Born into an Italian
Jewish family in
Padua, Levi-Civita was the son of Giacomo Levi-Civita, a lawyer and former
senator. He graduated in 1892 from the
University of Padua Faculty of Mathematics. In 1894 he earned a teaching diploma after which he was appointed to the Faculty of Science teacher's college in Pavia. In 1898 he was appointed to the Padua Chair of Rational Mechanics (left uncovered by death of
Ernesto Padova) where he met and, in 1914, married
Libera Trevisani, one of his pupils.[5] He remained in his position at Padua until 1918, when he was appointed to the Chair of Higher Analysis at the
University of Rome; in another two years he was appointed to the Chair of Mechanics there.
In 1900 he and
Ricci-Curbastro published the theory of
tensors in Méthodes de calcul différentiel absolu et leurs applications,[6] which
Albert Einstein used as a resource to master the tensor calculus, a critical tool in the development of the theory of
general relativity. In 1917 he introduced the notion of parallel transport[7][8] in
Riemannian geometry, motivated by the will to simplify the computation of the curvature of a
Riemannian manifold.[9] Levi-Civita's series of papers on the problem of a static
gravitational field were also discussed in his 1915–1917 correspondence with Einstein. The correspondence was initiated by Levi-Civita, as he found mathematical errors in Einstein's use of tensor calculus to explain the theory of relativity. Levi-Civita methodically kept all of Einstein's replies to him; and even though Einstein had not kept Levi-Civita's, the entire correspondence could be re-constructed from Levi-Civita's archive. It is evident from this that, after numerous letters, the two men had grown to respect each other. In one of the letters, regarding Levi-Civita's new work, Einstein wrote "I admire the elegance of your method of computation; it must be nice to ride through these fields upon the horse of true mathematics while the like of us have to make our way laboriously on foot".[10] In 1933 Levi-Civita contributed to
Paul Dirac's equations in
quantum mechanics as well.[11]
His textbook on tensor calculus, The Absolute Differential Calculus (originally a set of lecture notes in Italian co-authored with Ricci-Curbastro), remains one of the standard texts almost a century after its first publication, with several translations available.
In 1936, receiving an invitation from Einstein, Levi-Civita traveled to
Princeton, United States and lived there with him for a year. But when the risk of war in Europe again rose, he returned to Italy. The
1938 race laws enacted by the Italian Fascist government deprived Levi-Civita of his professorship and of his membership of all scientific societies. Isolated from the scientific world, he died in his apartment in Rome in 1941.
Later on, when asked what he liked best about Italy, Einstein said "spaghetti and Levi-Civita".[12]
Other studies and honors
Analytical dynamics was another aspect of Levi-Civita's studies: many of his articles examine the
three-body problem. He wrote articles on hydrodynamics and on systems of differential equations. He is credited with improvements to the
Cauchy–Kowalevski theorem, on which he wrote a book in 1931. In 1933, he contributed to work on the
Dirac equation. He developed the
Levi-Civita field, a system of numbers that includes
infinitesimal quantities.
All his mathematical works, except for the
monographs,
treatises and
textbooks, were posthumously gathered in the six volumes of his "Collected works", in a revised typographical form amending both
typographical errors and author's oversights.
Levi-Civita, Tullio (1956),
Opere Matematiche. Memorie e Note [Collected mathematical works. Memoirs and notes] (PDF) (in French and Italian), vol. secondo (1901−1907), Pubblicate a cura dell'
Accademia Nazionale dei Lincei, Roma: Zanichelli Editore, pp. VI, 636.
Levi-Civita, Tullio (1957),
Opere Matematiche. Memorie e Note [Collected mathematical works. Memoirs and notes] (PDF) (in French and Italian), vol. terzo (1908−1916), Pubblicate a cura dell'
Accademia Nazionale dei Lincei, Roma: Zanichelli Editore, pp. VI, 600.
Levi-Civita, Tullio (1960),
Opere Matematiche. Memorie e Note [Collected mathematical works. Memoirs and notes] (PDF) (in French and Italian), vol. quarto (1917−1928), Pubblicate a cura dell'
Accademia Nazionale dei Lincei, Roma: Zanichelli Editore, pp. VI, 608.
Levi-Civita, Tullio (1970),
Opere Matematiche. Memorie e Note [Collected mathematical works. Memoirs and notes] (in French and Italian), vol. quinto (1929−1937), Pubblicate a cura dell'
Accademia Nazionale dei Lincei, Roma: Zanichelli Editore, pp. VI, 670.
Levi-Civita, Tullio (1970),
Opere Matematiche. Memorie e Note [Collected mathematical works. Memoirs and notes] (in French and Italian), vol. sesto (1938−1941), Pubblicate a cura dell'
Accademia Nazionale dei Lincei, Roma: Zanichelli Editore, pp. VI, 502.
Levi-Civita, Tullio (2007) [1895],
Pamphlets, mathematics,
University of Michigan, retrieved 14 January 2017. A collection of some of his published papers (in their original typographical form), probably an unordered uncorrected collection of offprints.
^Goodstein, Judith R. (2018). Einstein's Italian mathematicians : Ricci, Levi-Civita, and the birth of general relativity. American Mathematical Society. pp. 115–117.
ISBN978-1470428464.
^Levi-Civita, Tullio (2022). "Notion of Parallelism on a Generic Manifold and Consequent Geometrical Specification of the Riemannian Curvature".
arXiv:2210.13239 [
gr-qc].
^Iurato, Giuseppe (2016). "On the history of Levi-Civita's parallel transport".
arXiv:1608.04986.
^Hentschel, Ann (1998). The Collected Papers of Albert Einstein, Vol. 8 (English): The Berlin Years: Correspondence, 1914-1918. (English supplement translation.). Princeton, NJ:
Princeton University Press. p. 363.
ISBN9780691048413.
^C Cattani and M De Maria, Geniality and rigor: the Einstein – Levi-Civita correspondence (1915–1917), Riv. Stor. Sci. (2) 4 (1) (1996), 1–22; as cited in MacTutor archive.