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Ali Taghavi
Ali Taghavi
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A spectral characterization of path connected spacespaces

Let $X$ be a compact Haussdorf topological space with the following property:

For every continuous function $f:X\to \mathbb{C}$ the image $f(X)$ is a payhconnectedpath connected subset of $\mathbb{C}$.

Is such a space $X$ necessarilly a path connected space?

This question is inspired by (and realated to) thisthe following post:

Unital $C^{*}$ algebras whose all elements have path connected spectrum

A spectral characterization of path connected space

Let $X$ be a compact Haussdorf topological space with the following property:

For every continuous function $f:X\to \mathbb{C}$ the image $f(X)$ is a payhconnected subset of $\mathbb{C}$.

Is such a space $X$ necessarilly a path connected space?

This question is inspired by (and realated to) this post:

Unital $C^{*}$ algebras whose all elements have path connected spectrum

A spectral characterization of path connected spaces

Let $X$ be a compact Haussdorf topological space with the following property:

For every continuous function $f:X\to \mathbb{C}$ the image $f(X)$ is a path connected subset of $\mathbb{C}$.

Is such a space $X$ necessarilly a path connected space?

This question is inspired by (and realated to) the following post:

Unital $C^{*}$ algebras whose all elements have path connected spectrum

Source Link
Ali Taghavi
Ali Taghavi
  • 356
  • 8
  • 31
  • 123

A spectral characterization of path connected space

Let $X$ be a compact Haussdorf topological space with the following property:

For every continuous function $f:X\to \mathbb{C}$ the image $f(X)$ is a payhconnected subset of $\mathbb{C}$.

Is such a space $X$ necessarilly a path connected space?

This question is inspired by (and realated to) this post:

Unital $C^{*}$ algebras whose all elements have path connected spectrum