Semi-invariants in irreversible statistical mechanics

A short introduction on topological properties of (regular and random) geometrical sets is presented along with some recent results concerning the behaviour of the Euler-Poincareć haracteristic with respect to the (Fortuin-Kasteleyn) random cluster measure.

It is shown that equilibrium states of classical systems of point particles are translation invariant whenever they have integrable clustering. Equilibrium states are defined by correlation functions obeying the BBGKY hierarchy. The result holds for two-body forces which may have locally integrable

We show that if \(\phi\) is a Drinfeld \(A\)-module over a field \(L\), then any polynomial \(g(x) \in L[x]\) which maps the a-torsion into itself for all \(a \in A\) must be an endomorphism of \(\phi\). In generic characteristic, we prove a stronger result: if there is an infinite \(A\)-submodule \