He attended the Poltava Gymnasium secondary school, beginning his education there in 1809. He boarded in a house which offered accommodation for the "education of children of impoverished nobles". His tutor was Ivan Petrovych Kotlyarevsky (1769-1838), who made a name for himself as a writer, poet and social activist. Ostrogradski did not shine in his academic subjects at the Gymnasium. When the time came for him to leave, Ostrogradski expressed a wish to have a military career. Almost certainly Kotlyarevsky influenced him in this decision since he had served in the Imperial Russian Army, fighting in the Russo-Turkish war. However Ostrogradski's family was not wealthy and, despite their military traditions, it was felt that a soldier's pay was not good enough. Eventually it was decided that he should take up a career in the civil service and in order to obtain a high ranking position a university education was necessary. However, he did not have the necessary background to begin university studies so he attended lectures and studied on his own to gain the necessary expertise.
Ostrogradski entered the University of Kharkov in 1816 and, after a preparatory year, began to study physics and mathematics in 1817. Initially, he had not been particularly keen on studying at university and approached his studies with considerable reluctance. However, Andrei Fedorovich Pavlovsky (1789-1875) was one of his teachers and he noticed the extraordinary ability of the young man and was able to awaken in him an interest in science. Another who influenced Ostrogradski at this time was Timofei Fedorovic Osipovsky who was both a professor of mathematics and the rector of the University of Kharkov. In 1820 Ostrogradski took and passed the exams necessary for his degree but the minister of religious affairs and national education refused to confirm the decision and required him to retake the examinations. The problem appears to have been his mathematics professor Osipovsky, in the year 1820, was suspended from his post on religious grounds. The officials who made this decision made Osipovsky's pupil suffer too. Let us give some further details of this episode. In 1816 Prince Aleksandr Nikolaevich Golitsyn (1773-1844) was appointed Minister of Education and Minister of Religious Affairs. He carried out a religious crusade against "ungodly and revolutionary tendencies", requiring that science be taught from Christian principles. Kharkov, like other universities, received instructions on how to teach from a Christian viewpoint, demonstrating God's omniscience. In 1820, following Golitsyn's lead, Osipovsky was dismissed by the Curator of Kharkov University, Zakharii Iakovlevich Karneev (1747-1828), because of an alleged lack of fervour when saying "God lives" during an oral examination of a graduate student. This had a rather serious consequence for Ostrogradski who had been examined by Osipovsky in 1820, for, following Osipovsky's dismissal, the Ministry of Education refused to confirm the award of Ostrogradski's doctorate. They required him to retake the examinations (officially on the grounds that he had not attended lectures on philosophy and theology), but, knowing that the real reason was that he had been examined by Osipovsky, he refused to retake the examinations and never received the degree.
The leading mathematical centre in the world at this time was Paris and Ostrogradski made the bold decision to study there, arriving in May 1822. It had been a hard decision since his family did not approve and he had financial difficulties. To make matters even worse, he was robbed on the journey. Between 1822 and 1827, he attended lectures at the École Polytechnique, the Sorbonne, and the Collège de France, on mathematics, physics, mechanics, and astronomy. These were delivered by Louis Poinsot, Pierre-Simon Laplace, Joseph Fourier, Adrien-Marie Legendre, Siméon-Denis Poisson, Jacques Binet and Augustin-Louis Cauchy. Becoming friendly with these leading mathematicians, he made rapid progress and soon began to publish papers in the Paris Academy of Sciences. The first of these is Memoir on wave propagation in a cylindrical vessel (1826). His papers at this time show the influence of the mathematicians in Paris and he wrote on physics and the integral calculus. For example, he submitted his paper Démonstration d'un théorème du calcul intégral to the Paris Academy of Sciences on 13 February 1826. In this paper Ostrogradski states and proves the general divergence theorem. Gauss, nor knowing about Ostrogradski's paper, proved special cases of the divergence theorem in 1833 and 1839 and the theorem is now often named after Gauss. Victor Katz writes :-
Ostrogradski presented this theorem again in a paper in Paris on 6 August 1827, and finally in St Petersburg on 5 November 1828. The latter presentation was the only one published by Ostrogradski, appearing in 1831 in 'Note sur la Théorie de la Chaleur (1831).' The two earlier presentations have survived only in manuscript form, though they have been published in Russian translation.In fact many of Ostrogradski's papers which he wrote in Paris were later incorporated in a major work on hydrodynamics with he published in Paris in 1832. Other results which he obtained at this time on residue theory appeared in Cauchy's works. His time in Paris, however, did have its problems. Ostrogradski's father, unhappy that his son was spending so long abroad, stopped sending him money. Ostrogradski, unable to pay the bills for his accommodation, ended up badly in debt. He was taken to court for non-payment, but Cauchy, hearing of Ostrogradski's difficulties, paid off all his debts. Cauchy then managed to get Ostrogradski a position teaching at the Collège Henri IV (today called Lycée Henri-IV) so he could continue living in Paris. Kenneth May, reviewing , explains that the paper:-
... describes four manuscripts dating from Ostrogradski's Paris residence (1822-1827) and discovered by Yushkevich in the French Academy archives in 1963. The first two of those manuscripts (1824) are on definite integrals and document Ostrogradski's role in the development of Cauchy's method of residues. ... the third and fourth manuscripts (1826 and 1827) [have been] translated .... They include a special case of Green's theorem, a general development (the first such, according to Yushkevich) of the method of separation of variables, and the first solution of the problem of heat diffusion in a triangular prism.Ostrogradski left France and went to St Petersburg, arriving in the spring of 1828. Although he came to St Petersburg full of enthusiasm looking to create a research environment like he had experienced in Paris, nevertheless he was looked at with suspicion and distrust by the local police who put him under surveillance. However, he was greeted with enthusiasm by the St Petersburg mathematicians. He was appointed as a lecturer at the Naval Academy (actually called the Naval Corps at this time) in 1828. Later he gained additional teaching positions, at the Institute of Means of Communication beginning in 1830 and, two years later, he began teaching at the General Pedagogical Institute. He had a second visit to Paris in May 1830 being in the city at the time when there were street disorders and barricades were erected. This was the July revolution of 1830 and Ostrogradski seriously damaged one of his eyes towards the end of his visit. It appears that this was not as a result of any disturbances but rather that he was careless with a phosphorous match. He became blind in his right eye. He married Maria in 1831; they had three children, two daughters and a son. Ostrogradski loved to play with his children, jumping and running with them in a childlike way.
In St Petersburg, he presented three important papers on the theory of heat, double integrals and potential theory to the Imperial (St Petersburg) Academy of Sciences. Largely on the strength of these papers he was elected an academician in the applied mathematics section of the Academy. He was elected a junior academician in December 1828, promoted to associate academician in 1830, and finally became a full academician in 1832. Ostrogradski aimed high in his research and his objective was to provide a combined theory of hydrodynamics, elasticity, heat and electricity. He submitted a report to the Imperial Academy of Sciences in 1830 which contains the following remarkably ambitious aim (see ):-
The followers of Newton developed the great law of universal gravitation in detail and applied mathematical analysis to numerous important problems in general physics and physics of weightless substances. The collection of their works about the system of the universe forms the immortal folios of 'Celestial mechanics,' from which astronomers will take the elements for their tables for a long time. However, physical and mathematical theories are still not unified; they are distributed over numerous collections of academic memoirs and are investigated by different methods, often very doubtful and imperfect; moreover, there are theories developed but never presented. I set it as my aim to combine these theories, present them by using a uniform method, and indicate their most important applications. I already collected the necessary materials on the motion and equilibrium of elastic bodies, propagation of waves on the surface of incompressible liquids, and propagation of heat inside solid bodies and, in particular, inside the globe. However, these theories will constitute only a necessary part of the entire work, which will also embrace the distribution of electricity and magnetism in bodies capable of being electrified or magnetized through electrodynamic influence, motion of electric fluids, motion and equilibrium of liquids, capillarity action, distribution of heat in liquids, and probability theory; in this last part, I will dwell upon several issues in which the famous author of 'Celestial Mechanics' was apparently wrong.Of course this was far beyond what could be achieved by any one man but, by aiming at a grand scheme, he made major developments in a wide range of areas. He submitted Mémoire sur le Calcul des Variations des Integrales Multiples to the St Petersburg Academy of Sciences on 24 January 1834. This is an important work in the theory of partial differential equations and was reprinted in Crelle's Journal in 1836 and an English translation was made by Todhunter and published in 1861. In 1840 he wrote on ballistics introducing the topic to Russia. His important work on ordinary differential equations considered methods of solution of non-linear equations which involved power series expansions in a parameter alpha. Liouville had produced similar results. Also some of his results on heat were similar to results produced by Lamé and by Duhamel. He must be considered as the founder of the Russian school of theoretical mechanics. In addition to his important contributions to partial differential equations, he made significant advances to the theory of elasticity and to algebra publishing over 80 reports and giving lectures. His work on algebra was an extension of Abel's work on algebraic functions and their integrals.
From 1847 he was chief inspector for the teaching of mathematical sciences in military schools. He wrote many fine textbooks and established the conditions which allowed Chebyshev's school to flourish in St Petersburg. However, this huge contribution took up much of his time which he might otherwise have been able to devote to making further major progress in mathematical physics. Chebyshev wrote the following about Ostrogradski (see ):-
A man, without doubt, of brilliant mind, he did not accomplish even half of what he could have done if he were not "bogged down" with tiresome permanent pedagogic work.Victor Katz write in ;-
Unfortunately, some of [Ostrogradski's] most important discoveries appear to have been totally ignored, at least in Western Europe. Not only did he give the first generalization of the change-of-variable theorem to n variables, but he also first proved and later generalized the divergence theorem, wrote integrals of n-forms over n-dimensional "hypersurfaces," and ... gave the first proof of the change-of-variable theorem for double integrals using infinitesimal concepts. All of these results were eventually repeated by other mathematicians with no credit to Ostrogradski.Ostrogradski was a big tall man with a loud voice. He appearance was quite formidable, especially with the loss of his right eye, but had a cheerful character and an exceptionally sharp mind. He passionately loved his native land, its people, and its culture. He loved classical French and Russian literature although his language of choice when at home was always Ukrainian. He loved to recite the monologues of Molière and Corneille but his favourite writer was Taras Hryhorovych Shevchenko, the Ukrainian poet and writer. Ostrogradski knew many of Shevchenko's works by heart and often recited them. Ostrogradski met Shevchenko in 1858 when the poet came to stay with him. In fact Shevchenko records in his diary (see ):-
... we went together with Semen to M V Ostrogradski's. A great mathematician, he greeted me with open arms as a countryman and, apparently, a long-lost relative. Bless him. Ostrogradski with his family goes to Malorossia [Ukraine] in summer. He says he would invite Semen to come with him, but fears that in the whole of the Poltava Guberniia there would not be enough bacon for his needs.Semen, who is mentioned in this quote, is Semen Hulak-Artemovski 1813-1873), a famous Ukrainian composer and opera singer.
Finally let us mention the remarkable work that Ostrogradski did on insurance towards the end of his life. The circumstances are interesting and were described by Aleksei Nikolaevich Krylov (see ):-
In 1856, in accord with the Paris treatise, Russia was deprived of the right to have a fleet on the Black Sea. A large number of office workers had to be fired, and, to improve their circumstances, it was decided to establish a retirement fund at the Naval Department, and to begin paying pensions in 1859. Life insurance was then a novelty, and calculations connected with the work of the retirement funds, or with determining the amount of pensions in accord with the pertinent deductions from wages were known still less. For this reason, both mathematicians who were members of the St Petersburg Academy of Sciences, Ostrogradski and Bunyakovsky, were included in the committee charged with drawing up a charter of the fund. They have indeed made all the necessary calculations and provided their theoretical justification. The transactions of the committee were published without delay; they contain a remarkable note by Ostrogradski ...We note that the Treaty of Paris of 1856 ended the Crimean war which Russia fought against Turkey supported by Britain and France. It was a war renowned for the incompetence of both sides. It must have pained Ostrogradski greatly to see Russia and France on opposing sides.
Always a Ukrainian at heart, Ostrogradski specified in his will that he should be buried in his home village of Pashennaya. In the summer of 1861, when he was bathing, it was noticed that he had an abscess on his back. He was operated on and the abscess was removed but his health rapidly deteriorated and he died in the January of the following year. We note that some sources give his date of death as 1861, rather than 1862, since the old style calendar date was 20 December 1861. His wishes were carried out and he was buried in the family vault at Pashennaya.
Article by: J J O'Connor and E F Robertson