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The Geometry of Numbers*

Published online by Cambridge University Press:  03 November 2016

Extract

I WOULD like first to thank the Association for the honour they have done me in inviting me to lecture at this meeting. It is, however, an honour which carries with it a certain danger. When a mathematician comes to lecture on a subject in which he has specialised, he is always liable to suffer from the delusion that what has gradually become plain and straightforward to him will at once appear plain and straightforward to others. It may be that I am suffering from this delusion in thinking that I can present the main idea of the geometry of numbers in one lecture.

Type
Research Article
Copyright
Copyright © Mathematical Association 1947

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Footnotes

*

Lecture delivered on 9th April, 1947, to be General Meeting of the Mathematical Association.

References

page 207 note * This answer would be of the kind envisaged earlier, since the volume of the ellipsoid is expressible in terms of λ and the determinant of the quadratic form, which is the sole algebraic invariant of the form.

page 207 note For brevity, I am using the word congruent to mean that the one body can be derived from the other by a translation only.

page 208 note * To avoid complications which are irrelevant to the argument, I have not defined the term “body” It will suffice we understand it as meaning any set of points which is open (i.e. every point is an interiror point), and possesses a volume, in any of the various ways in which “volume” can be defined.

page 209 note * See a later account by Blichfeldt in Math. Annalen, 101 (1929), pp. 605-8.

page 210 note * This proof was given by Hermite in 1853 (Oeuvres, I, p. 288). Of course he could not appeal to Minkowski’s theorem; in place of it he used his own result on the minimum of a positive definite quadratic form. Professor Forder has drawn my attention to a somewhat similar proof by Grace, J London Math. Soc., 2 (1927), pp. 3-8.

page 210 note In connection with this step, I cannot refrain from referring to Professor Mordell’s note in this Gazette, 26 (1942), p. 52, on Lewis Carroll’s diary. Lewis Caroll found considerable difficulty in proving that if m is a sum of two squares, so is 2m.