D-rule
(→Linear Disambiguation Rules) |
(→Non-Linear Disambiguation Rules) |
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=== Non-Linear Disambiguation Rules === | === Non-Linear Disambiguation Rules === | ||
Non-linear disambiguation rules apply over the syntactic or the network structure to constrain the application of List-to-Tree (LT), Tree-to-Tree (TT), Tree-to-Network (TN) and Network-to-Network (NN) Transformation Rules. They have the following format: | Non-linear disambiguation rules apply over the syntactic or the network structure to constrain the application of List-to-Tree (LT), Tree-to-Tree (TT), Tree-to-Network (TN) and Network-to-Network (NN) Transformation Rules. They have the following format: | ||
− | + | REL1(arg1;arg2;...)REL2(arg3;arg4;...)...RELN(argx;argy;...)=P; | |
− | Where | + | Where REL1, REL2 and REL2 are syntactic or semantic relations, with their corresponding arguments (arg1, arg2, ...), and P is an integer (from 0 to 255). |
==== Examples ==== | ==== Examples ==== | ||
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!DISAMBIGUATION RULES | !DISAMBIGUATION RULES | ||
!OUTPUT | !OUTPUT | ||
+ | |- | ||
+ | |(A,B,C)(D,E,F) | ||
+ | |(A)(D)=X(A;D); (higher priority)<br />(A)(E)=X(E;A); (lower priority) | ||
+ | |X(F;A)=255; | ||
+ | |X(D,E,F;A,B,C) | ||
|- | |- | ||
|SYN(A,B,C;D,E,F) | |SYN(A,B,C;D,E,F) | ||
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|agt(A;F)=0; | |agt(A;F)=0; | ||
|aoj(A,B,C;D,E,F) | |aoj(A,B,C;D,E,F) | ||
− | |||
− | |||
− | |||
− | |||
− | |||
|- | |- | ||
|agt(A,B,C;D,E,F) | |agt(A,B,C;D,E,F) | ||
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|Y(A,B,C;D,E,F) | |Y(A,B,C;D,E,F) | ||
|} | |} | ||
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== Formal Syntax of Disambiguation Rules == | == Formal Syntax of Disambiguation Rules == |
Revision as of 20:00, 19 August 2013
D-rules or disambiguation rules are used to prevent wrong lexical choices, to provoke best matches and to check the consistency of graphs, trees and lists. The set of D-rules form the Disambiguation grammar, or D-Grammar.
Contents |
Syntax
D-rules follow the general syntax:
STATEMENT=P;
Where
STATEMENT is the left side (condition) of a L-rule or a S-rule; and
P, which can range from 0 (impossible) to 255 (necessary), is the probability of occurrence of the STATEMENT
Scope of Disambiguation Rules
Disambiguation rules may apply:
- Only during tokenization, in order to control the dictionary retrieval
- Only during transformation, in order to control the application of T-rules
- During tokenization and transformation
Types of Disambiguation Rules
There are two types of disambiguation rules:
- Linear disambiguation rules, when the rule applies over lists of nodes
- Non-linear disambiguation rules, when the rule applies over non-linear relations between nodes
Linear Disambiguation Rules
Linear disambiguation rules apply over the natural language list structure to constrain word selection (dictionary retrieval) or the application of both Tree-to-List (TL) and List-to-List (LL) Transformation Rules. They have the following format:
(node 1)(node 2)(...)(node n)=P;
Where (node 1), (node 2) and (node n) are nodes, and P is an integer (from 0 to 255).
Examples
- (ART)(VER)=0;
- An article (ART) may not precede a verb (VER).
- (ART)(NOU)=255;
- Articles (ART) always precede nouns (NOU).
Use
INPUT | TRANSFORMATION RULES | DISAMBIGUATION RULES | OUTPUT |
---|---|---|---|
X(A,B,C;D,E,F) | X(A;D)=(A)(D); (higher priority) X(A;F)=(F)(A); (lower priority) |
(B)(E)=0; | (D,E,F)(A,B,C) |
INPUT | DICTIONARY | DISAMBIGUATION RULES | OUTPUT |
---|---|---|---|
the book | [book] "22222" (POS=VER); (higher priority) [book] "11111" (POS=NOU); (lower priority) |
(ART)(BLK)(VER)=0; | [book] "1111" (POS=NOU); |
Non-Linear Disambiguation Rules
Non-linear disambiguation rules apply over the syntactic or the network structure to constrain the application of List-to-Tree (LT), Tree-to-Tree (TT), Tree-to-Network (TN) and Network-to-Network (NN) Transformation Rules. They have the following format:
REL1(arg1;arg2;...)REL2(arg3;arg4;...)...RELN(argx;argy;...)=P;
Where REL1, REL2 and REL2 are syntactic or semantic relations, with their corresponding arguments (arg1, arg2, ...), and P is an integer (from 0 to 255).
Examples
- VS(VER;ADJ)=0;
- An adjective (ADJ) may not be an specifier (VS) of a verb (VER).
- NS(NOU;DET)=255;
- Determiners (DET) are always specifiers (NS) of nouns (NOU).
- agt(VER;ADJ)=0;
- An adjective (ADJ) may not be an agent (agt) of a verb (VER).
- agt(VER;NOU)=255;
- Agents (agt) of verbs (VER) are always nouns (NOU).
Use
INPUT | TRANSFORMATION RULES | DISAMBIGUATION RULES | OUTPUT |
---|---|---|---|
(A,B,C)(D,E,F) | (A)(D)=X(A;D); (higher priority) (A)(E)=X(E;A); (lower priority) |
X(F;A)=255; | X(D,E,F;A,B,C) |
SYN(A,B,C;D,E,F) | SYN(A;D)=agt(;); (higher priority) SYN(A;E)=aoj(;); (lower priority) |
agt(A;F)=0; | aoj(A,B,C;D,E,F) |
agt(A,B,C;D,E,F) | agt(A;D)=X(A;D); (higher priority) agt(A;E)=Y(A;E); (lower priority) |
X(B;F)=0; | Y(A,B,C;D,E,F) |
Formal Syntax of Disambiguation Rules
Disambiguation rules must comply with the following syntax
<DISAMBIGUATION RULE> ::= <NN RULE> | <TT RULE> | <LL RULE> <NN RULE> ::= (<SEM>)+ "=" [0-255]";" <TT RULE> ::= (<SYN>)+ "=" [0-255]";" <LL RULE> ::= "(" <NODE> ")" ( "(" <NODE> ")" )+ "=" [0-255]";" <SEM> ::= <TEXT> "(" <NODE> ";" <NODE> ")" <SYN> ::= <TEXT> "(" <NODE> ";" <NODE> ")" <NODE> ::= ( (<DESCRIPTION>)( "," <DESCRIPTION> )* )? <DESCRIPTION> ::= <STRING> | <ENTRY> | <FEATURE> | <RELATION> <STRING> ::= """<text>""" <ENTRY> ::= "["<entry>"]" <FEATURE> ::= <VALUE> | <ATTRIBUTE> | <ATTRIBUTE>"="<VALUE> <RELATION> ::= <SEM>|<SYN> <VALUE> ::= <TEXT> <ATTRIBUTE> ::= <TEXT> <TEXT> ::= any sequence of characters except whitespace | <REGULAR EXPRESSION> <REGULAR EXPRESSION> ::= "/"<PERL COMPATIBLE REGULAR EXPRESSIONS>"/"
Examples
- List structures
- (ART)(BLK)(VER)=0; (an article (ART) may not precede a verb (VER))
- (ART)(BLK)(NOU)=255; (articles (ART) always precede nouns (NOU))
- Syntactic and semantic structures
- agt(VER;ADJ)=0; (an adjective (ADJ) may not be an agent (agt) of a verb (VER))
- agt(VER;NOU)=255; (agents (agt) of verbs (VER) are always nouns (NOU))
- VS(VER;ADJ)=0; (an adjective (ADJ) may not be an specifier (VS) of a verb (VER))
- NS(NOU;DET)=255; (determiners (DET) are always specifiers (NS) of nouns (NOU))