Atalan, Ferihe

Profile Picture
Profile URL
https://hdl.handle.net/20.500.14411/6711
Name Variants
Ozan, Ferihe Atalan
Ferihe Atalan
Atalan,F.
Atalan,Ferihe
Ferihe, Atalan
A., Ferihe
A.,Ferihe
Atalan, Ferihe
F.,Atalan
Atalan F.
F., Atalan
Job Title
Profesör Doktor
Email Address
ferihe.atalan@atilim.edu.tr
Main Affiliation
Mathematics
Status
Website
ORCID ID
0000-0001-6547-0570
Scopus Author ID
50123456789
Turkish CoHE Profile ID
Google Scholar ID
WoS Researcher ID

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Scholarly Output

18

Articles

14

Views / Downloads

68/421

Supervised MSc Theses

4

Supervised PhD Theses

0

WoS Citation Count

31

Scopus Citation Count

30

WoS h-index

4

Scopus h-index

4

Patents

0

Projects

1

WoS Citations per Publication

1.72

Scopus Citations per Publication

1.67

Open Access Source

8

Supervised Theses

4

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JournalCount
Turkish Journal of Mathematics3
Rocky Mountain Journal of Mathematics2
Glasgow Mathematical Journal1
Groups, Geometry, and Dynamics1
International Journal of Algebra and Computation1
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Author: Medetogullari, Elif

Scholarly Output Search Results

Now showing 1 - 2 of 2
  • Thumbnail Image
    Article
    Liftable Homeomorphisms of Cyclic and Rank Two Finite Abelian Branched Covers Over the Real Projective Plane
    (Elsevier, 2021) Atalan, Ferihe; Medetogullari, Elif; Ozan, Yildiray
    In this note, we investigate the property for regular branched finite abelian covers of the real projective plane, where each homeomorphism of the base (preserving the branch locus) lifts to a homeomorphism of the covering surface. (C) 2020 Elsevier B.V. All rights reserved.
  • Thumbnail Image
    Article
    Citation - WoS: 3
    Citation - Scopus: 3
    Liftable Homeomorphisms of Rank Two Finite Abelian Branched Covers
    (Springer Basel Ag, 2021) Atalan, Ferihe; Atalan, Ferihe; Medetogullari, Elif; Ozan, Yildiray; Medetoğulları, Elif; Atalan, Ferihe; Medetoğulları, Elif; Mathematics; Mathematics
    We investigate branched regular finite abelian A-covers of the 2-sphere, where every homeomorphism of the base (preserving the branch locus) lifts to a homeomorphism of the covering surface. In this study, we prove that if A is a finite abelian p-group of rank k and Sigma -> S-2 is a regular A-covering branched over n points such that every homeomorphism f:S-2 -> S-2 lifts to Sigma, then n = k + 1. We will also give a partial classification of such covers for rank two finite p-groups. In particular, we prove that for a regular branched A-covering pi : Sigma -> S-2, where A = ZprxZpt, 1 <= r <= t , all homeomorphisms f:S-2 -> S-2 lift to those of Sigma if and only if t = r or t = r + 1 and p = 3.