范畴代数中的基础博弈语义

Jérémie Koenig
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引用次数: 1

摘要

我提出了代数效果和游戏语义之间的正式联系,这是编程语言语义中应用于组合软件验证的两条重要工作线。具体来说,列举计算可能产生的副作用的代数签名可以理解为一个博弈,而这个博弈的策略构成了完全偏序(cpos)类别中签名的自由代数。因此,策略提供了一个具有无法解释的副作用的方便的计算模型。特别地,游戏语义的操作风格以初始代数和cpo内函子的终端余代数之间的巧合的形式延续到代数环境中。相反,代数观点揭示了博弈语义下的策略结构。策略模型可以被重新表述为部分策略树的理想补全(在项代数上自由的dpos)。将框架扩展到多排序签名将使这种结构可用于大型游戏。
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Grounding Game Semantics in Categorical Algebra
I present a formal connection between algebraic effects and game semantics, two important lines of work in programming languages semantics with applications in compositional software verification. Specifically, the algebraic signature enumerating the possible side-effects of a computation can be read as a game, and strategies for this game constitute the free algebra for the signature in a category of complete partial orders (cpos). Hence, strategies provide a convenient model of computations with uninterpreted side-effects. In particular, the operational flavor of game semantics carries over to the algebraic context, in the form of the coincidence between the initial algebras and the terminal coalgebras of cpo endofunctors. Conversely, the algebraic point of view sheds new light on the strategy constructions underlying game semantics. Strategy models can be reformulated as ideal completions of partial strategy trees (free dcpos on the term algebra). Extending the framework to multi-sorted signatures would make this construction available for a large class of games.
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