Poisson map

Definition.
Given two Poisson manifolds $M$ and $N$ , a map $ϕ : M \to N$ is a Poisson map if

{F, G}_{N} = {F \circ ϕ, G \circ ϕ}_{M} .

for all smooth functions on $N$ .
$◼$

If the manifolds happen to be symplectic manifolds then $ϕ$ is a symplectomorphism. In particular, if the manifolds are the phase space of a classical mechanical system then $ϕ$ is a canonical map.

The Hamiltonian vector fields give rise to a local group of transformations which are Poisson maps (@olver86 proposition 6.16).