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It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), from http://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-nhttps://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), from http://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), from https://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

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Lewis Zhang
Lewis Zhang
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The relation between Hausdorff dimension of aan $n$-manifold and $n$

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Lewis Zhang
Lewis Zhang
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It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), infrom http://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), in http://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

It is known that for a topological space with different metrics, the Hausdorff dimensions may not be equal in general.

For the case of manifolds, suppose $M$ is a $n$-manifold with a metric(distance), from http://math.stackexchange.com/questions/931628/hausdorf-dimension-of-a-manifold-of-dimension-n, we know that $dim_H M$ and $n$ may not be the same. But whether we can get a relation between $\dim_H M$ and $n$? I mean, whether we can prove that $\dim_H M\leq n$ or $\dim_H M\geq n$?

Unfortunately, I have no idea how we can get it directly from the definition of Hausdorff dimension.

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Lewis Zhang
Lewis Zhang
  • 285
  • 1
  • 7