Type: Paratext
Publication Date: 2023-03-03
Citations: 0
DOI: https://doi.org/10.1090/btran/2023-10-11
We develop an abstract framework for studying the strong form of Malleâs conjecture [J. Number Theory 92 (2002), pp. 315â329; Experiment. Math. 13 (2004), pp. 129â135] for nilpotent groups $G$ in their regular representation. This framework is then used to prove the strong form of Malleâs conjecture for any nilpotent group $G$ such that all elements of order $p$ are central, where $p$ is the smallest prime divisor of $\# G$. We also give an upper bound for any nilpotent group $G$ tight up to logarithmic factors, and tight up to a constant factor in case all elements of order $p$ pairwise commute. Finally, we give a new heuristical argument supporting Malleâs conjecture in the case of nilpotent groups in their regular representation.
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