User:MWinter4/van Kampen obstruction

This is not a Wikipedia article: It is an individual user's work-in-progress page, and may be incomplete and/or unreliable. The current/final version of this article may be located at 4-flat graph now or in the future.

Find sources: Google (books · news · scholar · free images · WP refs) · FENS · JSTOR · TWL
Easy tools: Citation bot (help) | Advanced: Fix bare URLs
This page was last edited by MWinter4 (talk | contribs) 19 days ago. (Update timer)

In topology the van Kampen obstruction is a computationally checkable obstruction to the embeddability of a 2-dimensional CW complex into 4-dimensional Euclidean space.

Fundamental idea

Given a 2-dimensional CW complex $X$ . The van Kampen obstruction is based on a series of observations

Any two embeddings of $X$ can be transformed into each other by so-called finger moves. A finger move moves an edge "across" a 2-cell.
Let ${\mathcal {C}}$ be the set of pairs $(c_{1},c_{2})$ , where $c_{1},c_{2}\subseteq X$ are disjoint 2-cells.
The intersection vector $v(\phi )\in {\mathbb {Z}}_{2}^{\mathcal {C}}$ of a mapping $\phi :X\to {\mathbb {R}}^{4}$ records whether the two 2-cells in a pair intersect (and we can assume that all such intersections are transversal). The intersection vector of an embedding is zero.
For any edge $e\subseteq X$ and 2-cell $c\subseteq X$ , applying a finger move that pulls $e$ across $c$ changes the intersection vector in a way that only depends on $e$ and $c$ , but not their embeddings. More precisely, $v(\phi ')=v(\phi )+\Delta _{e,c}$ .

Suppose we are given a mapping $\phi$ . If there also exists an embedding $\psi$ , then there exists a sequence of finger moves transforming $\phi$ into $\psi$ . This means that $v(\phi )$ can be written as a linear combination of $\Delta _{e,c}$ .

User:MWinter4/van Kampen obstruction

Contents

Fundamental idea

Formulation using deleted products

Formulation using homology

Generalizations

References

External links