Relationships between Specified and Underspecified Quantification by the Theory of Acyclic Recursion

Relationships between Specified and Underspecified Quantification by the Theory of Acyclic Recursion

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The paper introduces a technique for representing quantifier relations Cordyceps that can have different scope order depending on context.The technique is demonstrated by classes of terms denoting relations, where each of the arguments of a relation term is bound by a different quantifier.We represent a formalization of linking quantifiers with the corresponding argument slots that they bind, across lambda-abstractions and reduction steps.The purpose of the technique is to represent underspecified order of Pot Holders quantification, in the absence of a context and corresponding information about the order.

Furthermore, it is used to represent subclasses of larger classes of relations depending on order of quantification or specific relations.