Affix
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== Affixes and Roots == | == Affixes and Roots == | ||
| − | In the UNL<sup>arium</sup> framework, affixes are differentiated from roots in the sense that | + | In the UNL<sup>arium</sup> framework, affixes are differentiated from roots in the sense that affixes are considered to be semantically bound and, therefore, are represented by attributes, whereas roots are considered to be semantically free and, therefore, are represented by UW's. Consider, for instance, the examples below: |
*un- is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a prefix (to be represented by the attribute @not): undo = do.@not | *un- is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a prefix (to be represented by the attribute @not): undo = do.@not | ||
*-s is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a suffix (to be represented by the attribute @pl): tables = table.@pl | *-s is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a suffix (to be represented by the attribute @pl): tables = table.@pl | ||
*geo- is considered to be semantically free from the root (i.e., it has an autonomous meaning = earth) and, therefore, a root (to be represented by a UW): geophysics = geo + physics (and not physics.@geo) | *geo- is considered to be semantically free from the root (i.e., it has an autonomous meaning = earth) and, therefore, a root (to be represented by a UW): geophysics = geo + physics (and not physics.@geo) | ||
*-phobia is considered to be semantically free from the root (i.e., it has an autonomous meaning = fear) and, therefore, a root (to be reprsented by a UW): googlephobia = google + phobia (and not google.@phobia) | *-phobia is considered to be semantically free from the root (i.e., it has an autonomous meaning = fear) and, therefore, a root (to be reprsented by a UW): googlephobia = google + phobia (and not google.@phobia) | ||
Revision as of 20:58, 12 August 2013
An affix is a morpheme that is attached to a word stem to form a new word.
Types
Affixes may be derivational or inflectional.
- Inflectional affixes assign grammatical properties (such as number, gender, tense, person) to the stem in order to form the different word forms of the same lexeme ("-s" in "tables", "-ed" in "loved")
- Derivational affixes form a new lexeme by modifying the meaning (and sometimes the category) of the root ("un-" in "unhappy", "-ness" in "happiness").
Position
Affixes are divided depending on their position with reference to the stem
- prefix (PFX) - Appears at the front of the stem (such as "un-" in "undo", or "re-" in "rewrite")
- suffix (SFX) - Appears at the back of the stem (such "-s" in "tables", or "-er" in "writer")
- infix (IFX) - Appears within the stem (very rare in English, such as "-ma-" in "sophistimacated")
- circumfix (CCX) - Appears at the front and at the back of the stem (very rare in English, such as "a-" + "-ed" in "ascattered")
Affixes and Roots
In the UNLarium framework, affixes are differentiated from roots in the sense that affixes are considered to be semantically bound and, therefore, are represented by attributes, whereas roots are considered to be semantically free and, therefore, are represented by UW's. Consider, for instance, the examples below:
- un- is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a prefix (to be represented by the attribute @not): undo = do.@not
- -s is considered to be semantically bound to the root (i.e., it is only a modifier of the root) and, therefore, a suffix (to be represented by the attribute @pl): tables = table.@pl
- geo- is considered to be semantically free from the root (i.e., it has an autonomous meaning = earth) and, therefore, a root (to be represented by a UW): geophysics = geo + physics (and not physics.@geo)
- -phobia is considered to be semantically free from the root (i.e., it has an autonomous meaning = fear) and, therefore, a root (to be reprsented by a UW): googlephobia = google + phobia (and not google.@phobia)
