Kanakanahalli Ramachandra

Kanakanahalli Ramachandra (18 August 1933 – 17 January 2011) was an Indian mathematician working in both analytic number theory and algebraic number theory.

Kanakanahalli Ramachandra
Born (1933-08-18) 18 August 1933
Mandya, Mysore Princely State
NationalityIndian
Alma materUniversity of Bombay
Scientific career
FieldsMathematics
InstitutionsTata Institute of Fundamental Research National Institute of Advanced Studies
Doctoral advisorK. G. Ramanathan
Doctoral studentsT. N. Shorey
Ramachandran Balasubramanian
Other notable studentsAtiyolil Venugopalan

Early career

After his father's death at age 13, he had to look for a job. Ramachandra worked as a clerk at the Minerva Mills where Ramachandra's father had also worked. In spite of taking up a job quite remote from mathematics, Ramachandra studied number theory all by himself in his free time; especially the works of Ramanujan.

Ramachandra completed his graduation and post graduation from Central College, Bangalore.

Later, he worked as a lecturer in BMS College of Engineering. Ramachandra also served a very short stint of only six days as a teacher in the Indian Institute of Science, Bangalore.

Ramachandra went to the Tata Institute of Fundamental Research (TIFR), Bombay, for his graduate studies in 1958. He obtained his PhD from University of Mumbai in 1965; his doctorate was guided by K. G. Ramanathan.[1]

Later career

Between the years 1965 and 1995 he worked at the Tata Institute of Fundamental Research and after retirement joined the National Institute of Advanced Studies, Bangalore where he worked till 2011, the year he died. During the course of his lifetime, he published over 200 articles, of which over 170 have been catalogued by Mathematical Reviews.

His work was primarily in the area of prime number theory, working on the Riemann zeta function and allied functions. Apart from prime number theory, he made substantial contributions to the theory of transcendental number theory, in which he is known for his proof of the six exponentials theorem, achieved independently of Serge Lang. He also contributed to many other areas of number theory.

In 1978 he founded the Hardy–Ramanujan journal, and published it on behalf of the Hardy–Ramanujan society until his death.

Awards and distinctions

  • Elected President of the Calcutta Mathematical Society for the period; 2007–2010[2]
  • Elected Vice-President of the Calcutta Mathematical Society for the period; 2000–2003[3]
  • Meghnad Saha Award, UGC, Hari Om Trust (1976)[3]
  • Srinivasa Ramanujan Birth Centenary Award ISCA ; 1994–1995[3]
  • Srinivasa Ramanujan Medal; 1997.
  • Sir.M.Vishveshwaraya Award of KSCST; 1997[3]
  • Editor of Hardy-Ramanujan Journal[3]

Publications

  • Ramachandra, K. (1969), Lectures on transcendental numbers, The Ramanujan Institute Lecture Notes, 1, The Ramanujan Institute, Madras, MR 0260678
  • Ramachandra, K. (1995), On the mean-value and omega-theorems for the Riemann zeta-function, Tata Institute of Fundamental Research Lectures on Mathematics and Physics, 85, Published for the Tata Institute of Fundamental Research, Bombay, ISBN 978-3-540-58437-7, MR 1332493
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References

  1. http://genealogy.math.ndsu.nodak.edu/id.php?id=98044
  2. http://www.ams.org/notices/201010/rtx101001335p.pdf.
  3. http://59.90.235.217/faculty-kramachandra.php.
  • Sinha, Nilotpal Kanti (2011), On the half line: K. Ramachandra, arXiv:1209.3934, Bibcode:2012arXiv1209.3934K
  • Waldschmidt, Michel (2006), "On Ramachandra's contributions to transcendental number theory", The Riemann zeta function and related themes: papers in honour of Professor K. Ramachandra, Ramanujan Math. Soc. Lect. Notes Ser., 2, Mysore: Ramanujan Math. Soc., pp. 155–179, MR 2335194
  • Ramachandra, K (1967/68), Contributions to the theory of transcendental numbers. I, II., 14, Acta Arith., pp. 65–72 Check date values in: |year= (help)
  • Erdös, P; Babu, G. Jogesh; Ramachandra, K (1976), An asymptotic formula in additive number theory, 28, Acta Arith., pp. 405–412
  • Walschmidt, Michel (2011), K Ramachandra: Mathematical reminisces (PDF)
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