Intersection problems in the q-ary cube

We propose new intersection problems in the q-ary n-dimensional hypercube. The answers to the problems include the Katona's t-intersection theorem and the Erdős–Ko–Rado theorem as special cases. We solve some of the basic cases of our problems, and for example we get an Erdős–Ko–Rado type result for t-intersecting k-uniform families of multisets with bounded repetitions. Another case is obtained by counting the number of lattice points in a polytope having an intersection property.