A method of proving interpolation in paraconsistent extensions of the minimal logic

The interpolation property in extensions of Johansson's minimal logic is investigated. The construction of a matched product of models is proposed, which allows us to prove the interpolation property in a number of known extensions of the minimal logic. It is shown that, unlike superintuitionistic, positive, and negative logics, a sum of $\mathrm J$-logics with the interpolation property CIP may fail to possess CIP, nor even the restricted interpolation property.