Scott-closed - A set S, a subset of D, is Scott-closed if(1) If Y is a subset of S and Y is directed then lub Y is in S and (2) If y <= s in S then y is in S. I.e. a Scott-closed set contains the lubs of its directed subsets and anything less than any element. (2) says that S is downward closed (or left closed). ("<=" is written in LaTeX as \sqsubseteq). |

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Scotoma

scotomatous

Scotomy

scotopic vision

Scotoscope

Scots

Scots English

Scots Gaelic

Scots heather

Scots pine

Scotsman

Scotswoman

Scott

Scott domain

Scott Joplin

Scott's Spleenwort

**-- Scott-closed --**

Scottering

Scotticism

Scotticize

Scottie

Scottish

Scottish deerhound

Scottish Gaelic

Scottish Highlander

Scottish Lallans

scottish maple

Scottish reel

Scottish terrier

Scoundrel

Scoundreldom

Scoundrelism

scoundrelly

scotomatous

Scotomy

scotopic vision

Scotoscope

Scots

Scots English

Scots Gaelic

Scots heather

Scots pine

Scotsman

Scotswoman

Scott

Scott domain

Scott Joplin

Scott's Spleenwort

Scottering

Scotticism

Scotticize

Scottie

Scottish

Scottish deerhound

Scottish Gaelic

Scottish Highlander

Scottish Lallans

scottish maple

Scottish reel

Scottish terrier

Scoundrel

Scoundreldom

Scoundrelism

scoundrelly