语言意义的统一表示

Pub Date : 2023-01-01 DOI:10.1515/opli-2022-0225
P. Mondal
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引用次数: 0

摘要

摘要自然语言意义具有认知表征和形式/数学结构两种性质。但目前尚不清楚它们之间的实际联系。本文的中心目的是表明,就语义结构的基本性质而言,自然语言意义的认知表征和形式/数学结构的性质虽然明显不同,但可以统一。因此,本文将制定语义结构的统一表示形式。有了这个目标,本文一方面考虑了标准的形式语义表征,另一方面也考虑了话语表征理论(DRT)表征,以及不同版本的概念/认知语义学中的语义表征(Jackendoff、Langacker和Talmy的概念/感知语义学方法)和心理空间表征(Fauconier的方法)另一方面。选择这些方法的理由是,在这些方法下,语义结构的表示都是统一的。必须强调的是,表明在这些方法下语义结构的表示可以统一,并不简单地等于将这些理论/方法统一起来。相反,它是为了证明认知表征和形式/数学结构可以被证明是可互译的,至少在一些语言意义的解释中是这样。
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Towards a unified representation of linguistic meaning
Abstract Natural language meaning has properties of both cognitive representations and formal/mathematical structures. But it is not clear how they actually relate to one another. The central aim of this article is to show that properties of cognitive representations and formal/mathematical structures of natural language meaning, albeit apparently divergent, can be united, as far as the basic properties of semantic structures are concerned. Thus, this article will formulate the form of unified representations for semantic structures. With this goal, this article takes into account standard formal-semantic representations and also Discourse Representation Theory (DRT) representations on the one hand and semantic representations in different versions of Conceptual/Cognitive Semantics (Jackendoff’s, Langacker’s and Talmy’s approaches to Conceptual/Cognitive Semantics) and representations of Mental Spaces (Fauconnier’s approach) on the other hand. The rationale behind the selection of these approaches is that the representations of semantic structures under these approaches are all amenable to unification. It must be emphasized that showing that the representations of semantic structures under these approaches can be unified does not simply amount to unifying these theories/approaches in toto. Rather, it is to demonstrate that cognitive representations and formal/mathematical structures can be shown to be inter-translatable for at least some accounts of linguistic meaning.
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