Abstract
Let \(\) be a germ of real analytic function (n≥ 1). We suppose that the complexified germ has an almost isolated singularity at 0 for an eigenvalue of the monodromy \(\). Denote by A a linear combination of the connected components of \(\). The purpose of this paper is to give a necessary and sufficient condition such that the distribution \(\) admits a sequence of poles in \(\).
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