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CHAP PAGE I Introduction and Summary
Dedekinds Theoky of Ideal Numbers
Canonical Form of an Integral Basis
13 other sections not shown
algebraic integers algebraic numbers argument arithmetical basj basp belongs CHAPTER complex integer compound modulus congruence contains cubic field cyclotomic field Dedekind degree g determine diagram of squares discriminant divides edge exactly Fermat's last theorem field of algebraic form the stem Further hasp Hence highly divisible ideal numbers integral basis integral polynomial irreducible divisors mod irreducible equation irreducible mod irreducible polynomial isobaric mod least lower rank marked node modd modj modp modp2 notation number-field obtained partial basis prime factors prime ideal factors prime ideals attached prime number product of irreducible proved q=ph rational integers rational integral values readily seen relative field relative-field represented by nodes respectively roots s)th term satisfied second dissection separates the prime shewn shews slant solution super-field Taking terms represented theorem third dissection unique positive integers unique product uniquely expressible unity whence