Yegor Ivanovich Zolotarev

Yegor was born as a son of Agafya Izotovna Zolotareva and the merchant Ivan Vasilevich Zolotarev in Saint Petersburg, Imperial Russia. In 1857 he began to study at the fifth St Petersburg gymnasium, a school which centred on mathematics and natural science. He finished it with the silver medal in 1863. In the same year he was allowed to be an auditor at the physico-mathematical faculty of St Petersburg university.

He had not been able to become a student before 1864 because he was too young. Among his academic teachers were Somov, Chebyshev and Korkin, with whom he would have a tight scientific friendship. In November 1867 he defended his Kandidat thesis “About the Integration of Gyroscope Equations”, after 10 months there followed his thesis pro venia legendi About one question on Minima. With this work he was given the right to teach as a private lecturer at St Petersburg university.

He first lectured on differential calculus to science students (until summer 1871), later integral calculus and analysis to beginners of mathematics. Except for a short pause he lectured on elliptic functions to students of higher semesters during his whole job as lecturer and professor.

In December 1869, Zolotarev defended his master's thesis “About the Solution of the Indefinite Equation of Third Degree x³ + Ay³ + A²z³ - 3Axyz = 1”.

He took his first trip abroad in 1872 and visited Berlin and Heidelberg. In Berlin he attended Weierstrass' "theory of analytic functions", in Heidelberg Koenigsberger's.

In 1874, Zolotarev become a member of the university staff as a lecturer and in the same year he defended his doctoral thesis “Theory of Complex Numbers with an Application to Integral Calculus”. The problem Zolotarev solved there was based on a problem Chebyshev had posed earlier, the representation of expressions of the form

${\displaystyle \int {\frac {x+A}{\sqrt {x^{4}+ax^{3}+bx^{2}+cx+d}}}\,dx}$

by logarithms. This was a question Chebyshev had been interested in since the beginning of his research, but he was unable to solve it without the help of elliptic functions.

Starting at the beginning of the winter semester 1876 Zolotarev was appointed extraordinary professor, and after the death of academician Somov he became his successor as an adjunct of the Academy of Sciences.

Egor Ivanovich Zolotarev's steep career ended abruptly with his early death. He was on his way to his dacha when he was run over by a train in the Tsarskoe Selo station. On July 19, 1878 he died from blood poisoning.

Yegor Ivanovich is not to be confused with the probabilist Vladimir Mikhaelovich Zolotarev, Kolmogorov's disciple, who worked on stable distributions with well known results on their parametrization.[1][2]

• Zolotareff G. (1872). "Nouvelle démonstration de la loi de réciprocité de Legendre" (PDF). Nouvelles Annales de Mathématiques. 2e série. 11: 354–362.
• Zolotareff G. (1872). "Sur la méthode d'intégration de M. Tchébychef". Math. Ann. 5 (4): 560–580. doi:10.1007/BF01442910.
• Korkine A., Zolotareff G. (1872). "Sur les formes quadratiques positives quaternaires". Math. Ann. 5 (4): 581–583. doi:10.1007/BF01442912.
• Korkine A., Zolotareff G. (1873). "Sur les formes quadratiques". Math. Ann. 6 (3): 366–389. doi:10.1007/BF01442795.
• Korkine A., Zolotareff G. (1877). "Sur les formes quadratiques positives". Math. Ann. 11 (2): 242–292. doi:10.1007/BF01442667.
• Zolotareff E. I. (1874). "Sur la méthode d'intégration de M. Tchébychef". Jour. De Math. Pures et Appl. 2e Série. 16: 161–188.
• Zolotareff E. I. (1880). "Sur la thèorie des nombres complêxes". Jour. De Math. Pures et Appl. 3e Série. 6: 51–84, 129–166.

• Zolotarev's lemma

• O'Connor, John J.; Robertson, Edmund F., "Yegor Ivanovich Zolotarev", MacTutor History of Mathematics archive, University of St Andrews.