Ideal Class Group Algorithms in the Ring of Integral Quaternions
| Autor: | Mosunov, Anton S. |
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| Rok vydání: | 2013 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | An ideal is a classical object of study in the field of algebraic number theory. In maximal quadratic orders of number fields, ideals usually represented by the $\mathbb Z$-basis. This form of representation is used in most of the algorithms for ideal manipulation. However, this is not the only option, as an ideal can also be represented by its generating set. Moreover, in certain quadratic orders of the ring of integral quaternions, every ideal can be represented by a single quaternion, called a pseudo generator. In this paper, we develop algorithms which allow us to manipulate ideals using solely their pseudo generators. We also demonstrate the connection between the three squares problem and factorization. This result comes as an extension of a number factoring technique discovered by Fermat, which allows the factoring of an integer if a pair of its two squares representations is known. In addition to this, we present a number of identities, which ideals must satisfy; some computational data on the number of ambiguous classes, generated by the equation $\rho\mu = -\mu\rho$; and a new approach to the problem of finding a non-trivial divisor of a class number. Comment: 41 page, 3 tables, 1 picture |
| Databáze: | arXiv |
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