The dual tree of a fold map germ from  to

Pérez, Juan Antonio Moya; Nuño–Ballesteros, J. J.

doi:10.1017/prm.2022.27

Proceedings of the Royal Society of Edinburgh: Section A Mathem

2022

DOI: 10.1017/prm.2022.27

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The dual tree of a fold map germ from to

Juan Antonio Moya Pérez¹,

J. J. Nuño–Ballesteros²

Abstract: Let $f\colon (\mathbb {R}^{3},0)\to (\mathbb {R}^{4},0)$ be an analytic map germ with isolated instability. Its link is a stable map which is obtained by taking the intersection of the image of $f$ with a small enough sphere $S^{3}_\epsilon$ centred at the origin in $\mathbb {R}^{4}$ . If $f$ is of fold type, we define a tree, that we call dual tree, that contains all the t… Show more

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Topology of Fold Map Germs from $$\mathbb R^3$$ to $$\mathbb R^5$$

Moya-Pérez,

Nuño-Ballesteros

2023

Mediterr. J. Math.

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Let $$f:(\mathbb R^3,0)\rightarrow (\mathbb R^5,0)$$ f : ( R 3 , 0 ) → ( R 5 , 0 ) be an analytic map germ with isolated instability. Its link is a stable map which is obtained by taking the intersection of the image of f with a small enough sphere $$S^4_\epsilon $$ S ϵ 4 centered at the origin in $$\mathbb R^5$$ R 5 . If f is of fold type, we define a labeled tree associated to its link and prove that is a complete topological invariant for it. As an application we obtain the complete topological classification of map germs contained in the $$\mathcal {A}^2$$ A 2 -class $$(x,y,z^2,xz,0)$$ ( x , y , z 2 , x z , 0 ) .

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Topology of Fold Map Germs from $$\mathbb R^3$$ to $$\mathbb R^5$$

Moya-Pérez,

Nuño-Ballesteros

2023

Mediterr. J. Math.

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show abstract

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The dual tree of a fold map germ from to

Cited by 1 publication

References 19 publications

Topology of Fold Map Germs from $$\mathbb R^3$$ to $$\mathbb R^5$$

Topology of Fold Map Germs from $$\mathbb R^3$$ to $$\mathbb R^5$$

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