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PDF) \(\mathcal{I}\)-convergence and \(\tau^{*}\)-closedness of \(\mathcal{I}\)-compact sets | Nitakshi Goyal - Academia.edu
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functional analysis - Topology of uniform convergence on compact sets for $E^{\ast}$ - Mathematics Stack Exchange
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Gabriel Peyré on X: "The space of compact sets in a metric space is a compact set for the Hausdorff metric. Hausdorff convergence is weak and does not preserve topology, dimension, length
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real analysis - A trouble about the topology of pointwise convergence $({\mathbb{R}}^M,\tau)$ - Mathematics Stack Exchange
![SOLVED: Show that the set B(R; R) of bounded functions f : R â†' R is closed in RR in the uniform topology; but not in the topology of compact convergence. SOLVED: Show that the set B(R; R) of bounded functions f : R â†' R is closed in RR in the uniform topology; but not in the topology of compact convergence.](https://cdn.numerade.com/ask_images/5f2d47396bbc48bcbaa1e9814ccced27.jpg)