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Pierre Fermat's father was
a wealthy leather merchant and second consul of Beaumont- de- Lomagne.
Pierre had a brother and two sisters and was almost certainly brought
up in the town of his birth. Although there is little evidence
concerning his school education it must have been at the local
Franciscan monastery.
He attended the University of Toulouse before moving to Bordeaux in
the second half of the 1620s. In Bordeaux he began his first serious
mathematical researches and in 1629 he gave a copy of his restoration
of Apollonius's Plane loci to one of the mathematicians there.
Certainly in Bordeaux he was in contact with Beaugrand and during this
time he produced important work on maxima and minima which he gave to
Étienne d'Espagnet who clearly shared mathematical interests with
Fermat.
From Bordeaux Fermat went to Orléans where he studied law at the
University. He received a degree in civil law and he purchased the
offices of councillor at the parliament in Toulouse. So by 1631 Fermat
was a lawyer and government official in Toulouse and because of the
office he now held he became entitled to change his name from Pierre
Fermat to Pierre de Fermat.
For the remainder of his life he lived in Toulouse but as well as
working there he also worked in his home town of Beaumont-de-Lomagne
and a nearby town of Castres. From his appointment on 14 May 1631
Fermat worked in the lower chamber of the parliament but on 16 January
1638 he was appointed to a higher chamber, then in 1652 he was
promoted to the highest level at the criminal court. Still further
promotions seem to indicate a fairly meteoric rise through the
profession but promotion was done mostly on seniority and the plague
struck the region in the early 1650s meaning that many of the older
men died. Fermat himself was struck down by the plague and in 1653 his
death was wrongly reported, then corrected:-
I informed you earlier of the death of Fermat. He is alive, and we no
longer fear for his health, even though we had counted him among the
dead a short time ago.
The following report, made to Colbert the leading figure in France at
the time, has a ring of truth:-
Fermat, a man of great erudition, has contact with men of learning
everywhere. But he is rather preoccupied, he does not report cases
well and is confused.
Of course Fermat was preoccupied with mathematics. He kept his
mathematical friendship with Beaugrand after he moved to Toulouse but
there he gained a new mathematical friend in Carcavi. Fermat met
Carcavi in a professional capacity since both were councillors in
Toulouse but they both shared a love of mathematics and Fermat told
Carcavi about his mathematical discoveries.
In 1636 Carcavi went to Paris as royal librarian and made contact with
Mersenne and his group. Mersenne's interest was aroused by Carcavi's
descriptions of Fermat's discoveries on falling bodies, and he wrote
to Fermat. Fermat replied on 26 April 1636 and, in addition to telling
Mersenne about errors which he believed that Galileo had made in his
description of free fall, he also told Mersenne about his work on
spirals and his restoration of Apollonius's Plane loci. His work on
spirals had been motivated by considering the path of free falling
bodies and he had used methods generalised from Archimedes' work On
spirals to compute areas under the spirals. In addition Fermat wrote:-
I have also found many sorts of analyses for diverse problems,
numerical as well as geometrical, for the solution of which Viète's
analysis could not have sufficed. I will share all of this with you
whenever you wish and do so without any ambition, from which I am more
exempt and more distant than any man in the world.
It is somewhat ironical that this initial contact with Fermat and the
scientific community came through his study of free fall since Fermat
had little interest in physical applications of mathematics. Even with
his results on free fall he was much more interested in proving
geometrical theorems than in their relation to the real world. This
first letter did however contain two problems on maxima which Fermat
asked Mersenne to pass on to the Paris mathematicians and this was to
be the typical style of Fermat's letters, he would challenge others to
find results which he had already obtained.
Roberval and Mersenne found that Fermat's problems in this first, and
subsequent, letters were extremely difficult and usually not soluble
using current techniques. They asked him to divulge his methods and
Fermat sent Method for determining Maxima and Minima and Tangents to
Curved Lines, his restored text of Apollonius's Plane loci and his
algebraic approach to geometry Introduction to Plane and Solid Loci to
the Paris mathematicians.
His reputation as one of the leading mathematicians in the world came
quickly but attempts to get his work published failed mainly because
Fermat never really wanted to put his work into a polished form.
However some of his methods were published, for example Hérigone added
a supplement containing Fermat's methods of maxima and minima to his
major work Cursus mathematicus. The widening correspondence between
Fermat and other mathematicians did not find universal praise.
Frenicle de Bessy became annoyed at Fermat's problems which to him
were impossible. He wrote angrily to Fermat but although Fermat gave
more details in his reply, Frenicle de Bessy felt that Fermat was
almost teasing him.
However Fermat soon became engaged in a controversy with a more major
mathematician than Frenicle de Bessy. Having been sent a copy of
Descartes' La Dioptrique by Beaugrand, Fermat paid it little attention
since he was in the middle of a correspondence with Roberval and
Étienne Pascal over methods of integration and using them to find
centres of gravity. Mersenne asked him to give an opinion on La
Dioptrique which Fermat did describing it as
groping about in the shadows.
He claimed that Descartes had not correctly deduced his law of
refraction since it was inherent in his assumptions. To say that
Descartes was not pleased is an understatement. Descartes soon found
reason to feel even more angry since he viewed Fermat's work on
maxima, minima and tangents as reducing the importance of his own work
La Géométrie which Descartes was most proud of and which he sought to
show that his Discours de la méthode alone could give.
Descartes attacked Fermat's method of maxima, minima and tangents.
Roberval and Étienne Pascal became involved in the argument and
eventually so did Desargues who Descartes asked to act as a referee.
Fermat proved correct and eventually Descartes admitted this writing:-
... seeing the last method that you use for finding tangents to curved
lines, I can reply to it in no other way than to say that it is very
good and that, if you had explained it in this manner at the outset, I
would have not contradicted it at all.
Did this end the matter and increase Fermat's standing? Not at all
since Descartes tried to damage Fermat's reputation. For example,
although he wrote to Fermat praising his work on determining the
tangent to a cycloid (which is indeed correct), Descartes wrote to
Mersenne claiming that it was incorrect and saying that Fermat was
inadequate as a mathematician and a thinker. Descartes was important
and respected and thus was able to severely damage Fermat's
reputation.
The period from 1643 to 1654 was one when Fermat was out of touch with
his scientific colleagues in Paris. There are a number of reasons for
this. Firstly pressure of work kept him from devoting so much time to
mathematics. Secondly the Fronde, a civil war in France, took place
and from 1648 Toulouse was greatly affected. Finally there was the
plague of 1651 which must have had great consequences both on life in
Toulouse and of course its near fatal consequences on Fermat himself.
However it was during this time that Fermat worked on number theory.
Fermat is best remembered for this work in number theory, in
particular for Fermat's Last Theorem. This theorem states that
xn + yn = zn
has no non-zero integer solutions for x, y and z when n > 2. Fermat
wrote, in the margin of Bachet's translation of Diophantus's
Arithmetica
I have discovered a truly remarkable proof which this margin is too
small to contain.
These marginal notes only became known after Fermat's son Samuel
published an edition of Bachet's translation of Diophantus's
Arithmetica with his father's notes in 1670.
It is now believed that Fermat's 'proof' was wrong although it is
impossible to be completely certain. The truth of Fermat's assertion
was proved in June 1993 by the British mathematician Andrew Wiles, but
Wiles withdrew the claim to have a proof when problems emerged later
in 1993. In November 1994 Wiles again claimed to have a correct proof
which has now been accepted.
Unsuccessful attempts to prove the theorem over a 300 year period led
to the discovery of commutative ring theory and a wealth of other
mathematical discoveries.
Fermat's correspondence with the Paris mathematicians restarted in
1654 when Blaise Pascal, Étienne Pascal's son, wrote to him to ask for
confirmation about his ideas on probability. Blaise Pascal knew of
Fermat through his father, who had died three years before, and was
well aware of Fermat's outstanding mathematical abilities. Their short
correspondence set up the theory of probability and from this they are
now regarded as joint founders of the subject. Fermat however, feeling
his isolation and still wanting to adopt his old style of challenging
mathematicians, tried to change the topic from probability to number
theory. Pascal was not interested but Fermat, not realising this,
wrote to Carcavi saying:-
I am delighted to have had opinions conforming to those of M Pascal,
for I have infinite esteem for his genius... the two of you may
undertake that publication, of which I consent to your being the
masters, you may clarify or supplement whatever seems too concise and
relieve me of a burden that my duties prevent me from taking on.
However Pascal was certainly not going to edit Fermat's work and after
this flash of desire to have his work published Fermat again gave up
the idea. He went further than ever with his challenge problems
however:-
Two mathematical problems posed as insoluble to French, English, Dutch
and all mathematicians of Europe by Monsieur de Fermat, Councillor of
the King in the Parliament of Toulouse.
His problems did not prompt too much interest as most mathematicians
seemed to think that number theory was not an important topic. The
second of the two problems, namely to find all solutions of Nx2 + 1 =
y2 for N not a square, was however solved by Wallis and Brouncker and
they developed continued fractions in their solution. Brouncker
produced rational solutions which led to arguments. Frenicle de Bessy
was perhaps the only mathematician at that time who was really
interested in number theory but he did not have sufficient
mathematical talents to allow him to make a significant contribution.
Fermat posed further problems, namely that the sum of two cubes cannot
be a cube (a special case of Fermat's Last Theorem which may indicate
that by this time Fermat realised that his proof of the general result
was incorrect), that there are exactly two integer solutions of x2 + 4
= y3 and that the equation x2 + 2 = y3 has only one integer solution.
He posed problems directly to the English. Everyone failed to see that
Fermat had been hoping his specific problems would lead them to
discover, as he had done, deeper theoretical results.
Around this time one of Descartes' students was collecting his
correspondence for publication and he turned to Fermat for help with
the Fermat - Descartes correspondence. This led Fermat to look again
at the arguments he had used 20 years before and he looked again at
his objections to Descartes' optics. In particular he had been unhappy
with Descartes' description of refraction of light and he now settled
on a principle which did in fact yield the sine law of refraction that
Snell and Descartes had proposed. However Fermat had now deduced it
from a fundamental property that he proposed, namely that light always
follows the shortest possible path. Fermat's principle, now one of the
most basic properties of optics, did not find favour with
mathematicians at the time.
In 1656 Fermat had started a correspondence with Huygens. This grew
out of Huygens interest in probability and the correspondence was soon
manipulated by Fermat onto topics of number theory. This topic did not
interest Huygens but Fermat tried hard and in New Account of
Discoveries in the Science of Numbers sent to Huygens via Carcavi in
1659, he revealed more of his methods than he had done to others.
Fermat described his method of infinite descent and gave an example on
how it could be used to prove that every prime of the form 4k + 1
could be written as the sum of two squares. For suppose some number of
the form 4k + 1 could not be written as the sum of two squares. Then
there is a smaller number of the form 4k + 1 which cannot be written
as the sum of two squares. Continuing the argument will lead to a
contradiction. What Fermat failed to explain in this letter is how the
smaller number is constructed from the larger. One assumes that Fermat
did know how to make this step but again his failure to disclose the
method made mathematicians lose interest. It was not until Euler took
up these problems that the missing steps were filled in.
Fermat is described in [9] as
Secretive and taciturn, he did not like to talk about himself and was
loath to reveal too much about his thinking. ... His thought, however
original or novel, operated within a range of possibilities limited by
that [1600 - 1650] time and that [France] place.
Carl B Boyer, writing in [2], says:-
Recognition of the significance of Fermat's work in analysis was
tardy, in part because he adhered to the system of mathematical
symbols devised by François Viète, notations that Descartes' Géométrie
had rendered largely obsolete. The handicap imposed by the awkward
notations operated less severely in Fermat's favourite field of study,
the theory of numbers, but here, unfortunately, he found no
correspondent to share his enthusiasm.
Article by: J J O'Connor and E F Robertson
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