Is there a separative forcing notion $\mathbb{P}$ such that:

1) For any $p \in\mathbb{P}, \mathbb{P}/p = \{q \in \mathbb{P}: q \leq p  \}$ is not forcing isomorphic to any homogeneous forcing notion,

2) For all $G$, $\mathbb{P}$-generic over $V$, $HOD^{V[G]} \subseteq V$.

Here by homogeneity I mean cone homogeneity, i.e. for any p, q in 
 $\mathbb{P}$, there are $p' \leq p, q' \leq q$ and an isomorphism from  $\mathbb{P}/ p' $ onto  $\mathbb{P}/q'.$