The newly created country of Italy suffered many problems but it also had a new confidence in education from which Cesàro benefited in his early years. He studied at the Gymnasium in Naples for a year but after completing the first class he went to a seminary in Nola where he studied for two years. Returning to the Gymnasium in Naples he completed another year there graduating from the fourth class in 1872. His elder brother Guiseppe had been in Liège since 1867. In 1873 Cesàro's father sent him to join Guiseppe who was by that time a lecturer in mineralogy and crystallography at the École des Mines in Liège. Cesàro entered the École des Mines as a student but, preferring to study in Italy, made application for a university place there. His applications were unsuccessful so he had to remain at the École in Liège where he studied mathematics with Catalan.
Cesàro returned to Torre Annunziata in Italy for a number of years after the death of his father in 1879. Back in Italy he married Angelina, who was a close relation. The death of Cesàro's father had given the family even more financial problems than they had before, but eventually Cesàro won a scholarship to allow him to study further at Liège and in 1882 he returned to Belgium to continue his studies. Catalan helped him to publish his first mathematical paper Sur diverses questions d'arithmétique which was published in 1883.
Sur diverses questions d'arithmétique was the first of a series which Cesàro wrote on the theory of numbers. Nine further papers by him on this topic appeared by 1885. They looked at problems concerning :-
... the number of common divisors of two numerals, determination of the values of the sum totals of their squares, the probability of incommensurability of three arbitrary numbers, and so on; to these he attempted to apply obtained results in the theory of Fourier series.Cesàro visited Paris during the period of his studies at Liège and there he attended lectures by Hermite, Darboux, Serret Briot, Bouquet and Chasles at the Sorbonne. Hermite in particular was interested in the results which Cesàro had obtained and he quoted these in his own work of 1883. Cesàro was particularly interested in lectures he attended given by Darboux on geometry and this led him to make his own studies of intrinsic geometry along similar lines. Back in Liège after the trip to Paris, Cesàro fell out with one of the professors there and left for Italy without completing his studies.
He had always wanted to study in Italy and now at last he was given the opportunity. Supported by Cremona, Battaglini and Dini, he was awarded a scholarship to allow him to undertake research at the University of Rome which he entered in 1884. Over the next two years wrote eighty works on :-
... infinite arithmetics, isobaric problems, holomorphic functions, theory of probability, and, particularly, intrinsic geometry.One might have thought that this remarkable record of productivity would have been sufficient to gain him his doctorate but he had to wait for a further year before this was awarded in 1887. By this time he already had a post, having won a competition for a chair at the Lycée Terenzio Mamiani in Rome. After one month at the Lycée Terenzio Mamiani, however, Cesàro was offered the chair of mathematics at Palermo and Cremona advised him to accept it. He remained at Palermo until 1891, moving then to Naples where he held the chair of mathematical analysis until his death.
Cesàro's main contribution was to differential geometry. Influenced by Darboux while in Paris he formulated 'intrinsic geometry'. This is his most important contribution which he described in Lezione di geometria intrinseca (Naples, 1896). He made excellent use of an idea due to Darboux which adopted a special coordinate system which applied to curves. At a variable point on the curve the coordinates consisted of the tangent to the curve, the principal normal and the binormal. The Lezione di geometria intrinseca contains descriptions of curves which today are named after Cesàro. He later extended his methods to study the Koch curves which are continuous everywhere but nowhere differentiable.
The Lezione di geometria intrinseca also deals with surfaces and n-dimensional spaces. Cesàro later pointed out that in fact his geometry did not use the parallel axiom so constituted a study of non-euclidean geometry.
In addition to differential geometry Cesàro worked on many topics such as number theory where, in addition to the topics we mentioned above, he studied the distribution of primes trying to improve on results obtained in this area by Chebyshev. He also contributed to the study of divergent series, a topic which interested him early in his career, and we should note that in his work on mathematical physics he was a staunch follower of Maxwell. This helped to spread Maxwell's ideas to the Continent which was important since, although it it hard to realise this now, it took a long time for scientists to realise the importance of his theories.
Cesàro's interest in mathematical physics is also evident in two very successful calculus texts which he wrote. He then went on to write further texts on mathematical physics, completing one on elasticity. Two further works, one on the mathematical theory of heat and the other on hydrodynamics, were in preparation at the time of his death.
Cesàro died in tragic circumstances. His seventeen year old son went swimming in the sea near Torre Annunziata and got into difficulties in rough water. Cesàro went to rescue his son but sustained injuries which led to his death.
Article by: J J O'Connor and E F Robertson