For a given integer $m$ and a hereditary algebra $H$, the $m$-cluster category of $H$, $\mathcal{C}_m(H)$ is obtained from the derived category $\mathcal{D}(H)$ by identifying the Auslander-Reiten translation with the $m^{\rm th}$ power of the shift $[1]^m:=[m]$. In $\mathcal{C}_m(H)$ there are cluster tilting objects, whose endomorphisms algebras are called $m$-cluster tilted algebras.

The aim of this work is to classify the algebras that are derived equivalent to $m$-cluster tilted algebras of type $\mathbb{A}$. The first result states that a connected algebra $A=kQ/I$ is derived equivalent to an $m$-cluster tilted algebra of type $\mathbb{A}$ if and only of it is gentle, having exactly $|Q_1|-|Q_0|+1$ oriented cycles of length $m+2$ each of which has full relations. We then prove:

{\bf Theorem:} Let $A = kQ/I$ and $A' = k'Q'/I'$ be connected algebras derived equivalent to $m$-cluster tilted algebras of type $\mathbb{A}$. Then (among others) the following conditions are equivalent. \begin{enumerate} \item $A$ and $A'$ are derived equivalent, \item $A$ and $A'$ are tilting-cotilting equivalent, \item ${\rm HH}^\ast(A)\simeq {\rm HH}^\ast(A)$ and $K_0(A)\simeq K_0 (A')$ \item $\pi_1(Q, I) \simeq \pi_1 (Q' , I' )$ and $|Q_0| = |Q'_0|$. \end{enumerate} Our approach differs from previous works on related topics in the fact that we use the Hochschild cohomology ring as a derived invariant. We shall discuss about the proof and derive some consequences, among which we recover previous known results.