We show that, given some lacunary sequence of angles θ=(θ_j)_j∈N not converging too fast to zero, it is possible to build a rare differentiation basis B of rectangles parallel to the axes that differentiates L¹(R²) while the basis B_θ obtained from B by allowing its elements to rotate around their lower left vertex by the angles θ_j, j∈N, fails to differentiate all Orlicz spaces lying between L¹(R²) and Llog L(R²).

This work was partially supported by the French ANR project "GEOMETRYA'' no. ANR-12-BS01-0014.