Minimal domain
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Notion in checking theory. The minimal domain of X is the smallest subset K of the domain(X) S, such that for any element A of S, some element B of K reflexively dominates A.
Example
In (i), the minimal domain of X is {UP, ZP, WP, YP, H}. The minimal domain of H is {UP, ZP, WP, YP}.
(i) XP1
/\
/ \
UP XP2
/\
/ \
ZP1 X'
/\ /\
/ \ / \
WP ZP2 X1 YP
/\
/ \
H X2
Links
Utrecht Lexicon of Linguistics
References
- Chomsky, N. 1993. A Minimalist Program for Linguistic Theory, MIT occasional papers in linguistics, 1-67. Reprinted in: Chomsky (1995).
