Bastien Laboureix scite author profile

Bastien Laboureix

2Publications

2Citation Statements Received

58Citation Statements Given

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Affiliations

Lorraine Research Laboratory in Computer Science and its Applications, Université de Lorraine

Publications

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Statures and Sobrification Ranks of Noetherian Spaces

Jean¹,

Laboureix²

2021

Preprint

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There is a rich theory of maximal order types of well-partial-orders (wpos), pioneered by de Jongh and Parikh (1977) and Schmidt (1981). Every wpo is Noetherian in its Alexandroff topology, and there are more; this prompts us to investigate an analogue of that theory in the wider context of Noetherian spaces.The notion of maximal order type does not seem to have a direct analogue in Noetherian spaces per se, but the equivalent notion of stature, investigated by Blass and Gurevich (2008) does: we define the stature ||X|| of a Noetherian space X as the ordinal rank of its poset of proper closed subsets. We obtain formulas for statures of sums, of products, of the space of words on a space X, of the space of finite multisets on X, in particular. They confirm previously known formulas on wpos, and extend them to Noetherian spaces.The proofs are, by necessity, rather different from their wpo counterparts, and rely on explicit characterizations of the sobrifications of the corresponding spaces, as obtained by Finkel and the first author (2020).We also give formulas for the statures of some natural Noetherian spaces that do not arise from wpos: spaces with the cofinite topology, Hoare powerspaces, powersets, and spaces of words on X with the socalled prefix topology.Finally, because our proofs require it, and also because of its independent interest, we give formulas for the ordinal ranks of the sobrifications of each of those spaces, which we call their dimension.

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Introduction to Discrete Soft Transforms

Laboureix

Andrès

Debled-Rennesson

2022

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