Permutationally invariant processes in arbitrary multiqudit systems

We establish the theoretical framework for an exact description of the open system dynamics of permutationally invariant (PI) states in arbitrary N-qudit systems when this dynamics preserves the PI symmetry over time. Thanks to Schur-Weyl duality powerful formalism, we identify an orthonormal operator basis in the PI operator subspace of the Liouville space onto which the master equation can be projected and we provide the exact expansion coefficients in the most general case. Our approach does not require to compute the Schur transform as it operates directly within the restricted operator subspace, whose dimension only scales polynomially with the number of qudits. We introduce the concept of $3\nu$-symbol matrix that proves to be very useful in this context.