We propose in this paper a finite volume scheme to compute the solution of convection-diffusion equation on unstructured and non–conforming grids. The diffusive fluxes are approximated using the recently published SUSHI scheme in its cell centred version, that reaches a second order spatial convergence rate for the Laplace equation on any unstructured 2D/3D grids. As in the MUSCL method, the numerical convective fluxes are built with a prediction-limitation process which ensures that the discrete maximum principle is satisfied for pure convection problems. The limitation does not involve any geometrical reconstruction, thus allowing the use of completely general grids, in any space dimension.