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Let fβ: (R^n, 0β) (R^2, 0β) and fβ: (R^m, 0β) (R^2, 0β) be real analytic map germs of independent variables, where n, m 2. Then the pair (fβ, fβ) of fβ and fβ defines a real analytic map germ from (R^n+m, 0β+β) to (R^4, 0β). We assume that fβ and fβ satisfy the aβ -condition at 0β. Let g be a strongly non-degenerate mixed polynomial of 2 complex variables which is locally tame along vanishing coordinate subspaces. A mixed polynomial g defines a real analytic map germ from (C^2, 0β) to (C, 0β). If we identify C with R^2, then g also defines a real analytic map germ from (R^4, 0β) to (R^2, 0β). Then the real analytic map germ f: (R^n R^m, 0β+β) (R^2, 0β) is defined by the composition of g and (fβ, fβ), i. e. , f (x, y) = (g (fβ, fβ) ) (x, y) = g (fβ (x), fβ (y) ), where (x, y) is a point in a neighborhood of 0β+β. In this paper, we first show the existence of the Milnor fibration of f. We next show a generalized join theorem for real analytic singularities. By this theorem, the homotopy type of the Milnor fiber of f is determined by those of fβ, fβ and g. For complex singularities, this theorem was proved by A. NΓ©methi. As an application, we show that the zeta function of the monodromy of f is also determined by those of fβ, fβ and g.
Kazumasa Inaba (Fri,) studied this question.
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