Jacobian-squared function-germs
Abstract
In this paper, it is shown that, for any equidimensional C∞ map-germ f: (Rn,0) (Rn,0), the map-germ F: (Rn, 0) Rn×R defined by F(x)=(f(x), μ1(x)|Jf|2(x), ·s, μ(x)|Jf|2(x)) is always a frontal; where μi is a C∞ function-germ and |Jf| is the Jacobian-determinant of f. Moreover, it is also shown that when the multiplicity of f is less than or equal to 3, any frontal constructed from f must be A-equivalent to a frontal F of the above form.
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