Search Results

Here is an application of Frobenius theorem of $1907$. Let $G$ be a finite group and $p$ a prime number. Write $G_p$ for the set of elements of $G$ of $p$-power order and $|G|_p$ for the $p$-part of t …

I suspect that Solomon, Louis The affine group. I. Bruhat decomposition. proves what you are looking for. Let $A_n(q)$ denote the poset of proper affine subspaces of $\mathbf{F}_q^n$. The only non-van …

Let $\mathrm{CO}(m)$ be the set of all compositions of the positive integer $m$. By a composition of $m$, I mean a finite sequence $(m_1,\ldots,m_k)$ of positive integers with sum $\sum m_i=m$. The …