Solvable Groups in which Every Real Element has Prime Power Order

Abstract: We study the finite solvable groups $G$ in which every real element has prime power order. We divide our examination into two parts: the case $\textbf{O}2(G)>1$ and the case $\textbf{O}_2(G)=1$. Specifically we proved that if $\textbf{O}_2(G)>1$ then $G$ is a ${2,p}$-group. Finally, by taking into consideration the examples presented in the analysis of the $\textbf{O}_2(G)=1$ case, we deduce some interesting and unexpected results about the connectedness of the real prime graph $\Gamma{\mathbb{R}}(G)$. In particular, we found that there are groups such that $\Gamma_{\mathbb{R}}(G)$ has respectively 3 and 4 connected components.