Herbert Gangl, Paul E. Gunnells, Jonathan Hanke, Dan Yasaki
Published 2023-08-12Version 1
We report on computations of the cohomology of GL_2(O_D) and SL_2(O_D), where D<0 is a fundamental discriminant. These computations go well beyond earlier results of Vogtmann and Scheutzow. We use the technique of homology of Voronoi complexes, and our computations recover the integral cohomology away from the primes 2, 3. We observed exponential growth in the torsion subgroup of H^2 as $D$ increases, and compared our data to bounds of Rohlfs.
Denominators of Eisenstein cohomology classes for GL_2 over imaginary quadratic fields
On the elliptic curve $ y^{2} = x (x^2 + p)$ over some certain imaginary quadratic fields
A generalized Hermite constant and its computations for imaginary quadratic fields
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