Augustin-Louis Cauchy
Augustin-Louis Cauchy (Paris, August 21 1789 – Sceaux, May 23, 1857) was one of the most prominent mathematicians of the first half of the 19th century. He was the first to give a rigorous basis to the concept of limits. He established a convergence criterion for sequences of the type that are now called Cauchy sequences. The Cauchy condition for the convergence of series can be found in any present-day textbook on calculus. Probably Cauchy is most famous for his singlehanded development of complex function theory, with Cauchy's residue theorem as the fundamental result.
Cauchy was a prolific writer, he wrote more than 800 research articles and five complete textbooks. He was a devout Roman Catholic, strict (Bourbon) royalist, and a close associate of the Jesuit order.
Biography
Cauchy's father (Louis-François Cauchy) was a high official in the Parisian Police of the Old Régime. He lost his position because of the French Revolution (July 14, 1789) that broke out one month before Augustin-Louis was born. This fact is sometimes seen as the cause of the deep hatred of the French Revolution that Cauchy felt all through his life. The Cauchy family survived the revolution and the following Reign of Terror (1794) by escaping to Arcueil, where Cauchy jr. got his first education from his father. After the death of Robespierre (1794) it was safe for the family to return to Paris, where Cauchy sr. found himself a new bureaucratic job and where he quickly moved up the ranks. When Napoleon Bonaparte came to power (1799) Cauchy sr. made further promotion to Secretary-General of the Senate working directly under Laplace, who is now better known for his work on mathematical physics. Also the famous mathematician Lagrange was no stranger to the Cauchy family.
On Lagrange's advice Augustin-Louis was enrolled in the École Central du Panthéon in the fall of 1802. This was the best secondary school of Paris at that time. Most of the curriculum consisted of classical languages and the young ambitious Cauchy, being a brilliant student, won many prizes in Latin and Humanities. In spite of these successes, Augustin-Louis decided for an engineering career and prepared himself for the entrance examination to the École Polytechnique. In 1805 he became second out of 293 applicants on this exam, and was, of course, admitted. One of the main purposes of this school was to give future civil and military engineers a high-level scientific and mathematical education. The school functioned under military discipline, which caused the young pious Cauchy some problems in adapting. Nevertheless, he finished the Polytechnique in 1807 at the age of 18 and went on to the École des Ponts et Chaussées (School for Bridges and Highways). He graduated in civil engineering with the highest honors.
After finishing school in 1810 Cauchy accepted a job as junior engineer in Cherbourg, where Napoleon intended to build a naval port. Here Augustin-Louis stayed three years and although he had an extremely busy managerial type job, he still found time to prepare three mathematical manuscripts, which he submitted to the Première Classe of the Institut de France. (In the revolutionary years the French Académie des Sciences was known as the "First Class of the Institut"). Cauchy's first two manuscripts (on polyhedra) were accepted, the third one (on directrixes of conic sections) was rejected.
In September 1812, 23 years old, Cauchy returned to Paris after becoming ill from being overworked. Another reason for his return to the capital was that he was losing his interest in his engineering job, being more and more attracted to abstract beauty of mathematics. In Paris he would have a much better chance to find a mathematics related position. Formally he kept his engineering position, although he was transferred from the payroll of the Ministry of the Marine to the Ministry of the Interior. The next three years Augustin-Louis was mainly on unpaid sick leave from his engineering job, but he spent his time quit fruitfully on mathematics (on the related topics of symmetric functions, the symmetric group and the theory of higer-order algebraic equations). He tried to be admitted to the First Class of the Institut, but failed on three different occasions between 1813 and 1815. In 1815 Napoleon was defeated at Waterloo and the newly installed Bourbon king Louis XVIII (a brother of the beheaded Louis XVI) took the restauration in hand. The Académie des Sciences was re-established in March 1816, Carnot and Monge were removed for political reasons and the king appointed Cauchy to take the place of one of them. Judgement by Cauchy's peers was harsh, they considered this acceptance of membership of the Academy an outrage and Cauchy created many enemies in scientific circles.
In November 1815, Poinsot, who was an associate professor at the École Polytechnique, asked to be exempted from his teaching duties because of health reasons. Cauchy was by then a rising mathematical star who certainly merited a professorship. One of his great successes at that time was the proof of Fermat's polygonal number theorem. However, the fact that Cauchy was known to be very loyal to the Bourbons, helped him no doubt in becoming the successor of Poinsot. So, Augustin-Louis finally quit his engineering job and received a one-year contract for teaching math to second-year students. In 1816 the Bonapartist, a-religious École Polytechnique was reorganized and several liberal professors were fired. The reactionary Cauchy was promoted to full professor.
(To be continued)
Reference
Bruno Belhoste, Augustin-Louis Cauchy: a biography, translated from the French by F. Ragland, Springer, New York (1991). ISBN 0-387-97220-X
External links
- Biography at MacTutor History of Mathematics, John J. O'Connor and Edmund F. Robertson, School of Mathematics and Statistics, University of St Andrews, Scotland.