Many of the mathematical models used in quasicrystal physics are based on
tilings of the plane or space obtained by using strip projection method in a
superspace of dimension four, five or six. We present some mathematical results
which allow one to use this very elegant method in spaces of dimension much
higher and to generate directly quasiperiodic packings of multi-shell clusters.
We show that in the case of a two-dimensional (resp. three-dimensional) cluster
we have to compute only determinants of order three (resp. four), independently
of the dimension of the superspace we use. The computer program based on our
mathematical results is very efficient. For example, we can easily generate
quasiperiodic packings of three-shell icosahedral clusters (icosahedron +
dodecahedron + icosidodecahedron) by using strip projection method in a
31-dimensional space (hundreds of points are obtained in a few minutes on a
personal computer).