robertson_hw_1925.pdf.
- Robertson, H. P. (1928). "Bemerkung über separierbare Systeme in der Wellenmechanik" (in de). Mathematische Annalen 98 (1): 749–752. doi:10.1007/BF01451624. ISSN 0025-5831.
- Robertson, H. P. (1928). "On Relativistic Cosmology". The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science. 7 5 (31): 835–848. doi:10.1080/14786440508564528.
- Robertson, H. P.; Weyl, H. (1929). "On a problem in the theory of groups arising in the foundations of infinitesimal geometry". Bulletin of the American Mathematical Society 35 (5): 686–691. doi:10.1090/S0002-9904-1929-04801-8. ISSN 0273-0979.
- Robertson, H. P. (July 1929). "The Uncertainty Principle". Physical Review 34 (1): 163–164. doi:10.1103/PhysRev.34.163. ISSN 0031-899X. Bibcode: 1929PhRv...34..163R.
- Robertson, H. P. (1929). "On the Foundations of Relativistic Cosmology". Proceedings of the National Academy of Sciences 15 (11): 822–829. doi:10.1073/pnas.15.11.822. PMID 16577245. Bibcode: 1929PNAS...15..822R.
- Robertson, H. P. (November 1934). "An Indeterminacy Relation for Several Observables and Its Classical Interpretation". Physical Review 46 (9): 794–801. doi:10.1103/PhysRev.46.794. ISSN 0031-899X. Bibcode: 1934PhRv...46..794R.
- Robertson, H. P. (April 1937). "Dynamical effects of radiation in the solar system". Monthly Notices of the Royal Astronomical Society 97 (6): 423–438. doi:10.1093/mnras/97.6.423. Bibcode: 1937MNRAS..97..423R.
- Robertson, H. P. (1938). "Note on the preceding paper: The two body problem in general relativity". The Annals of Mathematics. 2 39 (1): 101–104. doi:10.2307/1968715. ISSN 0003-486X.
- Society for Industrial and Applied Mathematics (December 1962). "H. P. Robertson: 1903–1961". Journal of the Society for Industrial and Applied Mathematics 10 (4): 741–750. doi:10.1137/0110056.