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Chen, Imin - Department of Mathematics, Simon Fraser University
ON RELATIONS BETWEEN JACOBIANS OF CERTAIN MODULAR CURVES
ELLIPTIC CURVES WITH NON-SPLIT MOD 11 REPRESENTATIONS IMIN CHEN, CHRIS CUMMINS
ELEMENTARY ESTIMATES FOR A CERTAIN TYPE OF SOTO-ANDRADE SUM
ON CONGRUENCES MOD pm BETWEEN EIGENFORMS AND
A DIOPHANTINE EQUATION ASSOCIATED TO X0(5) Abstract. Several classes of Fermat type diophantine equations have been success-
Jacobians of modular curves associated to normalizers of Cartan subgroups of level pn
Singular Values of Thompson Series Imin Chen and Noriko Yui
SURJECTIVITY OF MOD REPRESENTATIONS ATTACHED TO ELLIPTIC CURVES AND CONGRUENCE PRIMES
ON THE EQUATION a2 Abstract. Using the method of Galois representations and modular
PERFECT POWERS EXPRESSIBLE AS SUMS OF TWO CUBES IMIN CHEN AND SAMIR SIKSEK
RELATIONS BETWEEN JACOBIANS OF MODULAR CURVES OF LEVEL p2 IMIN CHEN, BART DE SMIT, AND MARTIN GRABITZ
ON THE EQUATION s2 Abstract. We describe a criterion for showing that the equation s2
MULTI-FREY Q-CURVES AND THE DIOPHANTINE EQUATION a2 MICHAEL A. BENNETT AND IMIN CHEN
ON THE EQUATIONS a2 Abstract. We study the equation a2 -2b6 = cp, and its specialization a2 -2 = cp, using the
