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arxiv: 0704.3523 · v1 · submitted 2007-04-26 · 🧮 math.AG

Immersions of spheres and algebraically constructible functions

classification 🧮 math.AG
keywords algebraicallyconstructiblemappingalgebraicdefinedeveneveryfunction
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Let L be an algebraic set and let g : R^(n+1) \times L --> R^(2n) (n is even) be a polynomial mapping such that for each l in L there is r(l)>0 such that the mapping g_l = g(.,l) restricted to the sphere S^n(r) is an immersion for every 0<r<(l), so that the intersection number I(g_l|S^n(r)) is defined. Then the function which maps l in L to I(g_l|S^n(r)) is algebraically constructible.

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