$q$-VFCA: $q$-state Vector-valued Fuzzy Cellular Automata.

Elementary fuzzy Cellular Automata (CA) are known as continuous counterpart of elementary CA, which are 2-state CA, via the polynomial representation of local rules. In this paper, we first develop a new fuzzification methodology for $q$-state CA. It is based on the vector representation of q-state CA, that is, the $q$-states are assigned to the standard basis vectors of the q-dimensional real space and the local rule can be expressed by a tuple of $q$ polynomials. Then, the q-state vector-valued fuzzy CA are defined by expanding the set of the states to the convex hull of the standard basis vectors in the $q$-dimensional real space. The vector representation of states enables us to enumerate the number-conserving rules of 3-state vector-valued fuzzy CA in a systematic way.