Giacinto Morera Explained

Giacinto Morera
Birth Date:1856 7, df=yes
Birth Place:Novara
Death Place:Turin
Nationality:Italian
Fields:
Workplaces:
Alma Mater:University of Turin
  • Engineering degree, 1878
  • Mathematics degree, 1879
Known For:
Awards:

Giacinto Morera (18 July 1856 – 8 February 1909), was an Italian engineer and mathematician. He is known for Morera's theorem in the theory of functions of a complex variable and for his work in the theory of linear elasticity.

Biography

Life

He was born in Novara on 18 July 1856, the son of Giacomo Morera and Vittoria Unico.[2] According to, his family was a wealthy one, his father being a rich merchant. This occurrence eased him in his studies after the laurea:[3] however, he was an extraordinarily hard worker and he widely used this ability in his researches.[4] After studying in Turin he went to Pavia, Pisa and Leipzig: then he went back to Pavia for a brief period in 1885, and finally he went to Genova in 1886, living here for the next 15 years. While being in Genova he married his fellow-citizen Cesira Faà.[5] From 1901 on to his death he worked in Turin:[6] he died of pneumonia on 8 February 1909.[7]

Education and academic career

He earned in 1878 the laurea in engineering and then, in 1879, the laurea in mathematics, both awarded him from the Politecnico di Torino:[8] According to, the title of his thesis in the mathematical sciences was: "Sul moto di un punto attratto da due centri fissi colla legge di Newton".[9] In Turin he attended the courses held by Enrico d'Ovidio, Angelo Genocchi and particularly the ones held by Francesco Siacci: later in his life, Morera acknowledged Siacci as his mentor in scientific research and life.[10] After graduating, he followed several advanced courses: he studied in Pavia from 1881 to 1882[11] under Eugenio Beltrami, Eugenio Bertini[12] and Felice Casorati. In 1883 he was in Pisa under Enrico Betti, Riccardo de Paolis and Ulisse Dini: a year later, he was in Leipzig under Felix Klein, Adolph Mayer and Carl Neumann.[13] In 1885 he went in Berlin in order to follow the lessons of Hermann von Helmholtz, Gustav Kirchhoff, Leopold Kronecker[14] and Karl Weierstrass at the local university: later in the same year, he went back to Italy, briefly working at the University of Pavia as a professor in the then newly established "Scuola di Magistero".[15] In 1886, after passing the required competitive examination by a judging commission,[16] he became professor of rational mechanics at the University of Genova: he lived there for 15 years, serving also as dean and as rector.[17] In 1901 he was called by the University of Turin to hold the chair of rational mechanics, left vacant by Vito Volterra.[6] In 1908 he passed to the chair of "Meccanica Superiore"[18] and was elected dean of the Faculty of Sciences.[19]

Honours

He was member of the Accademia Nazionale dei Lincei (first elected corresponding member on 18 July 1896, then elected national member on 26 August 1907)[20] and of the Accademia delle Scienze di Torino (elected on 9 February 1902).[21] refers that also the Kharkov Mathematical Society elected him corresponding member during the meeting of the society held on 31 October 1909 (Old Calendar), being apparently not aware of his death.

Tracts of his personality and attitudes

In his commemorative papers, Carlo Somigliana describes extensively Morera's personality:[22] according to him, he was a devoted friend and precious colleague,[23] capable of serenely judging men and facts.[24] On the very personal level, he remembers him s a cheerful person and a witty talker.[25]

His intelligence is described as sharp and penetrating,[26] his mind as uncommonly lucid,[27] himself as possessing analytic and critical abilities and being versatile, capable to grasp and appreciate every kind of manifestation of the human intellect.[28] Nevertheless, Somigliana also states that he was not interested in any scientific or other kind of field outside of his own realm of expertise.[29] himself, in the inaugural address as the rector of the University of Genova, after quoting a statement attributed to Peter Guthrie Tait,[30] revealed the reason behind his views: "In science, the one who has a sound and solid knowledge, even in a narrow field, holds a true strength and he can use it whenever he needs: the one who has only a superficial knowledge, however wide and striking, holds nothing, and indeed he often holds a weakness pushing him towards vanity".[31]

Acknowledged as honest, loyal and conscientious,[32] good-tempered and with a good intellect,[33] his simple manners earned him affection even when performing the duties of dean and rector at the University of Genoa.[34] Also describes him as a man of high moral value, and ascribes to such qualities the reason of his success in social relations and in performing his duties as a civil servant.

However, despite being successful in social relations, he did not care for, nor appreciate, appearances and was not interested in activities other than teaching and doing research: consequently, he was not well known outside the circle of his family and relatives and the circle of his colleagues.[33] He did not make a display of himself, careless of not being acknowledged by everyone for his true value: he also had a serious conception of life and strongly disliked vanity and superficiality.[23]

According to Somigliana,[28] his entire life was devoted to the higher unselfish ideal of scientific research: and also remarks that only his beloved family shared the same attentions and cares he reserved to his lifelong ideal.

Work

Research activity

According to Somigliana,[33] he was not particularly inventive: he did not create any new theory since this was not his main ability.[35] Instead, he perfected already developed theories:[36] nearly all of his researches appear as the natural result of a deep analysis work on theories that have already reached a high degree of perfection,[35] clearly and precisely exposed.[37] He had an exquisite sense for the applicability of his work, derived from his engineering studies,[38] and mastered perfectly all known branches of mathematical analysis and their mechanical and physical applications.[39]

He authored more than 60 research works: nearly complete lists of his publications are included in the commemorative papers, and . In particular classifies Morera's work by assigning each publication to particular research field: this classification is basically adopted in the following subsections.[40]

Complex analysis

C

, the line integral of a given continuous complex–valued function satisfies the equation

\ointCf(z)dz=0

for every closed curve in a given domain, then is holomorphic there.

Differential equations

This section includes all his works on the theory of differential equations, ordinary or partial ones: classifies this contributions as works in the theory of the equations of dynamics, in the theory of first-order partial differential equations and in the theory of exact differential equations.[44] He wrote twelve papers on this topic: the results he obtained in these works are well described by . In the paper he gives a very brief proof of a transformation formula for the Poisson brackets first proved by Émile Léonard Mathieu, while in the paper he simplifies the proof of a theorem of Francesco Siacci which is substantially equivalent to Lie's third theorem: the paper is concerned with the Pfaff problem, proving a theorem on the minimum number of integrations to be performed in order to solve the problem.

Equilibrium of continuous bodies in elasticity theory

classifies four of his works within the realm of elasticity theory: his contribution are well described by and by in their known monographs. The works within this section are perhaps the second best known part of his research, after his contributions to complex analysis.

Mathematical analysis

classifies four of his works under the locution "Questioni varie di Analisi".[45]

Potential theory of harmonic functions

His contribution of this topics are classified by under two sections, named respectively "Fondamenti della teoria della funzione potenziale"[46] and "Attrazione dell'elissoide e funzioni armoniche ellissoidali".[47] The work deals with the definition and properties of ellipsoidal harmonics and the related Lamé functions.

Rational mechanics and mathematical physics

includes in this class twelve works:[48] his first published work is included among them.

Varia: algebraic analysis and differential geometry

This section includes the only two papers of Morera on the subject of algebraic analysis[49] and his unique paper on differential geometry:[50] they are, respectively, the papers, and .

Teaching activity

References, and do not say much about the teaching activity of Giacinto Morera: Somigliana[51] describes once his teaching ability as incisive. However, his teaching is also testified by the lithographed lecture notes : according to the OPAC, this book had two editions, the first one being in 1901–1902.[52]

Publications

the paper containing the first proof of Morera's theorem.

See also

References

Biographical references

The references listed in this section contain mainly biographical information on the life of Giacinto Morera.

General references

The references listed in this section are mainly commemorations or surveys giving information on the life or Morera but also describing his scientific researches in some detail.

Scientific references

The references listed in this section describe particular aspect of Morera's scientific work or survey his scientific contribution to a given field.

External links

Notes and References

  1. For more precise information about the awarding or this honor, see the "Honours section".
  2. According to Somigliana (Somigliana|1910}}|1910, p. 573; Somigliana|1910a}}|1910a, p. 605): these commemorations include also a list of Morera's published works.
  3. According to and to Somigliana (Somigliana|1910}}|1910, p. 573; Somigliana|1910a}}|1910a, p. 605).
  4. According to and, while not particularly inventive, he nevertheless approached many difficult questions, introducing original views that simplified considerably the theories he worked on.
  5. See and
  6. There is a discrepancy between the statement of source and the ones of sources,, : the former one refers that he lived in Genova for 14 years, while the others quantify the duration of the same period as 15 years. The version of the second group of references has been adopted, also on considering that Vito Volterra went to Rome in 1901.
  7. and refer that he died in few days, notwithstanding his strong constitution.
  8. According to and .
  9. "On the motion of a point attracted by two fixed centers according to Newton's law". Somigliana (Somigliana|1910}}|1910, p. 573 and Somigliana|1910a}}|1910a, p. 605) does not say if it was published as his first paper : however, the title is the same and the dates nearly coincide.
  10. According to, who uses precisely the Italian respectful title "maestro". Somigliana (Somigliana|1910}}|1910, p.574 and Somigliana|1910a}}|1910a, p. 605) and refer also that it was Francesco Siacci who guided Morera towards the study of rational mechanics.
  11. According to and .
  12. reports "Eugenio Berbini" (see also) which is obviously a typo.
  13. According to reference . Since Adolph Mayer and Felix Klein were teaching in universities outside Leipzig, it is not clear from the reference if the courses Morera attended to in Germany were privately held or were advanced university courses. Nevertheless, states precisely these dates, names and places, as does .
  14. Only cites Kronecker as one of his teachers.
  15. According to . The "Scuola di Magistero", literally "Teaching School", was a particular University school aimed to the training of teachers.
  16. states that the examination was "onorevolmente vinto" which literally means "won in honorable way", perhaps alluding to a honorable mention awarded to him by the examining commission.
  17. Precisely, according to he served the University of Genova as dean for the periods 1891–1892 and 1896–1897, and as rector in the two years following his last dean mandate.
  18. "Higher Mechanics": the locution identifies an advanced course on rational mechanics.
  19. .
  20. According to the Accademia Nazionale dei Lincei|2012}}|yearbook of the academy, p. 494.
  21. Cossa (Cossa|et al.|1902}}|1902, p. 252) also describes briefly his election ceremony to resident member, i.e. "socio residente".
  22. states that they were friends for more than twenty years and also colleagues from 1901 onward, talking about their scientific researches almost every day. In and he complains about the pain of commemorating him, nevertheless aiming to do this in order to widespread the knowledge of his personality and work.
  23. See and .
  24. See, and . Somigliana exactly states that he possessed "Serenità nel giudicare uomini e cose".
  25. According to Somigliana (Somigliana|1910}}|1910, p. 580; Somigliana|1910a}}|1910a, p. 610) and .
  26. See, and .
  27. goes further stating also that "(nella sua mente) non-trovavano mai posto idee vaghe o incomplete" (English translation: "(in is his mind) confused and incomplete ideas did not find any place").
  28. See and .
  29. This was a consequence of his particular opinions, again according to Somigliana (Somigliana|1910}}|1910, p.580; Somigliana|1910a}}|1910a, p. 610): he excluded, and almost feared, everything not being classifiable as complete strictly scientific knowledge.
  30. "Schivate la scienza popolare, essa è tanto più perniciosa, quanto più pretenziosi sono quelli che la diffondono" (English translation: "Beware of popular science, it is as much as pernicious, as pretentious are the ones who spread it"), as also reported by Somigliana (Somigliana|1910}}|1910, p. 580; Somigliana|1910a}}|1910a, p. 610).
  31. The exact words of are:-"Nella scienza chi ha cognizioni salde e profonde, in un campo anche ristretto, possiede una vera forza e all'uopo sa giovarsene; chi invece ha solo cognizioni superficiali, anche molto estese ed appariscenti, possiede nulla, anzi spesso ha in sè un elemento di debolezza, che lo sospinge alla vanità".
  32. See, and .
  33. See .
  34. Again according to .
  35. See .
  36. See .
  37. See .
  38. According to, his first university studies were in the field of engineering, as briefly detailed in the "Education and academic career" subsection of this entry.
  39. See and .
  40. However, Maggi's terminology is not strictly followed: a modern terminology is used when needed in order to ease the comprehension.
  41. According to 's classification, these works belong to "analytic function theory" i.e. "Teoria delle funzioni analitiche".
  42. According to himself, "Tipiche fra quelle sue numerose note, brevi e concettose, sono alcune che riguardano la definizione di variabile complessa", i.e. (English translation) "Typical examples of his numerous brief and pregnant notes, are some dealing with the definition of a complex variable".
  43. gives a short account of the history of the theorem, and refers also to the later paper . There Morera defines holomorphic functions using his theorem, and then derives some interesting consequences.
  44. He precisely names this section "Equazioni della Dinamica, equazioni alle derivate parziali del primo ordine ed equazioni ai differenziali totali".
  45. An English translation reads as:-"Various topics in mathematical analysis".
  46. Literally, "fundamentals of the theory of the potential function" .
  47. "Attraction by an ellipsoid and ellipsoidal harmonics" .
  48. He classifies those works exactly as "Questioni varie di Meccanica e di Fisica matematica (Various topics in Mechanics and Mathematical Physics)" .
  49. According to .
  50. According to .
  51. See .
  52. This first edition is the one which, and refer to.