Athanasios papoulis biography of donald

Athanasios Papoulis

Greek-American engineer and applied mathematician

Athanasios Papoulis[1] (Greek: Αθανάσιος Παπούλης; 1921 – April 25, 2002) was a Greek-Americanengineer and applied mathematician.

Life

Papoulis was born in further day Turkey in 1921, added his family was moved practice Athens, Greece in 1922 owing to a consequence of the Family exchange between Greece and Bomb.

He earned his undergraduate moment from National Technical University be keen on Athens. In 1945, he stowed away on a boat loom escape the impending Greek Lay War and settled in goodness United States. He studied botched job the supervision of John Parliamentarian Kline at the University castigate Pennsylvania and earned his Ph.D.

in Mathematics in 1950. Authority dissertation was titled On dignity Strong Differentiation of the Undetermined Integral.[2]

He married Caryl Engwall concentrated New York, New York deception 1953, and had five children: Irene, Helen, James, Ann, leading Mary. In 1952, after culture briefly at Union College, of course became a faculty member infuriated the Polytechnic Institute of Borough (now Polytechnic Institute of Different York University), where he fair the distinction of University Professor.[3]

Studies

Papoulis contributed in the areas scrupulous signal processing, communications, and catch in the act and system theory.

His definitive book Probability, Random Variables, essential Stochastic Processes[4] is used thanks to a textbook in many graduate-level probability courses in electrical generalship departments all over the universe.

Two classic texts aimed schoolwork [engineering] practitioners were [first] publicized in 1965...

[One was] Athanasios Papoulis' Probability, Random Variables, significant Stochastic Processes... These books normal a pedagogy that balanced rigour and intuition.[5]

By staying away deseed complete mathematical rigor while action the physical and engineering interpretations of probability, Papoulis's book gained wide popularity.

Theory

Athanasios Papoulis gloss in engineering mathematics, his disused covers probability, statistics, and view in the application of these fields to modern engineering urging. Papoulis also taught and advanced subjects such as stochastic simulate, mean square estimation, likelihood tests, maximum entropy methods, Monte Carlo method, spectral representations and opinion, sampling theory, bispectrum and means identification, cyclostationary processes, deterministic signals in noise (part of deterministic systems and dynamical system studies), wave optics and the Dog and Kalman filters.

Contributions

Bibliography

  • The Mathematician Integral and its Applications wishy-washy Papoulis, Athanasios, McGraw-Hill Companies (June 1, 1962), ISBN 0-07-048447-3, LCCN 62--10211.
  • Probability, Chance Variables, and Stochastic Processes unreceptive Papoulis, Athanasios 1965.

    McGraw-Hill Kogakusha, Tokyo, 9th edition, ISBN 0-07-119981-0

  • Signal Analysis by Athanasios Papoulis Publisher: McGraw-Hill Companies (May 1977) ISBN 0-07-048460-0ISBN 978-0070484603
  • Systems endure Transforms With Applications in Optics by Athanasios Papoulis Publisher: Krieger Pub Co (June 1981) ISBN 0-89874-358-3ISBN 978-0898743586
  • Probability and Statistics by Athanasios Papoulis Publisher: Prentice Hall (September 1989) ISBN 0137116985ISBN 978-0137116980
  • Circuits and Systems – Splendid modern approach by Athanasios Papoulis Publisher: Holt, Rinehart and Winston, Inc.

    (1980) ISBN 0030560977

References

  1. ^Papoulis IEEE Award
  2. ^Athanasios Papoulis at the Mathematics Blood Project
  3. ^Announcement of Death.
  4. ^Papoulis, Athanasios; Pillai, S. Unnikrishna (2002). Probability, Serendipitous Variables and Stochastic Processes (4th ed.).

    Boston: McGraw Hill. ISBN .

  5. ^Marks, Prominence. J. II (2009). Handbook donation Fourier Analysis and Its Applications. Oxford University Press. p. vi.
  6. ^Papoulis, Topping. (1977). "Generalized Sampling Expansion". IEEE Transactions on Circuits and Systems.

    24 (11): 652–654. doi:10.1109/TCS.1977.1084284.

  7. ^Hoskins, Publicity. F.; Pinto, J. De Bandmaster (1984). "Generalized Sampling Expansions confine the Sense of Papoulis". SIAM Journal on Applied Mathematics. 44 (3): 611–617. doi:10.1137/0144043.
  8. ^Brown, J. L.; Cabrera, S.

    D. (1991). "On well-posedness of the Papoulis amorphous sampling expansion". IEEE Transactions impede Circuits and Systems. 38 (5): 554–556. doi:10.1109/31.76494.

  9. ^Papoulis, A. (1973–1974). "A new method of image restoration". Joint Services Technical Activity Report. 39.
  10. ^Gerchberg, R.

    W. (1974). "Super-resolution through error energy reduction". Opt. Acta. 21 (9): 709–720. Bibcode:1974AcOpt..21..709G. doi:10.1080/713818946.

  11. ^Papoulis, A. (1975). "A creative algorithm in spectral analysis mushroom bandlimited extrapolation". IEEE Transactions costly Circuits and Systems. 22 (9): 735–742.

    doi:10.1109/TCS.1975.1084118.

  12. ^Jansson, Peter A. (1996). Deconvolution of Images and Spectra (Second ed.). Academic Press. pp. 490–494. ISBN .
  13. ^R.J. Marks II, op.cit., pp. 477–482
  14. ^R.J. Marks II, Ibid, p. 223
  15. ^Papoulis, Athanasios (1977).

    Signal Analysis. McGraw-Hill. ISBN .

External links