Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/135153/1/blms0075.pd
Assuming Generalized Riemann's Hypothesis, Bach proved that the class group SICK of a number field K...
AbstractHere, we construct infinitely many number fields of any given degree d>1 whose class numbers...
AbstractIn this note I prove that the class number of Q(√Δ(x)) is infinitely often divisible by n, w...
AbstractThe author has previously shown that there are exactly nine complex quadratic fields of clas...
We prove an improvement on Schmidt's upper bound on the number of number fields of degree $n$ and ab...
AbstractIn 1952, Kurt Heegner gave a proof of the fact that there are exactly nine complex quadratic...
The author has previously shown that there are exactly nine complex quadratic fields of class-number...
AbstractIn this paper we show that there are, up to isomorphisms, exactly 15 totally imaginary eight...
2000 Mathematics Subject Classification: Primary: 11D09, 11A55, 11C08, 11R11, 11R29; Secondary: 11R6...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46217/1/208_2005_Article_BF01351721.pd
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
AbstractLet d, d1, d2 ϵ N be square free with d=d1d2, and let h(-d) and IK denote the class number a...
Assuming Generalized Riemann's Hypothesis, Bach proved that the class group SICK of a number field K...
AbstractHere, we construct infinitely many number fields of any given degree d>1 whose class numbers...
AbstractIn this note I prove that the class number of Q(√Δ(x)) is infinitely often divisible by n, w...
AbstractThe author has previously shown that there are exactly nine complex quadratic fields of clas...
We prove an improvement on Schmidt's upper bound on the number of number fields of degree $n$ and ab...
AbstractIn 1952, Kurt Heegner gave a proof of the fact that there are exactly nine complex quadratic...
The author has previously shown that there are exactly nine complex quadratic fields of class-number...
AbstractIn this paper we show that there are, up to isomorphisms, exactly 15 totally imaginary eight...
2000 Mathematics Subject Classification: Primary: 11D09, 11A55, 11C08, 11R11, 11R29; Secondary: 11R6...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46217/1/208_2005_Article_BF01351721.pd
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
AbstractWe use the Siegel-Tatuzawa theorem to determine real quadratic fields Q(√m2+4) and Q(√m2+1) ...
We prove that the number of quartic fields $K$ with discriminant $|\Delta_K|\leq X$ whose Galois clo...
AbstractLet d, d1, d2 ϵ N be square free with d=d1d2, and let h(-d) and IK denote the class number a...
Assuming Generalized Riemann's Hypothesis, Bach proved that the class group SICK of a number field K...
AbstractHere, we construct infinitely many number fields of any given degree d>1 whose class numbers...
AbstractIn this note I prove that the class number of Q(√Δ(x)) is infinitely often divisible by n, w...
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