An approximate inverse system approach to shape fibrations

Miyata, Takahisa

doi:10.3336/gm.44.1.14

Glasnik matematički, Vol. 44 No. 1, 2009.

Izvorni znanstveni članak

https://doi.org/10.3336/gm.44.1.14

An approximate inverse system approach to shape fibrations

Takahisa Miyata ; Department of Mathematics and Informatics, Graduate School of Human Development and Environment, Kobe University, Kobe, Japan

Puni tekst: engleski pdf 313 Kb

str. 215-240

preuzimanja: 380

citiraj

APA 6th Edition

Miyata, T. (2009). An approximate inverse system approach to shape fibrations. Glasnik matematički, 44 (1), 215-240. https://doi.org/10.3336/gm.44.1.14

MLA 8th Edition

Miyata, Takahisa. "An approximate inverse system approach to shape fibrations." Glasnik matematički, vol. 44, br. 1, 2009, str. 215-240. https://doi.org/10.3336/gm.44.1.14. Citirano 25.04.2024.

Chicago 17th Edition

Miyata, Takahisa. "An approximate inverse system approach to shape fibrations." Glasnik matematički 44, br. 1 (2009): 215-240. https://doi.org/10.3336/gm.44.1.14

Harvard

Miyata, T. (2009). 'An approximate inverse system approach to shape fibrations', Glasnik matematički, 44(1), str. 215-240. https://doi.org/10.3336/gm.44.1.14

Vancouver

Miyata T. An approximate inverse system approach to shape fibrations. Glasnik matematički [Internet]. 2009 [pristupljeno 25.04.2024.];44(1):215-240. https://doi.org/10.3336/gm.44.1.14

IEEE

T. Miyata, "An approximate inverse system approach to shape fibrations", Glasnik matematički, vol.44, br. 1, str. 215-240, 2009. [Online]. https://doi.org/10.3336/gm.44.1.14

Sažetak

The notion of shape fibration between compact metric spaces was introduced by S. Mardesic and T. B. Rushing. Mardesic extended the notion to arbitrary topological spaces. A shape fibration f : X → Y between topological spaces is defined by using the notion of resolution (p, q, f) of the map f, where p : X → X and q : Y → Y are polyhedral resolutions of X and Y, respectively, and the approximate homotopy lifting property for the system map f : X → Y. Although any map f : X → Y between topological spaces admits a resolution (p, q, f), if polyhedral resolutions p : X → X and q : Y → Y are chosen in advance, there may not exist a system map f : X → Y so that (p,q,f) is a resolution of f. To overcome this deficiency, T. Watanabe introduced the notion of approximate resolution. An approximate resolution of a map f : X → Y consists of approximate polyhedral resolutions p : X → X and q : Y → Y of X and Y, respectively, and an approximate map f : X → Y. In this paper we obtain the approximate homotopy lifting property for approximate maps and investigate its properties. Moreover, it is shown that the approximate homotopy lifting property is extended to the approximate pro-category and the approximate shape category in the sense of Watanabe. It is also shown that the approximate pro-category together with fibrations defined as morphisms having the approximate homotopy lifting property with respect to arbitrary spaces and weak equivalences defined as morphisms inducing isomorphisms in the pro-homotopy category satisfies the composition axiom for a fibration category in the sense of H. J. Baues. As an application it is shown that shape fibrations can be defined in terms of our approximate homotopy lifting property for approximate maps and that every homeomorphism is a shape fibration.

Ključne riječi

Approximate inverse system; shape fibration; approximate shape; fibration category

Hrčak ID:

36955

URI

https://hrcak.srce.hr/36955

Datum izdavanja:

21.5.2009.

Posjeta: 828 *

Prijava i registracija

Glasnik matematički, Vol. 44 No. 1, 2009.

Sažetak

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