Namespaces
Variants
Actions

Difference between revisions of "Fréchet, Maurice"

From Encyclopedia of Mathematics
Jump to: navigation, search
(Created page with " {| class="wikitable" !Copyright notice <!-- don't remove! --> |- | This article ''Maurice Fréchet'' was adapted from an original article by Eugene William Seneta,...")
 
m (accents)
 
(4 intermediate revisions by 2 users not shown)
Line 3: Line 3:
 
!Copyright notice <!-- don't remove! -->  
 
!Copyright notice <!-- don't remove! -->  
 
|-
 
|-
| This article ''Maurice Fr&eacute;chet'' was adapted from an original article by Eugene William Seneta, which appeared in ''StatProb: The Encyclopedia Sponsored by Statistics and Probability Societies''. The original article ([<nowiki>http://statprob.com/encyclopedia/MauriceFRECHET.html</nowiki> StatProb Source], Local Files: [[Media:MauriceFRECHET.pdf|pdf]] | [[Media:MauriceFRECHET.tex|tex]]) is copyrighted by the author(s), the article has been donated to ''Encyclopedia of Mathematics'', and its further issues are under ''Creative Commons Attribution Share-Alike License'. All pages from StatProb are contained in the [[:Category:Statprob|Category StatProb]].
+
| This article ''Maurice Fréchet'' was adapted from an original article by B. Bru and S. Hertz, which appeared in ''StatProb: The Encyclopedia Sponsored by Statistics and Probability Societies''. The original article ([<nowiki>http://statprob.com/encyclopedia/MauriceFRECHET.html</nowiki> StatProb Source], Local Files: [[Media:MauriceFRECHET.pdf|pdf]] | [[Media:MauriceFRECHET.tex|tex]]) is copyrighted by the author(s), the article has been donated to ''Encyclopedia of Mathematics'', and its further issues are under ''Creative Commons Attribution Share-Alike License'. All pages from StatProb are contained in the [[:Category:Statprob|Category StatProb]].
 
|-
 
|-
 
|}
 
|}
Line 10: Line 10:
 
     \begin{document}  
 
     \begin{document}  
 
     \noindent -->
 
     \noindent -->
'''Maurice FR&Eacute;CHET'''
+
'''Maurice FRÉCHET'''
  
 
b. 10 September 1878 - d. 4 June 1973
 
b. 10 September 1878 - d. 4 June 1973
Line 17: Line 17:
 
<!-- \noindent -->
 
<!-- \noindent -->
  
'''Summary'''. Fr&eacute;chet, one of the founders of modern analysis, also made  
+
'''Summary'''. Fréchet, one of the founders of modern analysis, also made  
 
various original contributions to the probability calculus. He played an
 
various original contributions to the probability calculus. He played an
 
important role in the organization of a European scientific community
 
important role in the organization of a European scientific community
 
in the area of probability and statistics.
 
in the area of probability and statistics.
  
Ren&eacute; Maurice Fr&eacute;chet was born at Maligny in the d&eacute;partement of the
+
René Maurice Fréchet was born at Maligny in the département of the
 
Yonne, into a Protestant family, which moved to Paris soon after.
 
Yonne, into a Protestant family, which moved to Paris soon after.
As a pupil at the Lyc&eacute;e Buffon,
+
As a pupil at the Lycée Buffon,
M. Fr&eacute;chet was taught by Jacques Hadamard (1865-1963), before the
+
M. Fréchet was taught by Jacques Hadamard (1865-1963), before the
 
latter left Paris for Bordeaux in 1894.  In 1900, he was admitted
 
latter left Paris for Bordeaux in 1894.  In 1900, he was admitted
to the &Eacute;cole Normale Sup&eacute;rieure, the most selective of Parisian
+
to the École Normale Supérieure, the most selective of Parisian
 
Institutions of higher learning.  In 1906, he defended one of the
 
Institutions of higher learning.  In 1906, he defended one of the
 
most dazzling French theses in mathematics of his time.  In it,
 
most dazzling French theses in mathematics of his time.  In it,
Fr&eacute;chet defined the concept of an abstract metric space, and
+
Fréchet defined the concept of an abstract metric space, and
 
within this framework demonstrated the validity of Weierstrass's
 
within this framework demonstrated the validity of Weierstrass's
theorem.  Fr&eacute;chet's thesis marks the beginnings of analysis on
+
theorem.  Fréchet's thesis marks the beginnings of analysis on
 
appropriately structured abstract spaces, one of the
 
appropriately structured abstract spaces, one of the
 
principal new directions in analysis of this century  
 
principal new directions in analysis of this century  
 
(Arboleda, 1980; Taylor, 1982-1987).  
 
(Arboleda, 1980; Taylor, 1982-1987).  
Throughout his life, Fr&eacute;chet retained his taste  
+
Throughout his life, Fréchet retained his taste  
 
for the most general theories and concepts, and some of those which he
 
for the most general theories and concepts, and some of those which he
 
introduced were real strokes of genius.  Sometimes reproached
 
introduced were real strokes of genius.  Sometimes reproached
Line 43: Line 43:
 
resetting problems in a broader new framework within which he could
 
resetting problems in a broader new framework within which he could
 
prove ``easy theorems" enunciated for his own interest.  It is, however, to
 
prove ``easy theorems" enunciated for his own interest.  It is, however, to
Fr&eacute;chet in particular that we owe the first theory
+
Fréchet in particular that we owe the first theory
 
of integration with respect to an ``abstract measure", in 1915.
 
of integration with respect to an ``abstract measure", in 1915.
 
Kolmogorov was to make use of this to axiomatize probability theory,
 
Kolmogorov was to make use of this to axiomatize probability theory,
citing ``his master Fr&eacute;chet" explicitly as his source.  Whatever one's
+
citing ``his master Fréchet" explicitly as his source.  Whatever one's
views, Fr&eacute;chet's scientific activity over a period of 60 years
+
views, Fréchet's scientific activity over a period of 60 years
 
was considerable, amounting to over 300 publications covering all
 
was considerable, amounting to over 300 publications covering all
 
areas of pure and applied mathematics, and including about ten  
 
areas of pure and applied mathematics, and including about ten  
 
important books.
 
important books.
  
After a period as a schoolteacher at the Besan&ccedil;on (in 1907) and
+
After a period as a schoolteacher at the Besançon (in 1907) and
Nantes (in 1908) Lyc&eacute;es, he was appointed lecturer  
+
Nantes (in 1908) Lycées, he was appointed lecturer  
 
in the Faculty of Sciences at Rennes. Then in 1910, he became Professor in
 
in the Faculty of Sciences at Rennes. Then in 1910, he became Professor in
 
the Faculty of Sciences at Poitiers, replacing Henri Lebesgue, who
 
the Faculty of Sciences at Poitiers, replacing Henri Lebesgue, who
 
had been appointed to Paris. Both appointments were due to the
 
had been appointed to Paris. Both appointments were due to the
direct intervention of Borel (q.v.).  After the First World War, during
+
direct intervention of [[Borel, Émile|Borel]].  After the First World War, during
which he served as an Anglo-French interpreter, Fr&eacute;chet was
+
which he served as an Anglo-French interpreter, Fréchet was
 
appointed Professor in the Faculty of Sciences at the newly
 
appointed Professor in the Faculty of Sciences at the newly
 
liberated  City of Strasbourg, showcase of French science.   
 
liberated  City of Strasbourg, showcase of French science.   
 
Actuarial studies and statistics had been taught at Strasbourg for a
 
Actuarial studies and statistics had been taught at Strasbourg for a
 
long time, within the framework of the German university, associated with names
 
long time, within the framework of the German university, associated with names
such as Lexis (q.v) and von Bortkiewicz (q.v.). It was
+
such as [[Lexis, Wilhelm|Lexis]] and [[Bortkiewicz, Ladislaus von|von Bortkiewicz]]. It was
here that Fr&eacute;chet, conscious of his national and international
+
here that Fréchet, conscious of his national and international
 
role, and meticulous in the discharge of his duties,
 
role, and meticulous in the discharge of his duties,
 
began to teach applied mathematics, statistics, actuarial studies, and
 
began to teach applied mathematics, statistics, actuarial studies, and
 
nomography.  His first statistical papers date back to these
 
nomography.  His first statistical papers date back to these
years.  It was entirely to be expected that Fr&eacute;chet should be
+
years.  It was entirely to be expected that Fréchet should be
called to Paris in 1928, when the Institut Henri Poincar&eacute; (IHP)
+
called to Paris in 1928, when the Institut Henri Poincaré (IHP)
 
was created, to develop the teaching of  
 
was created, to develop the teaching of  
 
probability under the leadership of Borel, its director and the
 
probability under the leadership of Borel, its director and the
Line 76: Line 76:
 
Borel held the directorship of the IHP from 1928 until his death in
 
Borel held the directorship of the IHP from 1928 until his death in
 
1956.  Apart from Borel,
 
1956.  Apart from Borel,
Fr&eacute;chet was at the time the only French university academic of  
+
Fréchet was at the time the only French university academic of  
 
international renown who
 
international renown who
 
was interested in recent developments in  
 
was interested in recent developments in  
probability and statistics.  Paul L&eacute;vy who had just published a
+
probability and statistics.  Paul Lévy who had just published a
remarkable book on the subject in 1925 (L&eacute;vy, 1925) was a
+
remarkable book on the subject in 1925 (Lévy, 1925) was a
Professor at the &Eacute;cole Polytechnique and never held a university
+
Professor at the École Polytechnique and never held a university
 
position.
 
position.
  
Fr&eacute;chet was first appointed  lecturer in  
+
Fréchet was first appointed  lecturer in  
 
probability at the Sorbonne's  Rockefeller Foundation, and then from
 
probability at the Sorbonne's  Rockefeller Foundation, and then from
 
the end of 1928 as Professor (without a Chair), was promoted
 
the end of 1928 as Professor (without a Chair), was promoted
Line 91: Line 91:
 
start of 1941, he succeeded Borel in the Chair of the Calculus of
 
start of 1941, he succeeded Borel in the Chair of the Calculus of
 
Probabilities and Mathematical Physics until his retirement in
 
Probabilities and Mathematical Physics until his retirement in
1949. In 1928 (and at least until 1935) Fr&eacute;chet was also put in charge of
+
1949. In 1928 (and at least until 1935) Fréchet was also put in charge of
lectures at the &Eacute;cole Normale Sup&eacute;rieure. It was in this
+
lectures at the École Normale Supérieure. It was in this
 
capacity, with Borel's blessing, that he directed a sizeable number
 
capacity, with Borel's blessing, that he directed a sizeable number
 
of young mathematicians towards research in probability, in
 
of young mathematicians towards research in probability, in
particular Doeblin, Fortet, Lo&egrave;ve, Ville, and others.
+
particular Doeblin, Fortet, Loève, Ville, and others.
  
As soon as he reached Paris in 1928 Fr&eacute;chet directed his research
+
As soon as he reached Paris in 1928 Fréchet directed his research
towards the new ``theory of chain events", namely Markov (q.v.) chains. and  
+
towards the new ``theory of chain events", namely [[Markov, Andrei Andreevich|Markov]] chains. and  
 
published the first mathematical synthesis on this topic in
 
published the first mathematical synthesis on this topic in
1938.  It was also Fr&eacute;chet who initiated the study of ``random elements"
+
1938.  It was also Fréchet who initiated the study of ``random elements"
 
taking values in the most general spaces.
 
taking values in the most general spaces.
  
 
In the statistical field, the usual evaluation of his works was not
 
In the statistical field, the usual evaluation of his works was not
 
always enthusiastic, to which following severe comment of Harald
 
always enthusiastic, to which following severe comment of Harald
Cram&eacute;r
+
Cramér
 
<ref> ``Half a century with probability theory: some
 
<ref> ``Half a century with probability theory: some
 
personal recollections", "The Annals of Probability </ref>
 
personal recollections", "The Annals of Probability </ref>
Line 111: Line 111:
 
509-546 (see p. 528).'' attests:
 
509-546 (see p. 528).'' attests:
  
"In early years Fr&eacute;chet had been an outstanding mathematician,
+
"In early years Fréchet had been an outstanding mathematician,
 
doing pathbreaking work in functional analysis.  He had taken up
 
doing pathbreaking work in functional analysis.  He had taken up
 
probabilistic work at a fairly advanced age, and I am bound to say
 
probabilistic work at a fairly advanced age, and I am bound to say
Line 117: Line 117:
  
 
<!-- \noindent -->
 
<!-- \noindent -->
Nevertheless, Fr&eacute;chet was the author of several interesting
+
Nevertheless, Fréchet was the author of several interesting
statistical papers, among them one on the one-dimensional Cram&eacute;r-Rao
+
statistical papers, among them one on the one-dimensional Cramér-Rao
 
inequality, some contributions in econometrics, and in spatial
 
inequality, some contributions in econometrics, and in spatial
 
statistics.
 
statistics.
Line 124: Line 124:
 
His statistical researches came from a critical reflection on
 
His statistical researches came from a critical reflection on
 
the theory of errors.  In a series of lectures, papers and
 
the theory of errors.  In a series of lectures, papers and
discussions, particularly with Paul L&eacute;vy, between the
+
discussions, particularly with Paul Lévy, between the
two World Wars, Fr&eacute;chet mainly attacked the excessive  
+
two World Wars, Fréchet mainly attacked the excessive  
 
hegemony of the Gaussian
 
hegemony of the Gaussian
 
distribution in all areas of application of the theory of
 
distribution in all areas of application of the theory of
Line 133: Line 133:
 
in connection
 
in connection
 
with it, the use of the median instead of the mean.  It
 
with it, the use of the median instead of the mean.  It
was within this framework that he wrote his comments on the "l'homme-m&eacute;dian'', in contrast, presumably, to Quetelet's (q.v.)
+
was within this framework that he wrote his comments on the "l'homme-médian'', in contrast, presumably, to [[Quetelet, Adolphe|Quetelet]]'s
 
''l'homme-moyen''.  He continued his deviationism in 1926, constructing
 
''l'homme-moyen''.  He continued his deviationism in 1926, constructing
 
a theory of errors based on an alternative composition of
 
a theory of errors based on an alternative composition of
 
elementary errors: instead of adding them, he proposed taking
 
elementary errors: instead of adding them, he proposed taking
their maximum.  Using an anologue of P. L&eacute;vy's argument in his
+
their maximum.  Using an anologue of P. Lévy's argument in his
work of 1925, Fr&eacute;chet proved some fundamental results for the
+
work of 1925, Fréchet proved some fundamental results for the
 
statistics of extreme values, in particular concerning  
 
statistics of extreme values, in particular concerning  
 
one of the three
 
one of the three
 
asymptotic max-stable distributions.  He took up the topic of
 
asymptotic max-stable distributions.  He took up the topic of
 
extremes again in 1947, on the occasion of  
 
extremes again in 1947, on the occasion of  
the jubilee of Richard von Mises (q.v.), another researcher in this area.
+
the jubilee of [[Mises, Richard von|Richard von Mises]], another researcher in this area.
Meanwhile, he gave his unflagging support to Gumbel's (q.v.) research on extremes,
+
Meanwhile, he gave his unflagging support to [[Gumbel, Emil Julius|Gumbel]]'s research on extremes,
 
which the latter had begun after his arrival in France in 1932/33.
 
which the latter had begun after his arrival in France in 1932/33.
  
Other foci of Fr&eacute;chet's interest in statistics were closely tied
+
Other foci of Fréchet's interest in statistics were closely tied
 
to Gumbel, as their rich correspondence indicates: the
 
to Gumbel, as their rich correspondence indicates: the
 
concentration of incomes, the correlation coefficient, contingency
 
concentration of incomes, the correlation coefficient, contingency
Line 153: Line 153:
  
 
A recently rediscovered insight was what has  been named
 
A recently rediscovered insight was what has  been named
Fr&eacute;chet Optimality in the theory of probability inequalities (Seneta
+
Fréchet Optimality in the theory of probability inequalities (Seneta
 
and Chen, 1996)
 
and Chen, 1996)
  
Fr&eacute;chet was a member of the International Statistical Institute
+
Fréchet was a member of the International Statistical Institute
 
from 1931, Honorary Life Member from 1959, and Vice President from 1960.
 
from 1931, Honorary Life Member from 1959, and Vice President from 1960.
 
It was he who chaired the first four international
 
It was he who chaired the first four international
Line 164: Line 164:
  
 
For about 30 years, from the mid 1920's to the end of the 1950's,
 
For about 30 years, from the mid 1920's to the end of the 1950's,
Fr&eacute;chet acted as an intermediary for communicating information
+
Fréchet acted as an intermediary for communicating information
 
in probability and statistics, as his varied correspondence with
 
in probability and statistics, as his varied correspondence with
 
scholars in many countries, preserved in the Archives of
 
scholars in many countries, preserved in the Archives of
 
the Academy of Sciences, attests.  In particular, this repository contains
 
the Academy of Sciences, attests.  In particular, this repository contains
some of the rare surviving letters of Paul L&eacute;vy before the Second  
+
some of the rare surviving letters of Paul Lévy before the Second  
World War.  An open individual, Fr&eacute;chet worked after the  
+
World War.  An open individual, Fréchet worked after the  
 
Second World War for
 
Second World War for
 
the integration of scholars from the Soviet block into the
 
the integration of scholars from the Soviet block into the
Line 177: Line 177:
 
in Japan, were published in Esperanto.
 
in Japan, were published in Esperanto.
  
Fr&eacute;chet was elected to the Academy of Sciences of the Institut de
+
Fréchet was elected to the Academy of Sciences of the Institut de
France in 1956, occupying the seat left vacant by &Eacute;mile Borel's
+
France in 1956, occupying the seat left vacant by Émile Borel's
 
death.  
 
death.  
  
Line 185: Line 185:
 
{|
 
{|
 
|-
 
|-
|valign="top"|{{Ref|1}}||valign="top"|  Arboleda, L.C.(1980). ''Contribution \`a l'&eacute;tude des premi&egrave;res recherches topologiques (d'apr&egrave;s la correspondance et les publications de Maurice Fr&eacute;chet)'', Thesis, Paris, EHESS, 1980.  
+
|valign="top"|{{Ref|1}}||valign="top"|  Arboleda, L.C.(1980). ''Contribution à l'&eacute;tude des premi&egrave;res recherches topologiques (d'apr&egrave;s la correspondance et les publications de Maurice Fréchet)'', Thesis, Paris, EHESS, 1980.  
 
|-
 
|-
|valign="top"|{{Ref|2}}||valign="top"|  Dugu&eacute;, D. (1974). Maurice Fr&eacute;chet,  ''International Statistical Review'', '''42''', 113-114.  
+
|valign="top"|{{Ref|2}}||valign="top"|  Dugué, D. (1974). Maurice Fréchet,  ''International Statistical Review'', '''42''', 113-114.  
 
|-
 
|-
|valign="top"|{{Ref|3}}||valign="top"|  Fr&eacute;chet, M. (1938). ''M&eacute;thode des fonctions arbitraires. Th&eacute;orie des &eacute;v&egrave;nements en cha&icirc;ne dans le cas d'un nombre fini d'&eacute;tats possibles'', Gauthier-Villars, Paris. Second Edition, with a new Supplement and Note by Paul L&eacute;vy, ibid., 1952.  
+
|valign="top"|{{Ref|3}}||valign="top"|  Fréchet, M. (1938). ''Méthode des fonctions arbitraires. Théorie des évènements en chaîne dans le cas d'un nombre fini d'états possibles'', Gauthier-Villars, Paris. Second Edition, with a new Supplement and Note by Paul Lévy, ibid., 1952.  
 
|-
 
|-
|valign="top"|{{Ref|4}}||valign="top"|  Hertz, S&eacute;bastien (1997). ''Emil Julius Gumbel (1891-1966) et la statistique des extr&ecirc;mes'', Thesis, Universit&eacute; de Lyon-1.  
+
|valign="top"|{{Ref|4}}||valign="top"|  Hertz, Sébastien (1997). ''Emil Julius Gumbel (1891-1966) et la statistique des extr&ecirc;mes'', Thesis, Université de Lyon-1.  
 
|-
 
|-
|valign="top"|{{Ref|5}}||valign="top"|  L&eacute;vy, Paul (1925). ''Calcul des probabilit&eacute;s'', Gauthier-Villars, Paris.  
+
|valign="top"|{{Ref|5}}||valign="top"|  Lévy, Paul (1925). ''Calcul des probabilités'', Gauthier-Villars, Paris.  
 
|-
 
|-
|valign="top"|{{Ref|6}}||valign="top"|  Seneta, E. and Chen, T. (1996). Fr&eacute;chet optimality of upper  bivariate Bonferroni-type bounds. ''Theory of Probability and Mathematical Statistics,'' '''52''', 147-152.  
+
|valign="top"|{{Ref|6}}||valign="top"|  Seneta, E. and Chen, T. (1996). Fréchet optimality of upper  bivariate Bonferroni-type bounds. ''Theory of Probability and Mathematical Statistics,'' '''52''', 147-152.  
 
|-
 
|-
|valign="top"|{{Ref|7}}||valign="top"|  Taylor, A. E. (1982-1987). A study of Maurice Fr&eacute;chet. I: His early work on point set theory and the theory of functionals, ''Archive for Hist. of Exact Sci.'', '''27''' (1982), 233-295. II: Mainly about his work on  general topology 1909-1928, ''ibid.'', '''34''', (1985), 279-380. III: Fr&eacute;chet as Analyst,  ''ibid.'', '''37''', (1987),  25-76.
+
|valign="top"|{{Ref|7}}||valign="top"|  Taylor, A. E. (1982-1987). A study of Maurice Fréchet. I: His early work on point set theory and the theory of functionals, ''Archive for Hist. of Exact Sci.'', '''27''' (1982), 233-295. II: Mainly about his work on  general topology 1909-1928, ''ibid.'', '''34''', (1985), 279-380. III: Fréchet as Analyst,  ''ibid.'', '''37''', (1987),  25-76.
 
|-
 
|-
 
|}
 
|}
 
 
B. Bru and S. Hertz
 
 
 
<!-- \end{document} -->
 
<!-- \end{document} -->
  
  
 
<references />
 
<references />
 +
 +
Reprinted with permission from
 +
Christopher Charles Heyde and Eugene William Seneta (Editors),
 +
Statisticians of the Centuries, Springer-Verlag Inc., New York, USA.
  
 
[[Category:Statprob]]
 
[[Category:Statprob]]
 
[[Category:Biographical]]
 
[[Category:Biographical]]

Latest revision as of 12:11, 23 November 2023

Copyright notice
This article Maurice Fréchet was adapted from an original article by B. Bru and S. Hertz, which appeared in StatProb: The Encyclopedia Sponsored by Statistics and Probability Societies. The original article ([http://statprob.com/encyclopedia/MauriceFRECHET.html StatProb Source], Local Files: pdf | tex) is copyrighted by the author(s), the article has been donated to Encyclopedia of Mathematics, and its further issues are under Creative Commons Attribution Share-Alike License'. All pages from StatProb are contained in the Category StatProb.

Maurice FRÉCHET

b. 10 September 1878 - d. 4 June 1973


Summary. Fréchet, one of the founders of modern analysis, also made various original contributions to the probability calculus. He played an important role in the organization of a European scientific community in the area of probability and statistics.

René Maurice Fréchet was born at Maligny in the département of the Yonne, into a Protestant family, which moved to Paris soon after. As a pupil at the Lycée Buffon, M. Fréchet was taught by Jacques Hadamard (1865-1963), before the latter left Paris for Bordeaux in 1894. In 1900, he was admitted to the École Normale Supérieure, the most selective of Parisian Institutions of higher learning. In 1906, he defended one of the most dazzling French theses in mathematics of his time. In it, Fréchet defined the concept of an abstract metric space, and within this framework demonstrated the validity of Weierstrass's theorem. Fréchet's thesis marks the beginnings of analysis on appropriately structured abstract spaces, one of the principal new directions in analysis of this century (Arboleda, 1980; Taylor, 1982-1987). Throughout his life, Fréchet retained his taste for the most general theories and concepts, and some of those which he introduced were real strokes of genius. Sometimes reproached for not having proved truly "difficult theorems", he is often credited only with introducing new concepts, generalizing and resetting problems in a broader new framework within which he could prove ``easy theorems" enunciated for his own interest. It is, however, to Fréchet in particular that we owe the first theory of integration with respect to an ``abstract measure", in 1915. Kolmogorov was to make use of this to axiomatize probability theory, citing ``his master Fréchet" explicitly as his source. Whatever one's views, Fréchet's scientific activity over a period of 60 years was considerable, amounting to over 300 publications covering all areas of pure and applied mathematics, and including about ten important books.

After a period as a schoolteacher at the Besançon (in 1907) and Nantes (in 1908) Lycées, he was appointed lecturer in the Faculty of Sciences at Rennes. Then in 1910, he became Professor in the Faculty of Sciences at Poitiers, replacing Henri Lebesgue, who had been appointed to Paris. Both appointments were due to the direct intervention of Borel. After the First World War, during which he served as an Anglo-French interpreter, Fréchet was appointed Professor in the Faculty of Sciences at the newly liberated City of Strasbourg, showcase of French science. Actuarial studies and statistics had been taught at Strasbourg for a long time, within the framework of the German university, associated with names such as Lexis and von Bortkiewicz. It was here that Fréchet, conscious of his national and international role, and meticulous in the discharge of his duties, began to teach applied mathematics, statistics, actuarial studies, and nomography. His first statistical papers date back to these years. It was entirely to be expected that Fréchet should be called to Paris in 1928, when the Institut Henri Poincaré (IHP) was created, to develop the teaching of probability under the leadership of Borel, its director and the holder of the Chair in the Calculus of Probabilities and Mathematical Physics at the Sorbonne. It should be noted that Borel held the directorship of the IHP from 1928 until his death in 1956. Apart from Borel, Fréchet was at the time the only French university academic of international renown who was interested in recent developments in probability and statistics. Paul Lévy who had just published a remarkable book on the subject in 1925 (Lévy, 1925) was a Professor at the École Polytechnique and never held a university position.

Fréchet was first appointed lecturer in probability at the Sorbonne's Rockefeller Foundation, and then from the end of 1928 as Professor (without a Chair), was promoted to the tenured Chair of General Mathematics in 1933 and to the Chair of Differential and Integral Calculus in 1935. Finally, at the start of 1941, he succeeded Borel in the Chair of the Calculus of Probabilities and Mathematical Physics until his retirement in 1949. In 1928 (and at least until 1935) Fréchet was also put in charge of lectures at the École Normale Supérieure. It was in this capacity, with Borel's blessing, that he directed a sizeable number of young mathematicians towards research in probability, in particular Doeblin, Fortet, Loève, Ville, and others.

As soon as he reached Paris in 1928 Fréchet directed his research towards the new ``theory of chain events", namely Markov chains. and published the first mathematical synthesis on this topic in 1938. It was also Fréchet who initiated the study of ``random elements" taking values in the most general spaces.

In the statistical field, the usual evaluation of his works was not always enthusiastic, to which following severe comment of Harald Cramér [1] , 4(1976), 509-546 (see p. 528). attests:

"In early years Fréchet had been an outstanding mathematician, doing pathbreaking work in functional analysis. He had taken up probabilistic work at a fairly advanced age, and I am bound to say that his work in this field did not seem very impressive to me."

Nevertheless, Fréchet was the author of several interesting statistical papers, among them one on the one-dimensional Cramér-Rao inequality, some contributions in econometrics, and in spatial statistics.

His statistical researches came from a critical reflection on the theory of errors. In a series of lectures, papers and discussions, particularly with Paul Lévy, between the two World Wars, Fréchet mainly attacked the excessive hegemony of the Gaussian distribution in all areas of application of the theory of errors, and provided alternative solutions. He demonstrated the usefulness of the Laplace probability density, $(exp - |x|), -\infty<x<\infty$, and in connection with it, the use of the median instead of the mean. It was within this framework that he wrote his comments on the "l'homme-médian, in contrast, presumably, to Quetelet's l'homme-moyen. He continued his deviationism in 1926, constructing a theory of errors based on an alternative composition of elementary errors: instead of adding them, he proposed taking their maximum. Using an anologue of P. Lévy's argument in his work of 1925, Fréchet proved some fundamental results for the statistics of extreme values, in particular concerning one of the three asymptotic max-stable distributions. He took up the topic of extremes again in 1947, on the occasion of the jubilee of Richard von Mises, another researcher in this area. Meanwhile, he gave his unflagging support to Gumbel's research on extremes, which the latter had begun after his arrival in France in 1932/33.

Other foci of Fréchet's interest in statistics were closely tied to Gumbel, as their rich correspondence indicates: the concentration of incomes, the correlation coefficient, contingency tables with fixed marginals, etc. (Hertz, 1997).

A recently rediscovered insight was what has been named Fréchet Optimality in the theory of probability inequalities (Seneta and Chen, 1996)

Fréchet was a member of the International Statistical Institute from 1931, Honorary Life Member from 1959, and Vice President from 1960. It was he who chaired the first four international conferences devoted entirely to probability and its applications in Geneva (1937), Lyon (1948), Paris (1949), Amsterdam (1954).

For about 30 years, from the mid 1920's to the end of the 1950's, Fréchet acted as an intermediary for communicating information in probability and statistics, as his varied correspondence with scholars in many countries, preserved in the Archives of the Academy of Sciences, attests. In particular, this repository contains some of the rare surviving letters of Paul Lévy before the Second World War. An open individual, Fréchet worked after the Second World War for the integration of scholars from the Soviet block into the International Statistical Institute, for the peaceful union of peoples, and the spread of Esperanto as a universal language. Some of his works, particularly in Japan, were published in Esperanto.

Fréchet was elected to the Academy of Sciences of the Institut de France in 1956, occupying the seat left vacant by Émile Borel's death.


References

[1] Arboleda, L.C.(1980). Contribution à l'étude des premières recherches topologiques (d'après la correspondance et les publications de Maurice Fréchet), Thesis, Paris, EHESS, 1980.
[2] Dugué, D. (1974). Maurice Fréchet, International Statistical Review, 42, 113-114.
[3] Fréchet, M. (1938). Méthode des fonctions arbitraires. Théorie des évènements en chaîne dans le cas d'un nombre fini d'états possibles, Gauthier-Villars, Paris. Second Edition, with a new Supplement and Note by Paul Lévy, ibid., 1952.
[4] Hertz, Sébastien (1997). Emil Julius Gumbel (1891-1966) et la statistique des extrêmes, Thesis, Université de Lyon-1.
[5] Lévy, Paul (1925). Calcul des probabilités, Gauthier-Villars, Paris.
[6] Seneta, E. and Chen, T. (1996). Fréchet optimality of upper bivariate Bonferroni-type bounds. Theory of Probability and Mathematical Statistics, 52, 147-152.
[7] Taylor, A. E. (1982-1987). A study of Maurice Fréchet. I: His early work on point set theory and the theory of functionals, Archive for Hist. of Exact Sci., 27 (1982), 233-295. II: Mainly about his work on general topology 1909-1928, ibid., 34, (1985), 279-380. III: Fréchet as Analyst, ibid., 37, (1987), 25-76.


  1. ``Half a century with probability theory: some personal recollections", "The Annals of Probability

Reprinted with permission from Christopher Charles Heyde and Eugene William Seneta (Editors), Statisticians of the Centuries, Springer-Verlag Inc., New York, USA.

How to Cite This Entry:
Fréchet, Maurice. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Fr%C3%A9chet,_Maurice&oldid=38014