DOIAbstract
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g is a prime of the form 27n2 + 4
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g is a prime of the form 27n2 + 4
For a positive integer k and a certain arithmetic progression A, there exist infinitely many quadrat...
AbstractLet d, d1, d2 ϵ N be square free with d=d1d2, and let h(-d) and IK denote the class number a...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
The authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 ...
The authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 ...
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g...
AbstractWe prove a congruence modulo a certain power of 2 for the class numbers of the quadratic fie...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
Abstract. Divisibility properties of class numbers is very important to know the structure of ideal ...
It is proved that the 3-part of the class number of a quadratic field Q( D) is O(|D|55/112+) in gene...
AbstractLet Δ(u) denote the discriminant of x3 + (u + 1) x2 − (u + 2) x − 1. The polynomial Δ(u) fac...
AbstractLet Δ(u) denote the discriminant of x3 + (u + 1) x2 − (u + 2) x − 1. The polynomial Δ(u) fac...
AbstractIn this paper our attempt is to investigate the class number problem of imaginary quadratic ...
AbstractThe theorem presented in this paper provides a sufficient condition for the divisibility of ...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
For a positive integer k and a certain arithmetic progression A, there exist infinitely many quadrat...
AbstractLet d, d1, d2 ϵ N be square free with d=d1d2, and let h(-d) and IK denote the class number a...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
The authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 ...
The authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 ...
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g...
AbstractWe prove a congruence modulo a certain power of 2 for the class numbers of the quadratic fie...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
Abstract. Divisibility properties of class numbers is very important to know the structure of ideal ...
It is proved that the 3-part of the class number of a quadratic field Q( D) is O(|D|55/112+) in gene...
AbstractLet Δ(u) denote the discriminant of x3 + (u + 1) x2 − (u + 2) x − 1. The polynomial Δ(u) fac...
AbstractLet Δ(u) denote the discriminant of x3 + (u + 1) x2 − (u + 2) x − 1. The polynomial Δ(u) fac...
AbstractIn this paper our attempt is to investigate the class number problem of imaginary quadratic ...
AbstractThe theorem presented in this paper provides a sufficient condition for the divisibility of ...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
For a positive integer k and a certain arithmetic progression A, there exist infinitely many quadrat...
AbstractLet d, d1, d2 ϵ N be square free with d=d1d2, and let h(-d) and IK denote the class number a...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
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