his work is a study of the inter-translatability of two closely related proof methods, i.e. tableau (or sequent) and connection based, in the case of the propositional modal logics K, K4, T, S4, paying particular attention to the relation between matrix multiplicity and multiple use of ngr 0-formulae (contractions) in tableaux/sequent proofs. The motivation of the work is the following. Since the role of a multiplicity in matrix methods is the encoding of the number of copies of a given formula that are needed in order to prove a valid formula, it is important to find upper bounds for multiplicities in order to reduce as much as possible the search space for proofs. Moreover, it is obviously a crucial issue if the matrix method is to be us...