Viktor Yakovlevich Bunyakovsky


Quick Info

Born
16 December 1804
Bar, Russian Empire, (now Ukraine)
Died
12 December 1889
St Petersburg, Russia

Summary
Viktor Bunyakovsky worked on Number Theory as well as geometry, mechanics and hydrostatics. He discovered the Cauchy-Schwarz inequality 25 years before Cauchy or Schwarz.

Biography

Viktor Yakovlevich Bunyakovsky's father, Yakov Vasilievich Bunyakovsky, was a colonel. Bunyakovsky was first educated at home and then went abroad, obtaining a doctorate from Paris in 1825 after working under Cauchy. Bunyakovsky submitted three doctoral theses in the spring of 1825. The first two were submitted together: Rotary motion in a resistant medium of a set of plates of constant thickness and defined contour around an axis inclined with respect to the horizon and Determination of the radius-vector in elliptical motion of planets. The third Heat propagation in solids was submitted later and accepted three weeks after the first two. More details of these works are given in [4], see also [5].

In 1826 Bunyakovsky left Paris and returned to St Petersburg. In this he played an important role in the development of mathematics in the Russian Empire for he brought back with him an expertise in applying Cauchy's theory of residues which were at that time unknown in the Russia Empire. See [5] for details. He also brought French probabilistic ideas which formed a basis for the development of probability in the Empire prior to the work of Chebyshev; details are given in [9].

Bunyakovsky studied and taught in St Petersburg for many years. He taught at a number of different institutions in St Petersburg, including the First Cadet Corps, the Communications Academy and later the Naval Academy. The courses he offered were on mathematics and mechanics. He was a professor at the University in St Petersburg from 1846 until 1880. His scientific research work, however, was not done at these institutions, but was carried out at the St Petersburg Academy of Sciences.

Two years after his return to St Petersburg from Paris, Bunyakovsky became an adjunct in mathematics at the Academy, then he was named an extraordinary academician in 1830 (here extraordinary means the same as in the German system, the equivalent of an associate professor in the present American system). Then in 1841 he was promoted to an ordinary academician at the Academy. In 1864 he became vice-president of the St Petersburg Academy of Sciences, a post which he held until his death.

Bunyakovsky published over 150 works on mathematics and mechanics. He is best known for his discovery of the Cauchy-Schwarz inequality, published in a monograph in 1859 on inequalities between integrals. This is twenty-five years before Schwarz's work. In the monograph Bunyakovsky gave some results on the functional form of the inequality. There are many reasons why certain theorems are not named after their discoverer but after a later rediscoverer. However, in the case of Bunyakovsky there seems no good reason at all why he should not have the credit for his discovery. One would have to note, however, that the terminology of mathematics is not universal and in some countries his theorem is correctly named, or named after Cauchy, Bunyakovsky and Schwarz. A history of the Cauchy-Bunyakovsky-Schwarz inequality is given in [8].

Bunyakovsky worked on number theory, geometry and applied mathematics. His work in number theory was important and he gave a new proof of Gauss's law of quadratic reciprocity. Dickson, in his book on the history of number theory, gives 40 references to papers of Bunyakovsky. In 1846 Bunyakovsky wrote a number theory work [1]:-
... in which he gave an original exposition of this science and its application to insurance and demography.
Bunyakovsky also worked on geometry. In 1853 he examined Euclid's fifth postulate, giving a critical account of previous attempts to prove it. He then attempted his own proof, unaware that Lobachevsky had invented non-euclidean geometry 25 years before and, although it was published, it had been rejected by Ostrogradski when it had been submitted for publication in the St Petersburg Academy of Sciences.

His work in applied mechanics and hydrostatistics are probably not his most important, but are still a good contribution to the subject. His 1846 book on probability Foundations of the mathematical theory of probability is usually recognised as providing the development of Russian probabilistic terminology. Bunyakovsky's book also attempts to make Laplace's Théorie analytique des probabilites (1812) more accessible.

Bunyakovsky is remembered in many ways other than for the formula which fails to bear his name. A medal and prize was instituted by the St Petersburg Academy of Sciences in 1875 for outstanding mathematical work. For example Voronoy is one of the recipients of the prize.


References (show)

  1. A T Grigorian, Biography in Dictionary of Scientific Biography (New York 1970-1990). See THIS LINK.
  2. K A Andreev, V Y Bunyakovsky (Kharkov, 1890).
  3. V E Prudnikov, V Y Bunyakovsky, Scientist and Teacher (Moscow, 1954).
  4. N S Ermolaeva, V Ya Bunyakovskii's doctoral dissertation (Russian), Istor.-Mat. Issled. 29 (1985), 241-255, 348.
  5. V S Kirsanov, V Ya Bunyakovskii's dissertation and Cauchy's theory of residues (Russian), Istor.-Mat. Issled. 28 (1985), 261-266, 350.
  6. F P Otradnyh, V Ya Bunyakovskii - professor in the Petersburg university (Russian), Vestnik Leningrad. Univ. 10 (5) (1955), 49-54.
  7. V E Prudnikov, On essays by P L Chebyshev, M V Ostrogradskii, V Ya Bunyakovskii, and I I Somov in the 'Encyclopaedic dictionary' compiled by Russian scholars and literati (Russian), Istor.-Mat. Issled. 6 (1953), 223-237.
  8. P Schreiber, The Cauchy- Bunyakovsky- Schwarz inequality, in Hermann Grassmann, Lieschow, 1994 (Greifswald, 1995), 64-70.
  9. O B Sheynin, On V Ya Buniakovsky's work in the theory of probability, Arch. Hist. Exact Sci. 43 (3) (1991), 199-223.
  10. Yu F Zhang, F X Bao and X L Fu, The origin and development of the Cauchy- Bunyakovskii inequality (Chinese), Qufu Shifan Daxue Xuebao Ziran Kexue Ban 21 (1) (1995), 83-86.

Additional Resources (show)


Written by J J O'Connor and E F Robertson
Last Update July 2000