AbstractWe shall discuss the conjugacy problem of the modular group, and show how its solution, in conjunction with a theorem of Olga Taussky can be used to compute the class number of certain real quadratic number fields
We begin with background in algebraic number theory, specifically studying quadratic fields K and ri...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
AbstractLet G be a finite group. The question of how certain arithmetical conditions on the degrees ...
AbstractWe shall discuss the conjugacy problem of the modular group, and show how its solution, in c...
AbstractThe author has previously shown that there are exactly nine complex quadratic fields of clas...
The author has previously shown that there are exactly nine complex quadratic fields of class-number...
AbstractLet Ω denote the projective line over the real quadratic field and δ denote the projective l...
The class number problem is one of the central open problems of algebraic number theory. It has long...
The class number problem is one of the central open problems of algebraic number theory. It has long...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
This thesis contains several pieces of work related to the 2-part of class groups and Diophantine eq...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
We begin with background in algebraic number theory, specifically studying quadratic fields K and ri...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
AbstractLet G be a finite group. The question of how certain arithmetical conditions on the degrees ...
AbstractWe shall discuss the conjugacy problem of the modular group, and show how its solution, in c...
AbstractThe author has previously shown that there are exactly nine complex quadratic fields of clas...
The author has previously shown that there are exactly nine complex quadratic fields of class-number...
AbstractLet Ω denote the projective line over the real quadratic field and δ denote the projective l...
The class number problem is one of the central open problems of algebraic number theory. It has long...
The class number problem is one of the central open problems of algebraic number theory. It has long...
AbstractThis paper presents a general congruence modulo a certain power of 2 relating the class numb...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
This thesis contains several pieces of work related to the 2-part of class groups and Diophantine eq...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
We begin with background in algebraic number theory, specifically studying quadratic fields K and ri...
An element $g$ in a group $G$ is real if there exists $x\in G$ such that $xgx^{-1}=g^{-1}$. If $g$ i...
AbstractLet G be a finite group. The question of how certain arithmetical conditions on the degrees ...
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