Can someone suggest me some source where the author has classified all non-isomorphic groups of order $p^5$ ?
Edit 1 : I need complete classification (not upto isoclinism), and also in finitely presented form . I found that with increase in value of prime $p$, number of groups increases. So, can we completely classify all groups of order $p^5$ for any prime $p$, in finitely presented form or get their structure description ?
There are several papers in the literature on the classification of groups of order $p^5$. For example,
R. James, The groups of order $p^6$ (p an odd prime), Math. Comp. 34 (1980), 613-637,
also contains the case $p^5$.