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Francesco Polizzi
Francesco Polizzi
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$X/\mathbf{C}$ affine of dimension $n$ has the homotopy Homotopy type of $n$-dimensional CWa complex? affine variety

Let $X/\mathbf{C}$$X$ be an affine variety of dimension $n$. Does $X(\mathbf{C})$ have the homotopy type of an over $n$-dimensional CW complex?$\mathbb{C}$.

Does the analytic space associated with $X$ have the homotopy type of a $n$-dimensional CW complex?

$X/\mathbf{C}$ affine of dimension $n$ has the homotopy type of $n$-dimensional CW complex?

Let $X/\mathbf{C}$ be an affine variety of dimension $n$. Does $X(\mathbf{C})$ have the homotopy type of an $n$-dimensional CW complex?

Homotopy type of a complex affine variety

Let $X$ be an affine variety of dimension $n$ over $\mathbb{C}$.

Does the analytic space associated with $X$ have the homotopy type of a $n$-dimensional CW complex?

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user19475
user19475

$X/\mathbf{C}$ affine of dimension $n$ has the homotopy type of $n$-dimensional CW complex?

Let $X/\mathbf{C}$ be an affine variety of dimension $n$. Does $X(\mathbf{C})$ have the homotopy type of an $n$-dimensional CW complex?