NAGOYA MATHEMATICAL JOURNAL
Skrót:
NAGOYA MATH J
ISSN:
0027-7630
| Rok | Punkty ministerialne | Impact Factor | Eigenfactor | Article influence |
|---|---|---|---|---|
| 2025 | 100 | |||
| 2024 | 100 | 0.00116 | 0.794 | |
| 2023 | 100 | 0.00154 | 0.999 | |
| 2022 | 100 | 0.00123 | 0.838 | |
| 2021 | 100 | 0.00138 | 1.07 | |
| 2020 | 100 | 0.0013 | 1.017 | |
| 2019 | 100 | 0.00126 | 0.792 | |
| 2018 | 30 | 0.00165 | 1.073 | |
| 2017 | 30 | 0.00175 | 1.08 | |
| 2016 | 25 | 0.00164 | 0.967 | |
| 2015 | 30 | 0.00155 | 0.875 | |
| 2014 | 25 | 0.00218 | 1.143 | |
| 2013 | 20 | 0.00284 | 1.345 | |
| 2012 | 20 | 0.00188 | 0.803 | |
| 2011 | 32 | 0.00155 | 0.627 | |
| 2010 | 32 | 0.0016 | 0.601 | |
| 2009 | 24 | 0.00297 | 1.018 | |
| 2008 | 15 | 0.00234 | 0.728 | |
| 2007 | 0 | 0.00271 | 0.771 |
Publikacje:
4.
Sławomir Rams, Matthias Schuett
Miyaoka’s bound for conics on K3 surfaces and beyond, Nagoya Mathematical Journal vol. 261 (2026), 12
3.
Sławomir Rams, Matthias Schuett
AT MOST 64 LINES ON SMOOTH QUARTIC SURFACES (CHARACTERISTIC 2), Nagoya Mathematical Journal vol. 232 (2018), 76-95
2.
The Ohsawa-Takegoshi extension theorem on some unbounded sets, Nagoya Mathematical Journal vol. 188 (2007), 19-30
1.
Peter Pflug, Włodzimierz Zwonek
Bergman completeness of unbounded Hartogs domains, Nagoya Mathematical Journal vol. 180 (2005), 121-133