AbstractIn this paper we study congruence conditions on class numbers of binary quadratic discriminants d, modulo powers of 2, where d has two or three distinct prime divisors
AbstractLet Q(−k) be an imaginary quadratic field with discriminant −k and class number h, with k≠3,...
In this note I prove that the class number of Q([radical sign][Delta](x)) is infinitely often divisi...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
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...
Abstract: I t is shown that a result of the authors yields an improvement on a theorem of P~ERRE BAR...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
AbstractCongruence conditions on the class numbers of complex quadratic fields have recently been st...
AbstractDiscriminantal divisors are defined, and the question is asked: Which discriminantal divisor...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
We will prove a theorem providing sufficient condition for the divisibility of class numbers of cert...
AbstractRepresentation of numbers by quadratic forms is closely related to the splitting character o...
AbstractIt can be deduced from a result of Gauss that the principal class of discriminant d represen...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
AbstractLet Q(−k) be an imaginary quadratic field with discriminant −k and class number h, with k≠3,...
In this note I prove that the class number of Q([radical sign][Delta](x)) is infinitely often divisi...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
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...
Abstract: I t is shown that a result of the authors yields an improvement on a theorem of P~ERRE BAR...
AbstractWe study the divisibility of the strict class numbers of the quadratic fields of discriminan...
AbstractCongruence conditions on the class numbers of complex quadratic fields have recently been st...
AbstractDiscriminantal divisors are defined, and the question is asked: Which discriminantal divisor...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
We will prove a theorem providing sufficient condition for the divisibility of class numbers of cert...
AbstractRepresentation of numbers by quadratic forms is closely related to the splitting character o...
AbstractIt can be deduced from a result of Gauss that the principal class of discriminant d represen...
AbstractLet h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of...
Let h(d) denote the class number of the quadratic field Q(√d) of discriminant d. A number of new det...
AbstractLet Q(−k) be an imaginary quadratic field with discriminant −k and class number h, with k≠3,...
In this note I prove that the class number of Q([radical sign][Delta](x)) is infinitely often divisi...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...