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We present the topological foundation for solvability of Multiplicative Cousin problems formulated on an axially symmetric domain H. In particular, we provide a geometric construction of quaternionic Cartan coverings, which are generalizations of (complex) Cartan coverings as presented in Section 4 of FP. Because of the requirements of symmetry inherent to the domains of definition of quaternionic regular functions, the existence of quaternionic Cartan coverings of is not a consequence of existence of complex Cartan coverings, because for the latter there are no requirements for the symmetries with respect to the real axis. Due to the special role of the real axis, also the covering restricted to R has to have additional properties. All these required properties were achieved by starting from a particular symmetric tiling of the symmetric set (R + i R). Finally we provide an application of these results to prove the vanishing of 'antisymmetric' cohomology groups of planar symmetric domains for n 2.
Prezelj et al. (Tue,) studied this question.