Mimar Sinan Fine Arts University Institutional Repository
DSpace@MSGSÜ digitally stores academic resources such as books, articles, dissertations, bulletins, reports, research data published directly or indirectly by Mimar Sinan Fine Arts University in international standarts, helps track the academic performance of the university, provides long term preservation for resources and makes publications available to Open Access in accordance with their copyright to increase the effect of publications.
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Let k be an algebraically closed field of prime characteristic p and P a finite p-group. We compute the Scott kG-module with vertex P when F is a constrained fusion system on P and G is Park's group for F. In the case that ...
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We present a sufficient condition for the kG-Scott module with vertex P to remain indecomposable under the Brauer construction for any subgroup Q of P as k[QC(G)(Q)]-module, where k is a field of characteristic 2, and P ...
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We give a sufficient condition for the kG-Scott module with vertex P to remain indecomposable under taking the Brauer construction for any subgroup Q of P as k[QCG(Q)]-module, where k is a field of characteristic 2, and P ...
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We give a handy way to have a situation that the kG-Scott module with vertex P remains indecomposable under taking the Brauer construction for any subgroup Q of P as k[QCG(Q)]-module, where k is a field of characteristic ...
