Synopses & Reviews
This book describes Italian mathematics in the period between the two World Wars. It analyzes the development by focusing on both the interior and the external influences. Italian mathematics in that period was shaped by a colorful array of strong personalities who concentrated their efforts on a select number of fields and won international recognition and respect in an incredibly short time. Consequently, Italy was considered a third mathematical power after France and Germany.
Review
From the reviews: "What the book conveys is the richness of Italian mathematics throughout the period and, despite being expert in none of these fields, the authors captured my imagination and made me want to know more of such mathematical ideas ... immensely enjoyable for all that."(MAA REVIEWS)
Synopsis
During the first decades of the last century Italian mathematics was considered to be the third national school due to its importance and the high level of its numerous - searchers. The decision to organize the 1908 International Congress of Mathematicians in Rome (after those in Paris and Heidelberg) confirmed this position. Qualified Italian universities were permanently included in the tour organized for young mathematicians improvement. Even in the years after the First World War, Rome (together with Paris and Gottingen) remained an important mathematical center according to the American ma- ematician G. D. Birkhoff. Now, after almost a century, we can state that the golden age of Italian mathem- th th ics reduces to the decades between the 19 and the 20 century. In the centre of interest stood the algebraic geometry school with Guido Calstelnuovo, Federico Enriques and Francesco Severi acting as key figures. Their work led to an almost complete systema- zation of the theory of curves to the complete classification of the surfaces and to the bases of a general theory of algebraic varieties. Other important contributions came from the Italian school of analysis. Its main representative was Vito Volterra an outstanding analyst with a strong interest in mathematical physics who produced important results in real analysis and the theory of integral equations and contributed to the initiation of functional analysis."
Table of Contents
The Italian school of algebraic geometry.- Mathematical physics.- Analysis.- Mathematicians at the front.- Volterra's leadership.- Rome 1921.- The foundation of the U.M.I. and the C.N.R.- Fascism.- Giovanni Gentile and the school reform.- Severi, mathematician and politician.- Enriques and his school.- Castelnuovo, probability and "social mathematics".- Tullio Levi-Civita.- The Thirties.- Towards disaster.- The International Congress of 1936.- The anti-semitic laws of 1938.- Crisis.