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Natural Language Understanding

Natural Language Understanding Understanding NL (infinite language) means determining the meaning of the sentence with respect to contest in which it is used. It requires an analysis of the sentence on several different levels: Syntactic Semantic Pragmatic Discourse

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Natural Language Understanding

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  1. Natural Language Understanding • Understanding NL (infinite language) means determining the meaning of the sentence with respect to contest in which it is used. • It requires an analysis of the sentence on several different levels: • Syntactic • Semantic • Pragmatic • Discourse • Syntactic: Syntax (grammar) of the sentence is checked. Syntax is a tool for describing the structure of sentences in the language. • Semantics: denotes the ‘literal’ meaning we ascribe to a sentence.

  2. Pragmatics: refers to intended meaning of a sentence. How sentences are used in a different contexts and how context affects the interpretation of the sentence. • Discourse: refers to conversation between two or more individuals. • Basic parsing Techniques • Context free grammars • S  NP, VP • VP  verb, NP • NP  det, NP • NP  det, noun, NP • NP  det, adj*, NP • One can have top-down or bottom-up parsers.

  3. Simple Transition Networks • More convenient for visualizing the grammar (CFG) • It consists of nodes and labeled arcs. • Network for NP. • Arcs are labeled by word category. • Starting at a given node, we can traverse an arc if the current word in the sentence is in the category on the arc.

  4. This network recognizes the same set of sentences as the following CFG. • NP  det, NP1 • NP1  adj, NP1 • NP1  noun • Simple Transition Network formalism is not powerful enough to describe all languages that can be described by CFG. • Recursive grammar can’t be defined by Transition Network. • Recursive Transition Networks (RTN) • To get the descriptive power of CFG, you need a notion of recursion in the network grammar. • In RTN which is like a simple Transition Network except that it allows arc labels that refer to other networks rather than word categories.

  5. The network for simple English sentences can be expressed as • Uppercase labels refers to networks. • The arc from S to S1 can be followed only if the NP network can be successfully traversed to a pop arc. • RTN might allow to have an arc labeled with its own name. • Any language generated by CFG can be generated by RTN and vice verse. Thus they are equivalent in their generative capacity.

  6. Implementation of RTN in Prolog • Vocabulary for RTN can be stored as a set of facts as: • word_type (“ an“, det ). • word_type (“ the“, det ). • word_type (“man“, noun ). • word_type (“apple “,noun ). • word_type (“ eats“, verb ). • The top level clause for RTN is called run and is as follows: • run :- set_state(s0), writeln(“Enter your sentence), readln(Sent), analyze(Sent), • writeln(“Your sentence is syntactically correct”), clear_state. • run :- writeln(“Your sentence is wrong s yntactically”), clear_state.

  7. set_state(S) :- assert(current_state(S)). /* Initialize current state to s0 */ analyze (S) :- S = “.”, final_state(_). analyze (S) :- get_state(NS), !, transition(NS, S, S1), analyze (S1). get_state(S) :- current_state(S). /* transition states are listed as */ transition (s0, A, B) :- check_np(np, A, B), set_state(s1). transition(s1, A, B) :- get_token(A, W, B), word_type(W, verb), set_state(s2).

  8. transition (s2, A, B) :- check_np(np, A, B), set_state(s3). transition (np, A, B) :- get_token(A, W, B), word_type(W, det), set_state(np1). transition (np1, A, B) :- get_token(A, W, B), word_type(W, noun), set_state(np2). transition (np1, A, B) :- get_token(A, W, B), word_type(W, adj), set_state(np1). check_np(np2, A, B) :- A = B, !. check_np(St, A, B) :- transition(St, A, C), get_state(Ns), check_np(Ns, C, B), !.

  9. final_state(s3) :- current_state(s3). /* get a token from the sentence */ get_token(A, W, B) :- ? clear_state :- retract(current_state(_)), fail. clear_state. Query: ?- run the man eats an apple. Yes. ?- run man eat apple. Yes. (This is actually wrong but we have not taken care of number agreement into account)

  10. These formalisms are limited in the following ways. • They could only accept or reject a sentence rather than producing a analysis of the structure of the sentence. • Augmenting RTN formalism which involves both generalizing the network notation and introducing more information about words in the structure, collecting information and testing features while paring becomes augmented transition network (ATN). • Similar kind of augmentation & extension can be made to CFG called Definite Clause Grammar. • Recording sentence Structure while parsing in ATN. • Collect the structure of legal sentence in order to further analyze them.

  11. For instance we can identify one particular noun phase as the syntactic subject (SUBJ) of a sentence and another as the syntactic object of the verb (OBJ) • Within noun phrase we might identify the det structure, adjective, the head noun and so on. • Thus the sentence “Jack found a bag” might be represented by the structure • (S ( SUBJ (NP NAME jack) • MAIN-V found • TENSE PAST • OBJ (NP DET a • HEAD bag • ) • ) • Such a structure is created using RTN parser by allowing each network to have a set of registers.

  12. Registers are local to each network. Thus each time a new network is pushed and new set of empty registers are created. • When the network is popped, the registers disappear. • Registers can be set to the values and these can be retrieved from registers. • NP network has registers names such as, DET, ADJS, HEAD and NUM. • Registers are set by actions that can be specified on the arc. • When an arc is followed, the actions associated with it are executed. • The most common act involves setting the register to a certain value. • When a pop arc is followed, all the registers set in the current network are automatically collected to form a structure consisting of the network followed by a list of the registers with their values.

  13. When a category arc, such as name or verb etc. is followed, the word in the input is put into a special variable named as *. • Thus the plausible action on the arc from S1 to S2 would be to set NAME register to the current word. • It is written as • NAME  *

  14. The push arcs such as NP must be treated differently. • Typically many words will be used by the network called using push arc. • The network used in push would have set of registers that capture the structure of the constituent that was parsed. • The structure built by the pushed network is returned in the value *. • NP • S S1 • Thus the action on the arc from S to S1 might be SUBJ  *

  15. Therefore, a RTN with registers and tests with actions on those registers, is an Augmented Transition network (ATN).

  16. Arc Test Actions • NP/1 none DET  * • NUM  NUM* • NP/2 none NAME  * • NUM  NUM* • NP1/1 NUM  NUM*  {then action is taken HEAD  * • otherwise it fails } NUM  NUM  NUM* • NP1/2 none ADJS Append (ADJS, *) • S/1 none SUBJ  * • S1/1 NUMSUBJ NUM*  {then action is taken MAIN_V  * otherwise it fails } NUM  NUM SUBJNUM* • S2/1 none OBJJ  *

  17. Notations: • NUM* - is the NUM register of the structure in * • NUMSUBJ - is the NUB register of the structure in SUBJ • The values of the registers are often viewed as sets and the intersection () and union () of sets are allowed to combine the values of different registers. • For the registers that may take a list of values, an append function is permitted. • Append (ADJS,*) returns the list that is the list in the register ADJS with the value of * appended on the end. • The sentence, with the word positions indicated, is as follows: • 1 The 2 dogs 3 love 4 john 5.

  18. A simple Lexicon: Word Representation dogs (NOUN ROOT dog NUM {3p} ) dog (NOUN ROOT dog NUM {3s} ) the (DET ROOT the NUM (3s, 3p} ) Love (VERB ROOT love NUM {3p} ) John (NAME ROOT john )

  19. Trace of S Network Step Node Position Arc followed Registers 1 S 1 S / 1 - 2 NP 1 NP / 1 [ DET  the, NUM  {3s, 3p}] 3 NP1 2 NP / 1 {check {3s, 3p }  {3p} } [HEAD  dogs, NUM  {3p}] 4 NP2 3 NP2 / 1 return structure {NP { DET  the HEAD  dogs NUM  {3p} } } 5 - 3 S / 1 succeeds SUBJ  {NP { DET  the HEAD  dogs NUM  {3p} } } S1 3 S1 / 1 {check {3p }  {3p} } [MAIN_V  love, NUM  {3p}]

  20. 6 S2 4 S2 / 1 OBJ  * 7 NP 4 NP / 2 { NAME  john NUM  {3p} } 8 NP2 5 NP2 / 1 return structure OBJ  {NP { NAME  john NUM  {3p} } } 9 S3 5 S3 / 1 return succeeds {S {SUBJ  {NP { DET  the HEAD  dogs, NUM  {3p} } MAIN_V  love, NUM  {3p}] OBJ  {NP { NAME  john NUM  {3p} } } )

  21. Implementation of ATN in Prolog • Database clauses will be used to store and read the registers. • run :- set_state (s0) /* initialize state */, • write (“ATN analyses your sent”), nl, • write (“Please type in your sentence”), • readln (Sent), analyse (Sent), • write (“Your sent is syntactically correct), nl , clear_dbase. • run :- write(“ your sent is syntactically wrong”), clear_dbase. • clear_dbase :- retract(_), fail. • clear_dbase.

  22. analyse (S) :- S = “.”, final_state(_). analyse(S) :- current_state(N_state), !, transition(N_state, S, S1), !, analyse(S1). /* main transistions */ transition(s0, A, B) :- get_token(A, W, B), word_type(W, verb), asserta(type_reg (“QUEST”)), asserta(verb_reg(W)), set_state(s2). transition(s0, A, B) :- check_np(np, A, B), asserta(type_reg (“DECL”), build_phrase(np, STR), assert(subj_reg (STR)), set_state(s1).

  23. /* NP transition */ check_np(np2, C, B) :- B = C, !. check_np(np3, C, B) :- B = C, !. check_np(St, A, B) :- transition(St, A, C), get_state(N), check_np(N, C, B). /* Build Phrases */ build_phrase(np, STR) :- det_reg(DET), adj_reg(ADJ), noun_reg(NOUN), get_template(np, T), fill_template(T, AUX, T1), fill_template(T1, VERB, STR).

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