AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numbers and units of the quadratic fields whose discriminants are divisors of 8m, where m > 1 is a given square-free rational integer. An application of this congruence gives some relations between the class numbers and units of the quadratic fields Q(m1/2) and Q((− m)1/2)
Let h(d) denote the class number of the quadratic field Q(Jrd) of discriminant d. A number of new de...
Let p ≡ 5 (mod 8) be a prime. Let h formula presented the class number of the quadratic field Q form...
AbstractIn this paper we study congruence conditions on class numbers of binary quadratic discrimina...
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...
AbstractCongruences modulo 8 for class numbers h and h∗ of Q(√m) and Q(√−m) are obtained, 3 < m ∈ Z ...
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
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...
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 ...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
Let h(d) denote the class number of the quadratic field Q(Jrd) of discriminant d. A number of new de...
Let p ≡ 5 (mod 8) be a prime. Let h formula presented the class number of the quadratic field Q form...
AbstractIn this paper we study congruence conditions on class numbers of binary quadratic discrimina...
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...
AbstractCongruences modulo 8 for class numbers h and h∗ of Q(√m) and Q(√−m) are obtained, 3 < m ∈ Z ...
AbstractThe authors prove that the class number of the quadratic field Q(√−g) is divisible by 3 if g...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
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...
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 ...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
Let h(d) denote the class number of the quadratic field Q(Jrd) of discriminant d. A number of new de...
Let p ≡ 5 (mod 8) be a prime. Let h formula presented the class number of the quadratic field Q form...
AbstractIn this paper we study congruence conditions on class numbers of binary quadratic discrimina...
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