French mathematician Paul (Émile) Appell (1855-1930).
School period
College/University
Gallery of Paul Appell
Appell entered the École Normale Supérieure in Paris in 1873 and graduated in first place in 1876 with a doctorate in mathematics.
Career
Gallery of Paul Appell
Paul Appell, rector of the Paris Academy, at his office: press photograph.
Gallery of Paul Appell
French mathematician Paul (Émile) Appell (1855-1930).
Gallery of Paul Appell
Reception at the Sorbonne of Rudyard Kipling and Frazer, English writers: from left to right, Frazer, Kipling and Appell, rector at the Sorbonne: press photograph.
Achievements
French mathematician Paul (Émile) Appell (1855-1930).
Reception at the Sorbonne of Rudyard Kipling and Frazer, English writers: from left to right, Frazer, Kipling and Appell, rector at the Sorbonne: press photograph.
Paul Émile Appel was a French mathematician and physicist. He is noted for his scientific work that consisted of a series of brilliant solutions of particular problems, some of the greatest difficulty. He is particularly regarded for defining a series of functions that are now called the Appell polynomials.
Background
Paul Émile Appel was born on September 27, 1855, in Strasbourg, France to Jean-Pierre Appell and Elizabeth Müller, who were Catholic Alsatians ardently loyal to revolutionary France. The family lived in a corner of the great Ritterhus, formerly a knightly lodge, where the master-dyer father and two sons by a previous marriage managed production while the mother, her sister, and a stepdaughter tended the store.
His character was forged by a forced move from the Ritterhus in 1866, his father’s death in 1867, transfer from a religious school to the lycée at his own insistence in 1869, bitter experiences in the siege of Strasbourg in 1870, and a close relationship with the younger of his half brothers, Charles, who served in the Foreign Legion, fought as an irregular in 1870-1871, and in 1889 was sentenced to ten years’ confinement for anti-German activities.
Education
When Appell went to Nancy in 1871 to prepare for the university and to assume French citizenship in 1872, he was carrying the hopes of his family, who remained behind in Strasbourg as German subjects. Blessed with unbounded energy, this attractive outsider with an accent moved rapidly toward the inner circles of French mathematics. At Nancy, he and Henri Poincaré formed a friendship that lasted until the latter’s death. In 1873 he entered the École Normale, from which he graduated first in the class of 1876, three months after earning his doctorate.
After getting his Ph.D. degree from the École Normale, from which he graduated first in the class of 1876, from this time on, Appell maintained an amazing level of activity in teaching, research, editing, and public service. He typically held several teaching posts at the same time, including the chair of mechanics at the Sorbonne from 1885. He was elected to the Académie des Sciences in 1892. He served as dean of the Faculty of Science of the University of Paris from 1903 to 1920 and as rector from 1920 to 1925. In various government posts, including membership in the Conseil Supérieure d’instruction Publique, he was an exponent of educational reform and initiator of numerous large-scale projects, including the Cité Universitaire.
During World War I he founded and led the Secours National, a semiofficial organization uniting all religious and political groups to aid civilian victims. He described the return of the tricolor to Alsace as the fulfillment of his “lifelong goal” and felt that Germany had been treated too easily. He served as secretary-general of the French Association for the League of Nations.
Appell’s first paper (1876) was his thesis on projective geometry in the tradition of Chasles, but at the suggestion of his teachers, he turned to algebraic functions, differential equations, and complex analysis. He generalized many classical results (e.g., the theories of elliptic and of hypergeometric functions) to the case of two or more variables. From the first his work was close to physical ideas. For example, in 1878 he noted the physical significance of the imaginary period of elliptic functions in the solution of the pendulum problem and thus showed that double periodicity follows from physical considerations. In 1880 he wrote on a sequence of functions (now called the Appell polynomials) satisfying the condition that the derivative of the nth function is n times the previous one.
In 1885 Appell was awarded half the Bordin Prize for solving the problem of “cutting and filling” (debíais el remblais) originally posed by Monge: To move a given region into another of equal volume so as to minimize the integral of the element of volume times the distance between its old and new positions. In 1889 he won second place (after Poincaré) in a competition sponsored by King Oscar II of Sweden: To find an effective method of calculating the Fourier coefficients in the expansion of quadruply periodic functions of two complex variables.
The flow of papers continued, augmented by treatises, textbooks, and popularizations and seemingly unaffected by other responsibilities. Although Appell never lost his interest in “pure” analysis and geometry, his activity continued to shift toward mechanics, and in 1893 Volume I of the monumental Traite de mécanique rationnelle appeared. Volume V (1921) included the mathematics required for relativity, but the treatise is essentially an exposition of classical mechanics of the late nineteenth century. It contains many of Appell’s contributions, including his equations of motion valid for both holonomic and non holonomie systems, which have not displaced the classical Lagrangian system in spite of undoubted advantages.
It is difficult to do justice to Appell’s work because it lacks central themes, seminal ideas, and dramatic results. Indeed, his scientific work consists of a series of brilliant solutions of particular problems, some of the greatest difficulty. He was a technician who used the classical methods of his time to answer open questions, work out details, and make natural extensions in the mainstream of the late nineteenth century; but his work did not open new doors, as he hoped. On the contrary, he does not seem to have looked down any of the new paths that were leading to a period of unbridled abstraction and generalization. During the last half of his career he was a pillar of a backward-looking establishment that was to give way to Nicolas Bourbaki, a namesake of a general who was one of his boyhood heroes.
Appell died on the 24th of October, 1930 in Paris.
Paul Appell was a prominent mathematician whose contribution in the field of science greatly valued as of today. One of his great achievements came in 1880, when Appell defined a series of functions satisfying the condition that the derivative of the nth function is n times the (n - 1)th function. These are now called the Appell polynomials. In 1885 he was awarded half of the Bordin Prize for solving Monge's problem.
Although Appell is mostly known as a geometer, he also made some valuable research in the field of mechanics, which is vivdly shows in his monumental Traite de mécanique rationnelle that appeared in 1893. Volume V of this work (1921) included the mathematics required for relativity, but the treatise is essentially an exposition of classical mechanics of the late nineteenth century. It contains many of Appell’s contributions, including his equations of motion valid for both holonomic and non holonomie systems, which have not displaced the classical Lagrangian system in spite of undoubted advantages.
He was also successful in his social endevours as well. For example, during World War I Appell founded the Secours National, a semi-official organisation involving all political and religious groups, which gave help to civilian victims of the war. After the war Appell had the ambition of his life fulfilled when his homeland of Alsace was returned to France. Also following the war the League of Nations was set up by the Allies at the Paris Peace Conference in 1919, and Appell served as secretary-general for the French Association during the 1920s when the League had its headquarters at Geneva.
Appell was an atheist. His parents were Catholic Alsatians ardently loyal to revolutionary France. Consequently, Paul accepted the family ambition and patriotism but rejected Catholic piety.
Views
Appell was one of the finest problem solvers there has been in mathematics. However, he solved these problems using existing techniques and therefore his work had little lasting impact other than that the problem itself had been solved.
Quotations:
In 1925 Appell wrote: “I always had little taste for developing general theories and preferred to study limited and precise questions that might open new paths”.
Membership
Appell was a member and the President of the Société astronomique de France (SAF), the French astronomical society, from 1919-1921.
Connections
ln 1881 Appell married Amelie, daughter of the archaeologist Alexandre Bertrand, niece of the mathematicians Joseph Bertrand and Charles Hermité, and a cousin of Appell’s classmate and friend Émile Picard. Their son became a deputy and undersecretary of state. Two of their three daughters married the academicians Émile Borel and J. E. Duclaux. The household included Paul’s mother, who had joined him in 1877 and remained until her death in 1902.
In his Souvenirs he described his life as “flowing tranquilly between teaching, mathematical work and vacations in Alsace” at the maternal home in Klingenlhal, but he found energy to support vigorously the movement for women’s rights, to carry from Alsace his brother’s reports destined for the French War Office, and to defend his fellow Alsatian Dreyfus and serve on an expert commission whose ruling played a key role in his final rehabilitation.
Father:
Jean-Pierre Appell
Mother:
Elizabeth Müller
Daughter:
Marguerite Appell 1883–1969
His daughter Marguerite Appell (1883–1969), who married the mathematician Émile Borel, is known as a novelist under her pen-name Camille Marbo.
