On embedding of F-hedgehogs in function spaces

Standard

On embedding of F-hedgehogs in function spaces. / Osipov, Alexander.
In: Publications de l'Institut Mathematique, Vol. 114, No. 128, 2023, p. 9-17.

Research output: Contribution to journal › Article › peer-review

Harvard

Osipov, A 2023, 'On embedding of F-hedgehogs in function spaces', Publications de l'Institut Mathematique, vol. 114, no. 128, pp. 9-17. https://doi.org/10.2298/PIM2328009O

APA

Osipov, A. (2023). On embedding of F-hedgehogs in function spaces. Publications de l'Institut Mathematique, 114(128), 9-17. https://doi.org/10.2298/PIM2328009O

Vancouver

Osipov A. On embedding of F-hedgehogs in function spaces. Publications de l'Institut Mathematique. 2023;114(128):9-17. doi: 10.2298/PIM2328009O

Author

Osipov, Alexander. / On embedding of F-hedgehogs in function spaces. In: Publications de l'Institut Mathematique. 2023 ; Vol. 114, No. 128. pp. 9-17.

BibTeX

@article{61649f4754624a8681e295d3a3e512ef,

title = "On embedding of F-hedgehogs in function spaces",

abstract = "For a filter F, S-F = {infinity} boolean OR {(n, m) : n, m is an element of N} be the F-hedgehog (F-fan) of spininess omega where each (n, m) is isolated in S-F and a basic open neighborhood of infinity is of the form N (phi) = {infinity} boolean OR {(n, m) : n is an element of N, m is an element of phi(n)} for function phi : N -> F. We study some connections among the F*-Menger property and an embedding of F-hedgehog S-F into function spaces for any P -filter F.",

author = "Alexander Osipov",

year = "2023",

doi = "10.2298/PIM2328009O",

language = "English",

volume = "114",

pages = "9--17",

journal = "Publications de l'Institut Mathematique",

issn = "0350-1302",

publisher = "Mathematical Institute of the Serbian Academy of Sciences and Arts",

number = "128",

}

RIS

TY - JOUR

T1 - On embedding of F-hedgehogs in function spaces

AU - Osipov, Alexander

PY - 2023

Y1 - 2023

N2 - For a filter F, S-F = {infinity} boolean OR {(n, m) : n, m is an element of N} be the F-hedgehog (F-fan) of spininess omega where each (n, m) is isolated in S-F and a basic open neighborhood of infinity is of the form N (phi) = {infinity} boolean OR {(n, m) : n is an element of N, m is an element of phi(n)} for function phi : N -> F. We study some connections among the F*-Menger property and an embedding of F-hedgehog S-F into function spaces for any P -filter F.

AB - For a filter F, S-F = {infinity} boolean OR {(n, m) : n, m is an element of N} be the F-hedgehog (F-fan) of spininess omega where each (n, m) is isolated in S-F and a basic open neighborhood of infinity is of the form N (phi) = {infinity} boolean OR {(n, m) : n is an element of N, m is an element of phi(n)} for function phi : N -> F. We study some connections among the F*-Menger property and an embedding of F-hedgehog S-F into function spaces for any P -filter F.

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U2 - 10.2298/PIM2328009O

DO - 10.2298/PIM2328009O

M3 - Article

VL - 114

SP - 9

EP - 17

JO - Publications de l'Institut Mathematique

JF - Publications de l'Institut Mathematique

SN - 0350-1302

IS - 128

ER -

ID: 52346732