History of the theory of numbers. Vol. I: Divisibility and primality. Vol. II: Diophantine analysis. Vol. III: Quadratic and higher forms. Reprint of the 1920-1923 originals. (English) Zbl 0958.11500
New York, NY: Chelsea Publishing Co. xii, 486 p./v.1; xxv, 803 p./v.2; v, 313 p./v.3 (1966).
These are unaltered reprintings of the original [Vol. I, Carnegie Inst. of Washington, Washington, D.C. (1920; JFM 47.0100.04); Vol II (1920; JFM 47.0100.04); Vol. III (1923; JFM 49.0100.12); reprinted, Chelsea, New York, 1952]. [The review in JFM 47.0100.04 is a joint review for both Vol.I and Vol.II.]
MSC:
11-00 | General reference works (handbooks, dictionaries, bibliographies, etc.) pertaining to number theory |
01A75 | Collected or selected works; reprintings or translations of classics |
Online Encyclopedia of Integer Sequences:
Generalized Wilson quotients (or Wilson quotients for composite moduli).Wilson numbers: n such that the generalized Wilson quotient A157249(n) is divisible by n.
Primitive, symmetric octuples of distinct numbers a,b,c,d,x,y,z,w with 0<a<b<c<d and a<x<y<z<w<d such that a^k + b^k + c^k + d^k = x^k + y^k + z^k + w^k, for k = 1,2,3.
Triangle read by rows: row n lists the smallest positive ideal multigrade of degree n, or 2n+2 zeros if none.