학술지International Journal of Number Theory (1793-0421), 18, 485 ~ 500
등재유형SCIE
게재일자 20220401
Given a number field L, we define the degree of an algebraic number v ∈ L with respect to a choice of a primitive element of L. We propose the question of computing the minimal degrees of algebraic numbers in L, and examine these values in degree 4 Galois extensions over Q and triquadratic number fields.
