Volume 9, 1997

University of Bialystok

Copyright (c) 1997 Association of Mizar Users

**Andrzej Trybulec**- Warsaw University, Bialystok

- In the article we continue the formalization in Mizar of [12, 98-105]. We work with structures of the form $$L = \langle C,\ \leq,\ \tau \rangle,$$ where $C$ is the carrier of the structure, $\leq$ - an ordering relation on $C$ and $\tau$ a family of subsets of $C$. When $\langle C,\ \leq \rangle$ is a complete lattice we say that $L$ is Scott, if $\tau$ is the Scott topology of $\langle C,\ \leq \rangle$. We define the Scott convergence (lim inf convergence). Following [12] we prove that in the case of a continuous lattice $\langle C,\ \leq \rangle$ the Scott convergence is topological, i.e. enjoys the properties: (CONSTANTS), (SUBNETS), (DIVERGENCE), (ITERATED LIMITS). We formalize the theorem, that if the Scott convergence has the (ITERATED LIMITS) property, the $\langle C,\ \leq \rangle$ is continuous.

This work was partially supported by the Office of Naval Research Grant N00014-95-1-1336.

- Preliminaries
- Scott Topology
- Scott Convergence

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