FILOMAT

In this paper we illustrate a tight interplay between homotopy
theory and combinatorics within toric topology by explicitly calculating homotopy
and combinatorial invariants of toric objects associated with the dodecahedron.
In particular, we calculate the cohomology ring of the (complexand real) moment-angle manifolds over the dodecahedron, and of a certain quasitoric manifold and of a related small cover. We nish by studying Massey
products in the cohomology ring of moment-angle manifolds over the dodecahedron
and how the existence of nontrivial Massey products in uences the
behaviour of the Poincare series of the corresponding Pontryagin algebra