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Finite field Frederic P Miller
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Finite field
Frederic P Miller
Publisher Marketing: Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In abstract algebra, a finite field or Galois field (so named in honor of Evariste Galois) is a field that contains only finitely many elements. Finite fields are important in number theory, algebraic geometry, Galois theory, cryptography, and coding theory. The finite fields are classified by size; there is exactly one finite field up to isomorphism of size pk for each prime p and positive integer k. Each finite field of size q is the splitting field of the polynomial xq - x, and thus the fixed field of the Frobenius endomorphism which takes x to xq. Similarly, the multiplicative group of the field is a cyclic group. Wedderburn's little theorem states that the Brauer group of a finite field is trivial, so that every finite division ring is a finite field. Finite fields have applications in many areas of mathematics and computer science, including coding theory, LFSRs, modular representation theory, and the groups of Lie type. Finite fields are an active area of research, including recent results on the Kakeya conjecture and open problems on the size of the smallest primitive root.
| メディア | 書籍 Book |
| リリース済み | 2013年1月28日 |
| ISBN13 | 9786130215040 |
| 出版社 | Alphascript Publishing |
| ページ数 | 114 |
| 寸法 | 152 × 229 × 7 mm · 250 g (重量(概算)) |
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