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I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-spacehttps://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the $Zariski$ topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the $Zariski$ topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

I asked the following question at < https://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the $Zariski$ topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

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arena
arena
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I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the Zariski$Zariski$ topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the Zariski topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the $Zariski$ topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.

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arena
arena
  • 111
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Is Max (R) a Hausdorff space?

I asked the following question at < http://math.stackexchange.com/questions/1508168/is-max-r-a-hausdorff-space >, but I pose it here for any help.

Recall a space is totally disconnected if the only connected subsets are singletons (one-point subsets). Now let $R $ be a commutative ring with identity such that $\operatorname{Max}(R)$ is a totally disconnected space, in the sense of the Zariski topology. I want to know if $\operatorname{Max}(R)$ Hausdorff in this case?

Thanks for any help.