Homotopy Type Theory net > history (Rev #1, changes)

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Definition

A net is a function a:IAa: I \to A from a directed type II to a type AA. II is called the index type, the terms of II are called indices (singular index), and AA is called the indexed type.

Examples

  • Every sequence a:Aa: \mathbb{N} \to A is a net.

See also

Revision on March 11, 2022 at 05:15:54 by Anonymous?. See the history of this page for a list of all contributions to it.