The maximum parsimony distance d_MP(T₁,T₂) and the bounded-state maximum parsimony distance d_MP^t(T₁,T₂) measure the difference between two phylogenetic trees T₁,T₂ in terms of the maximum difference between their parsimony scores for any character (with t a bound on the number of states in the character, in the case of d_MP^t(T₁,T₂)). While computing d_MP(T₁,T₂) was previously shown to be fixed-parameter tractable with a linear kernel, no such result was known for d_MP^t(T₁,T₂). In this paper, we prove that computing d_MP^t(T₁,T₂) is fixed-parameter tractable for all t. Specifically, we prove that this problem has a kernel of size O(klg⁡k), where k=d_MP^t(T₁,T₂). As the primary analysis tool, we introduce the concept of leg-disjoint incompatible quartets, which may be of independent interest.