STRONG TOPOLOGY ON THE SET OF PERSISTENCE DIAGRAMS

Zarichnyi, M.; Savchenko, A.; Kiosak, V.; Савченко, О. Г.

STRONG TOPOLOGY ON THE SET OF PERSISTENCE DIAGRAMS

Zarichnyi, M.; Savchenko, A.; Kiosak, V.; Савченко, О. Г.

URI: http://ekhsuir.kspu.edu/123456789/16382

Date: 2019

Abstract:

We endow the set of persistence diagrams with the strong topology (the topology of countable direct limit of increasing sequence of bounded subsets considered in the bottleneck distance). The topology of the obtained space is described. Also, we prove that the space of persistence diagrams with the bottleneck metric has inﬁnite asymptotic dimension in the sense of Gromov.

Description:

Savchenko, A. Strong topology on the set of persistence diagrams / V. Kiosak, A. Savchenko, M. Zarichnyi // American Institute of Physics Conference Proceedings. – 2019. – V. 2164. – Is. 1. – AIP Conference Proceedings 2164, 040006 (2019) – P. 040006-1 – 040006-4. doi.org/10.1063/1.5130798.

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Факультет комп'ютерних наук, фізики та математики
Кафедра алгебри, геометрії та математичного аналізу. Кафедра інформатики програмної інженерії та економічної кібернетики. Кафедра фізики та методики її навчання.

STRONG TOPOLOGY ON THE SET OF PERSISTENCE DIAGRAMS

STRONG TOPOLOGY ON THE SET OF PERSISTENCE DIAGRAMS

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