An invitation to game comonads

Samson Abramsky, Luca Reggio
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Abstract

Game comonads offer a categorical view of a number of model-comparison games central to model theory, such as pebble and Ehrenfeucht-Fra\"iss\'e games. Remarkably, the categories of coalgebras for these comonads capture preservation of several fragments of resource-bounded logics, such as (infinitary) first-order logic with n variables or bounded quantifier rank, and corresponding combinatorial parameters such as tree-width and tree-depth. In this way, game comonads provide a new bridge between categorical methods developed for semantics, and the combinatorial and algorithmic methods of resource-sensitive model theory. We give an overview of this framework and outline some of its applications, including the study of homomorphism counting results in finite model theory, and of equi-resource homomorphism preservation theorems in logic using the axiomatic setting of arboreal categories. Finally, we describe some homotopical ideas that arise naturally in the context of game comonads.
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值得注意的是,这些组合体的煤层范畴捕捉到了资源有界逻辑的几个片段的保留,如具有 n 个变量的(无穷)一阶逻辑或有界量词秩,以及相应的组合参数,如树宽和树深。这样,博弈组合体就在为语义学开发的分类方法与资源敏感模型理论的组合和算法方法之间架起了一座新的桥梁。我们概述了这一框架,并概述了它的一些应用,包括有限模型理论中同态计数结果的研究,以及利用树栖范畴的大同设置研究逻辑中的等资源同态保留定理。最后,我们描述了一些在博弈彗星背景下自然产生的同构思想。
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