Data

Magma computer program for J-groups and exponent polynomials

The University of Western Australia
Glasby, Stephen
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ctx_ver=Z39.88-2004&rft_val_fmt=info%3Aofi%2Ffmt%3Akev%3Amtx%3Adc&rfr_id=info%3Asid%2FANDS&rft_id=info:doi10.26182/x36d-3b55&rft.title=Magma computer program for J-groups and exponent polynomials&rft.identifier=10.26182/x36d-3b55&rft.publisher=The University of Western Australia&rft.description=This is supporting Magma computer code for the paper Groups G satisfying a functional equation f(xk)=xf(x) for some k in G by Dominik Bernhardt, Tim Boykett, Alice Devillers, Johannes Flake and S.P. Glasby, see the Mathematics arXiv. The code gives a series of functions for computing with J-groups. In particular it justifies the claim made in Remark 4.12 that Theorem 4.10 holds for c=7 and p>3.&rft.creator=Glasby, Stephen &rft.date=2021&rft_rights=&rft_subject=Magma Computer code&rft_subject=J-groups&rft.type=dataset&rft.language=English Access the data

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This is supporting Magma computer code for the paper "Groups G satisfying a functional equation f(xk)=xf(x) for some k in G" by Dominik Bernhardt, Tim Boykett, Alice Devillers, Johannes Flake and S.P. Glasby, see the Mathematics arXiv. The code gives a series of functions for computing with J-groups. In particular it justifies the claim made in Remark 4.12 that Theorem 4.10 holds for c=7 and p>3.

Created: 2021-05-07 to 2021-05-07

Issued: 2021-05-07

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