On monogenity of certain pure number fields defined by x2u· 3v· 5t-m
Abstract
Let K = Q (α) be a pure number field generated by a root α of a monic irreducible polynomial F(x) = x2u· 3v· 5t-m, with m ≠ 1 a square free rational integer, u, v and t three positive integers. In this paper, we study the monogenity of K. We prove that if m 14, m 19, and m∈\ 1, 7\25, then K is monogenic. But if m 14 or m 19 or m -19 and u=2k for some odd integer k or u 2 and m 125 or m -125 and u=2k for some odd integer k or u=v=1 and m 8254, then K is not monogenic.
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