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Published on November 27, 2007

Author: Breezy

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Game Theory and Grice’ Theory of Implicatures :  Game Theory and Grice’ Theory of Implicatures Anton Benz Anton Benz: Game Theory and Grice’ Theory of Implicatures:  Anton Benz: Game Theory and Grice’ Theory of Implicatures Grice’ approach to pragmatics Assumptions about communication The Cooperative Principle and the Maxims Scalar Implicatures The `standard explanation’ A game theoretic reconstruction Where can game theory improve pragmatic theory? A problem for the standard theory: predictive power An example of contradicting inferences The game theoretic approach at work Implicatures of answers A simple picture of communication:  A simple picture of communication The speaker encodes some proposition p He sends it to an addressee The addressee decodes it again and writes p in his knowledgebase. Problem: We communicate often much more than we literally say! Some students failed the exam. +> Most of the students passed the exam. Gricean Pragmatics:  Gricean Pragmatics Grice distinguishes between: What is said. What is implicated. “Some of the boys came to the party.” said: At least two of the boys came to the party. implicated: Not all of the boys came to the party. Both part of what is communicated. Assumptions about Conversation:  Assumptions about Conversation Conversation is a cooperative effort. Each participant recognises in their talk exchanges a common purpose. Example: A stands in front of his obviously immobilised car. A: I am out of petrol. B: There is a garage around the corner. Joint purpose of B’s response: Solve A’s problem of finding petrol for his car. The Cooperative Principle:  The Cooperative Principle Conversation is governed by a set of principles which spell out how rational agents behave in order to make language use efficient. The most important is the so-called cooperative principle: “Make your conversational contribution such as is required, at the stage at which it occurs, by the accepted purpose or direction of the talk exchange in which you are engaged.” The Conversational Maxims:  The Conversational Maxims Maxim of Quality: 1. Do not say what you believe to be false. 2. Do not say that for which you lack adequate evidence. Maxim of Quantity: 1. Make your contribution to the conversation as informative as is required for he current talk exchange. 2. Do not make your contribution to the conversation more informative than necessary. Maxim of Relevance: make your contributions relevant. Maxim of Manner: be perspicuous, and specifically: 1. Avoid obscurity. 2. Avoid ambiguity. 3. Be brief (avoid unnecessary wordiness). 4. Be orderly. The Conversational Maxims:  The Conversational Maxims Maxim of Quality: Be truthful. Maxim of Quantity: Say as much as you can. Say no more than you must. Maxim of Relevance: Be relevant. The Conversational Maxims:  The Conversational Maxims Be truthful (Quality) and say as much as you can (Quantity) as long as it is relevant (Relevance). An example: Scalar Implicatures:  An example: Scalar Implicatures Let A(x)  “x of the boys came to the party” It holds A(all)  A(some). The speaker said A(some). If all of the boys came, then A(all) would have been preferred (Maxim of Quantity). The speaker didn’t say A(all), hence it cannot be the case that all came. Therefore some but not all came to the party. Game Theory:  Game Theory In a very general sense we can say that we play a game together with other people whenever we have to decide between several actions such that the decision depends on: the choice of actions by others our preferences over the ultimate results. Whether or not an utterance is successful depends on how it is taken up by its addressee the overall purpose of the current conversation. The Game Theoretic Version (For a scale with three elements: <all, most, some>):  The Game Theoretic Version (For a scale with three elements: <all, most, some>) “all” “some” “most” “most” “some” “some” 100% 50% > 50% <     50% > 50% > 0; 0 1; 1 0; 0 0; 0 1; 1 1; 1 The Game Theoretic Version (Taking into account the speaker’s preferences):  The Game Theoretic Version (Taking into account the speaker’s preferences) 100% 50% > 50% < “all” “some” “most”   50% > 1; 1 1; 1 1; 1 In all branches that contain “some” the initial situation is “50% < ” Hence: “some” implicates “50% < ” General Schema for explaining implicatures :  General Schema for explaining implicatures Start out with a game defined by pure semantics. Pragmatic principles define restrictions on this game. Semantics + Pragmatic Principles explain an implicature of an utterance if the implicated proposition is true in all branches of the restricted game in which the utterance occurs. An example of contradicting inferences I:  An example of contradicting inferences I Situation: A stands in front of his obviously immobilised car. A: I am out of petrol. B: There is a garage around the corner. (G) Implicated: The garage is open. (H) How should one formally account for the implicature? Set H*:= The negation of H B said that G but not that H*. H* is relevant and G  H*  G. Hence if G  H*, then B should have said G  H* (Quantity). Hence H* cannot be true, and therefore H. An example of contradicting inferences II:  An example of contradicting inferences II Problem: We can exchange H and H* and still get a valid inference: B said that G but not that H. H is relevant and G  H  G. Hence if G  H, then B should have said G  H (Quantity). Hence H cannot be true, and therefore H*. Missing: Precise definitions of basic concepts like relevance. The Utility of Answers:  The Utility of Answers Questions and answers are often subordinated to a decision problem of the inquirer. Example: Somewhere in Amsterdam I: Where can I buy an Italian newspaper? E: At the station and at the palace. Decision problem of A: Where should I go to in order to buy an Italian newspaper. The general situation:  The general situation Decision Making:  Decision Making The Model: Ω: a (countable) set of possible states of the world. PI, PE: (discrete) probability measures representing the inquirer’s and the answering expert’s knowledge about the world. A : a set of actions. UI, UE: Payoff functions that represent the inquirer’s and expert’s preferences over final outcomes of the game. Decision criterion: an agent chooses an action which maximises his expected utility: EU(a) = vΩ P(w)  U(v,a) An Example:  An Example John loves to dance to Salsa music and he loves to dance to Hip Hop but he can't stand it if a club mixes both styles. It is common knowledge that E knows always which kind of music plays at which place. J: I want to dance tonight. Where can I go to? E: Oh, tonight they play Hip Hop at the Roter Salon. implicated: No Salsa at the Roter Salon. A game tree for the situation where both Salsa and Hip Hop are playing:  A game tree for the situation where both Salsa and Hip Hop are playing both play at RS “Salsa” 1 go-to RS stay home 0 1 go-to RS stay home 0 1 go-to RS stay home 0 “both” “Hip Hop” RS = Roter Salon The tree after the first step of backward induction:  The tree after the first step of backward induction both Salsa Hip Hop “both” “Salsa” “Hip Hop” “Salsa” “Hip Hop” stay home go-to RS go-to RS go-to RS go-to RS 1 0 0 2 2 The tree after the second step of backward induction:  The tree after the second step of backward induction both Salsa Hip Hop “both” “Salsa” “Hip Hop” stay home go-to RS go-to RS 1 2 2 In all branches that contain “Salsa” the initial situation is such that only Salsa is playing at the Roter Salon. Hence: “Salsa” implicates that only Salsa is playing at Roter Salon General method for calculating implicatures (informal):  General method for calculating implicatures (informal) Describe the utterance situation by a game (in extensive form, i.e. tree form). The game tree shows: Possible states of the world Utterances the speaker can choose Their interpretations as defined by semantics. Preferences over outcomes (given by context) Simplify tree by backward induction. ‘Read off’ the implicature from the game tree that cannot be simplified anymore. Another Example:  Another Example J approaches the information desk at the city railway station. J: I need a hotel. Where can I book one? E: There is a tourist office in front of the building. (E: *There is a hairdresser in front of the building.) implicated: It is possible to book hotels at the tourist office. The situation where it is possible to book a hotel at the tourist information, a place 2, and a place 3.:  The situation where it is possible to book a hotel at the tourist information, a place 2, and a place 3. “place 2” 1 0 1 s. a. go-to tourist office 0 1/2 0 “tourist office” “place 3” go-to pl. 2 go-to pl. 3 s. a. s. a. s. a. : search anywhere The game after the first step of backward induction:  The game after the first step of backward induction booking possible at tour. off. 1 0 1/2 -1 1 1/2 booking not possible “place 2” “tourist office” “place 3” “place 2” “tourist office” “place 3” go-to t. o. go-to pl. 2 go-to pl. 3 go-to t. o. go-to pl. 2 go-to pl. 3 The game after the second step of backward induction:  The game after the second step of backward induction booking possible at tour. off. 1 1 booking not possible “tourist office” “place 2” go-to t. o. go-to pl. 2 Conclusions:  Conclusions Advantages of using Game Theory: provides an established framework for studying cooperative agents; basic concepts of linguistic pragmatics can be defined precisely; extra-linguistic context can easily be represented; allows fine-grained predictions depending on context parameters. Scalar implicatures: The standard explanation:  Scalar implicatures: The standard explanation The ‘Standard Explanation’ for a scale with two elements: It holds p1  p2 but not p2  p1. There are two expression e1, e2 of comparable complexity. e1 means p1 and e2 means p2. The speaker said e2. If p1 is the case, then the use of e1 is preferred (by 1. and Quantity). The speaker didn’t say e1, hence p1 is not the case. Therefore p2 ¬ p1 is the case. A Schema for Inferring Implicatures:  A Schema for Inferring Implicatures S has said that p; it is mutual knowledge that S and H play a certain (signalling) game G; in order for S to say that p and be indeed playing G, it must be the case that q; (hence) it is mutual knowledge that q must be the case if S utters p; S has done nothing to stop H, the addressee, thinking that they play G; therefore in saying that p S has implicated that q.

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