In this thesis, we investigate two important notions of category theory: monads and multicategories. First, we contribute to the formal theory of pseudomonads, i.e. the analogue for pseudomonads of the formal theory of monads. In particular, we solve a problem posed by Lack by proving that, for every Gray-category K, there is a Gray-category Psm(K) of pseudomonads in K. We then establish a triequivalence between Psm(K) and the Gray-category of pseudomonads introduced by Marmolejo and give a simpler version of his proof of the equivalence between pseudodistributive laws and liftings of pseudomonads to 2-categories of pseudoalgebras. Secondly, we introduce the notion of a distributive law between a relative monad and a monad. We c...