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Comparing the number of ideals in quadratic number fields
Mathematical Modelling and Control 2022, 2(4): 268-271
Published: 15 December 2022
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Denote by a K ( n ) the number of integral ideals in K with norm n, where K is a algebraic number field of degree m over the rational field Q . Let p be a prime number. In this paper, we prove that, for two distinct quadratic number fields K i = Q ( d i ) , i = 1 , 2, the sets both

{ p | a K 1 ( p ) < a K 2 ( p ) } and { p | a K 1 ( p 2 ) < a K 2 ( p 2 ) }

have analytic density 1 / 4, respectively.

Total 1