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Yasaki, Dan - Department of Mathematical Sciences, University of North Carolina, Greensboro
ON THE EXISTENCE OF SPINES FOR Q-RANK 1 GROUPS Abstract. Let X = \G/K be an arithmetic quotient of a symmetric space of
Hecke operators and Hilbert modular forms Paul E. Gunnells and Dan Yasaki
EXPLICIT REDUCTION FOR SU(2, 1; Z[i]) Abstract. Let \D be an arithmetic quotient of a symmetric space of non-
Hyperbolic tessellations associated to Bianchi Department of Mathematics and Statistics
PERFECT FORMS OVER TOTALLY REAL NUMBER FIELDS PAUL E. GUNNELLS AND DAN YASAKI
On modularity over number fields: "What is it that you do all day?"
INTEGRAL COHOMOLOGY OF CERTAIN PICARD MODULAR Abstract. Let be the Picard modular group of an imaginary quadratic
ELLIPTIC POINTS OF THE PICARD MODULAR Abstract. We explicitly compute the elliptic points and isotropy
BINARY HERMITIAN FORMS OVER A CYCLOTOMIC FIELD Abstract. Let be a primitive fifth root of unity and let F be the cyclotomic
Conjecture 1 To maximize (Xn1Om1 XnkOmk)
THE ARITHMETIC OF TREES ADRIANO BRUNO AND DAN YASAKI
