The most popular method for establishing bisimilarities among processes is to exhibit bisimulation relations. By definition, R is a bisimulation relation if R progresses to R itself, i.e., pairs of processes in R can match each other's actions and their derivatives are again in R. We study generalisations of the method aimed at reducing the size of the relations to be exhibited and hence relieving the proof work needed to establish bisimilarity results. We allow a relation R to progress to a different relation F(R), where F is a function on relations. Functions that can be safely used in this way (i.e., such that if R progresses to F(R), then R only includes pairs of bisimilar processes) are sound. We give a simple condition that ensures soundness. We show that the class of sound functions contains non-trivial functions and we study the closure properties of the class with respect to various important function constructors, like composition, union and iteration. These properties allow us to construct sophisticated sound functions - and hence sophisticated proof techniques for bisimilarity - from simpler ones. The usefulness of our proof techniques is supported by various non-trivial examples drawn from the process algebras CCS and π-calculus. They include the proof of the unique solution of equations and the proof of a few properties of the replication operator. Among these, there is a novel result that justifies the adoption of a simple form of prefix-guarded replication as the only form of replication in the π-calculus.
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