On euclidean domains |
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| Authors: | Alexander Brudnyi |
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| Affiliation: | Department of Mathematics , Technion , Haifa, 32000, Israel |
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| Abstract: | We consider Euclidean domains and their groups of units. Let K(a,b) be the set of remainders in the division of a by b. If Card K(a,b) = 1 for any a and b from a Euclidean domain R, then R is known to be isomorphic to the ring of polynomials over some field, see [4], [5]. On the other hand, the condition Card K(a,b) = 2 for any a and b implies that R is isomorphic to the ring Z of integers, see [2]. We give characterization of Euclidean domains and their groups of units under some other conditions on K(a,b). |
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| Keywords: | Element order Prime graph Projective special linear group |
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