# Sequoidal Categories and Transfinite Games: A Coalgebraic Approach to   Stateful Objects in Game Semantics

**Authors:** William John Gowers, James Laird

arXiv: 1706.00035 · 2017-06-02

## TL;DR

This paper explores coalgebraic models of stateful objects in game semantics using sequoidal categories and transfinite games, establishing conditions for final coalgebras to form cofree commutative comonoids.

## Contribution

It introduces conditions under which final coalgebras in sequoidal categories serve as models for exponential structures in linear logic, including transfinite game scenarios.

## Key findings

- Final coalgebras can model stateful objects in game semantics.
- The cofree commutative comonoid structure depends on specific isomorphisms.
- Transfinite plays affect the coalgebraic structure and its properties.

## Abstract

The non-commutative sequoid operator $\oslash$ on games was introduced to capture algebraically the presence of state in history-sensitive strategies in game semantics, by imposing a causality relation on the tensor product of games. Coalgebras for the functor $A \oslash \_$ - i.e. morphisms from $S$ to $A \oslash S$ - may be viewed as state transformers: if $A \oslash \_$ has a final coalgebra, $!A$, then the anamorphism of such a state transformer encapsulates its explicit state, so that it is shared only between successive invocations.   We study the conditions under which a final coalgebra $!A$ for $A \oslash \_$ is the carrier of a cofree commutative comonoid on $A$. That is, it is a model of the exponential of linear logic in which we can construct imperative objects such as reference cells coalgebraically, in a game semantics setting. We show that if the tensor decomposes into the sequoid, the final coalgebra $!A$ may be endowed with the structure of the cofree commutative comonoid if there is a natural isomorphism from $!(A \times B)$ to $!A \otimes !B$. This condition is always satisfied if $!A$ is the bifree algebra for $A \oslash \_$, but in general it is necessary to impose it, as we establish by giving an example of a sequoidally decomposable category of games in which plays will be allowed to have transfinite length. In this category, the final coalgebra for the functor $A \oslash \_$ is not the cofree commutative comonoid over A: we illustrate this by explicitly contrasting the final sequence for the functor $A \oslash \_$ with the chain of symmetric tensor powers used in the construction of the cofree commutative comonoid as a limit by Melli\'es, Tabareau and Tasson.

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## References

28 references — full list in the complete paper: https://tomesphere.com/paper/1706.00035/full.md

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Source: https://tomesphere.com/paper/1706.00035