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Byeon, Dongho - Department of Mathematical Sciences, Seoul National University
Rank-one quadratic twists of an infinite family of elliptic curves
ELLIPTIC CURVES OF RANK 1 SATISFYING THE 3-PART OF THE BIRCH AND SWINNERTON-DYER
Class number one problem for pure cubic fields of Rudman-Stender type
Indivisibility of class numbers of imaginary quadratic function fields
Class numbers of quadratic fields Dongho Byeon
Existence of certain fundamental discriminants and class numbers of
Mollin's conjecture Dongho Byeon, Myoungil Kim, and Jungyun Lee (Seoul)
ON THE CANCELLATION PROBLEM OF Dongho Byeon and Hyun Kwang Kim
A COMPLETE DETERMINATION OF RABINOWITSCH POLYNOMIALS
Divisibility of class numbers of imaginary quadratic fields whose
Ranks of quadratic twists of an elliptic curve Dongho Byeon
On the finiteness of certain Rabinowitsch polynomials II
On the finiteness of certain Rabinowitsch polynomials
A note on class number 1 criteria for totally real algebraic number fields
Indivisibility of Class Numbers and Iwasawa l-Invariants of Real Quadratic Fields
Special values of zeta functions of the simplest cubic fields and their applications
Quadratic twists of elliptic curves associated to the simplest cubic fields
Journal of Number Theory 79, 249 257 (1999) Class Numbers and Iwasawa Invariants of Certain
Imaginary quadratic fields whose Iwasawa -invariant is equal to 1
A note on basic Iwasawa -invariants of imaginary quadratic fields and the
Imaginary quadratic fields with noncyclic ideal class groups
A note on the existence of certain infinite families of imaginary
A note on class numbers of the simplest cubic fields
Class number 3 problem for the simplest cubic fields
RATIONAL TORSION ON OPTIMAL CURVES AND RANK-ONE QUADRATIC TWISTS