We compute the local integrals of motions of the classical limit of the
lattice sine-Gordon system, using a geometrical interpretation of the local
sine-Gordon variables. Using an analogous description of the screened local
variables, we show that these integrals are in involution. We present some
remarks on relations with the situation at roots of 1 and results on another
latticisation (linked to the principal subalgebra of sℓ2​
rather than the homogeneous one). Finally, we analyse a module of ``screened
semilocal variables'', on which the whole sℓ2​ acts.Comment: (references added