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Theorems of Krasnosel’skii type, especially Cwikel’s result for general Banach spaces, concerning the properties of compact operators acting between Banach spaces under interpolation, are investigated in the multi-dimensional case. The objects of study are \((n+1)\)-tuples \(\overline{A}=(A_0,A_1,\dots,A_n)\) of Banach spaces \(A_i\) which are continuously embedded in a Hausdorff space \(\mathcal{U},\) and, for two such \((n+1)\)-tuples \(\overline{A},\overline{B}\), maps \(T:\overline{A}\rightarrow\overline{B},\) whose restrictions to the \(A_i\) are continuous homomorphisms into \(B_i\), the \(i\)-th member of \(\overline{B}\). Analogues of Peetre’s \(K\)- and \(J\)-functionals are defined, and the \(K\) and \(J\) real interpolation methods of Sparr, Fernandez and of Cobos-Peetre [cf. F. Cobos and J. Peetre, Proc. Lond. Math. Soc. 63, 371–400 (1991; Zbl 0702.46047)] are presented in this multi-dimensional setting. These methods are then used, in turn, to examine the validity of Cwikel’s theorem. The behaviour of the measure of non-compactness of the map \(T\) under real interpolation is also investigated by Sparr’s methods.