New prime-producing quadratic polynomials associated with class number one or two. Mollin, R.A. — 2002 The New York Journal of Mathematics [electronic only]
Construction of families of long continued fractions. Mollin, R.A. — 2003 Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]
A simple criterion for solvability of both X 2 - D Y 2 = c and x 2 - D y 2 = - c . Mollin, R.A. — 2001 The New York Journal of Mathematics [electronic only]
Lagrange, central norms, and quadratic Diophantine equations. Mollin, R.A. — 2005 International Journal of Mathematics and Mathematical Sciences
The power of powerful numbers. Mollin, R.A. — 1987 International Journal of Mathematics and Mathematical Sciences
More on the Schur group of a commutative ring. Mollin, R.A. — 1985 International Journal of Mathematics and Mathematical Sciences
Uniform distribution of Hasse invariants. Mollin, R.A. — 1985 International Journal of Mathematics and Mathematical Sciences
More on the Schur group of a commutative ring. Mollin, R.A. — 1985 International Journal of Mathematics and Mathematical Sciences
Admissible groups, symmetric factor sets, and simple algebras. Mollin, R.A. — 1984 International Journal of Mathematics and Mathematical Sciences
Norm form equations and continued fractions. Mollin, R.A. — 2005 Acta Mathematica Universitatis Comenianae. New Series
A note on the Diophantine equation D 1 x 2 + D 2 = a k n . Mollin, R.A. — 2005 Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]
Generalized Lagrange criteria for certain quadratic Diophantine equations. Mollin, R.A. — 2005 The New York Journal of Mathematics [electronic only]
The rational canonical form of a matrix. Devitt, J.S.; Mollin, R.A. — 1986 International Journal of Mathematics and Mathematical Sciences
On powerful numbers. Mollin, R.A.; Walsh, P.G. — 1986 International Journal of Mathematics and Mathematical Sciences
On permutation polynomials over finite fields. Mollin, R.A.; Small, C. — 1987 International Journal of Mathematics and Mathematical Sciences
The Diophantine equation A X 2 - B Y 2 = C solved via continued fractions. Mollin, R.A.; Cheng, K.; Goddard, B. — 2002 Acta Mathematica Universitatis Comenianae. New Series