We present an algorithm that computes Friedl and Lück’s twisted $L^2$-Euler characteristic for a suitable CW complex, employing Oki’s matrix expansion algorithm to indirectly evaluate the Dieudonné determinant. The algorithm needs to run for an extremely long time to certify its outputs, but a truncated, human-assisted version produces very good results in many cases, such as hyperbolic link complements, closed census 3-manifolds, free-by-cyclic groups, and higher-dimensional examples, such as the fiber of the Ratcliffe–Tschantz manifold.
Computing the twisted $L^{2}$-Euler characteristic
Jacopo Guoyi Chen
2025
Abstract
We present an algorithm that computes Friedl and Lück’s twisted $L^2$-Euler characteristic for a suitable CW complex, employing Oki’s matrix expansion algorithm to indirectly evaluate the Dieudonné determinant. The algorithm needs to run for an extremely long time to certify its outputs, but a truncated, human-assisted version produces very good results in many cases, such as hyperbolic link complements, closed census 3-manifolds, free-by-cyclic groups, and higher-dimensional examples, such as the fiber of the Ratcliffe–Tschantz manifold.File in questo prodotto:
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