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Seva
Seva
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Let $G$ be a finite group. We denote by $d(G)$ the minimal size of a generating set andDenote by $D(G)$ the maximal size of a minimal generating set, (minimal in the sense of inclusion). I vaguely remember seeing recently something on $D(G)$. Can anyone refer me to anything new or old?

Let $G$ be a finite group. We denote by $d(G)$ the minimal size of a generating set and by $D(G)$ the maximal size of a minimal generating set, (minimal in the sense of inclusion). I vaguely remember seeing recently something on $D(G)$. Can anyone refer me to anything new or old?

Let $G$ be a finite group. Denote by $D(G)$ the maximal size of a minimal generating set, (minimal in the sense of inclusion). I vaguely remember seeing recently something on $D(G)$. Can anyone refer me to anything new or old?

Corrected spelling typo in title
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edit approved Dec 21, 2015 at 15:13
David A. Jackson
edit approved Dec 21, 2015 at 15:13
David A. Jackson
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Maximal size of minmialminimal generating set

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Yiftach Barnea
Yiftach Barnea
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Maximal size of minmial generating set

Let $G$ be a finite group. We denote by $d(G)$ the minimal size of a generating set and by $D(G)$ the maximal size of a minimal generating set, (minimal in the sense of inclusion). I vaguely remember seeing recently something on $D(G)$. Can anyone refer me to anything new or old?