Practical Grammar 8: Difference between revisions
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Now, imagine you have the following constraining equation: | Now, imagine you have the following constraining equation: | ||
(↑ TENSE) =<sub>c</sub> pres | (↑ TENSE) =<sub>c</sub> pres | ||
* it marks the f-structure [] as ill-formed, since it does not contain the information TENSE pres, i.e. the constraining equations is a test on an f-structure. | * it marks the f-structure [] as ill-formed, since it does not contain the information TENSE pres, i.e. the constraining equations is a test on an f-structure. | ||
| Line 37: | Line 37: | ||
'''Constraining equations''' are used when one item depends on some other item's adding a particular piece of information to an f-structure. | '''Constraining equations''' are used when one item depends on some other item's adding a particular piece of information to an f-structure. | ||
=== The Syntax of Constraining equations in xlfg === | |||
Since xlfg does not use subscripts, it uses "==" as constraining equations. | |||
Illustration: | |||
(↑ TENSE) =<sub>c</sub> pres becomes (↑ TENSE) == pres; in xlfg. | |||
== Complement Clauses == | == Complement Clauses == | ||
Revision as of 08:58, 1 December 2020
The Difference between Defining Equations and Constraining Equations
There are several types of equations that can be used in annotations. So far, we have encountered the following two:
(1) ↑=↓1;
(2) (↑ OBJ) =↓2;
These equations are both defining equations.
Defining equations add their information to an f-structure.
There is a second kind of equation, which we have not seen yet, but which you will need for the following exercise. These are called constraininig equations.
Constraininig equations test whether their information is contained in an f-structure. They do NOT add the information themselves.
Illustration:
Case 1:
Imagine you have the following defining equation:
(↑ TENSE) = pres;
- it turns the f-structure [] into the f-structure [TENSE pres], i.e. it adds its information to the f-structure.
- it turns the f-structure [TENSE pres] into the f-structure [TENSE pres], i.e. it adds its information to the f-structure. If the information was already there, the f-structure remains the same.
Case 2:
Now, imagine you have the following constraining equation:
(↑ TENSE) =c pres
- it marks the f-structure [] as ill-formed, since it does not contain the information TENSE pres, i.e. the constraining equations is a test on an f-structure.
- it marks the f-structure [] as well-formed, but does not change it.
When to use a constraining equation:
Constraining equations are used when one item depends on some other item's adding a particular piece of information to an f-structure.
The Syntax of Constraining equations in xlfg
Since xlfg does not use subscripts, it uses "==" as constraining equations.
Illustration:
(↑ TENSE) =c pres becomes (↑ TENSE) == pres; in xlfg.