Search
ISSN:
0373-3114
eISSN:
1618-1891
Disciplines
(Field of Science):
- mechanical engineering (Engineering and Technology)
- computer and information sciences (Natural sciences)
- mathematics (Natural sciences)
Ministry points: Help
| Year | Points | List |
|---|---|---|
| Year 2024 | 100 | Ministry scored journals list 2024 |
| Year | Points | List |
|---|---|---|
| 2024 | 100 | Ministry scored journals list 2024 |
| 2023 | 100 | Ministry Scored Journals List |
| 2022 | 100 | Ministry Scored Journals List 2019-2022 |
| 2021 | 100 | Ministry Scored Journals List 2019-2022 |
| 2020 | 100 | Ministry Scored Journals List 2019-2022 |
| 2019 | 100 | Ministry Scored Journals List 2019-2022 |
| 2018 | 35 | A |
| 2017 | 35 | A |
| 2016 | 30 | A |
| 2015 | 35 | A |
| 2014 | 30 | A |
| 2013 | 30 | A |
| 2012 | 30 | A |
| 2011 | 30 | A |
| 2010 | 27 | A |
Model:
Hybrid - transformation agreement
Points CiteScore:
| Year | Points |
|---|---|
| Year 2023 | 2.1 |
| Year | Points |
|---|---|
| 2023 | 2.1 |
| 2022 | 1.8 |
| 2021 | 1.8 |
| 2020 | 2 |
| 2019 | 2.4 |
| 2018 | 2.2 |
| 2017 | 1.9 |
| 2016 | 1.9 |
| 2015 | 1.7 |
| 2014 | 1.7 |
| 2013 | 1.6 |
| 2012 | 1.8 |
| 2011 | 1.7 |
Impact Factor:
Log in to see the Impact Factor.
Sherpa Romeo:
Papers published in journal
Filters
total: 1
Catalog Journals
Year 2024
-
Quasilinear elliptic problem in anisotropic Orlicz–Sobolev space on unbounded domain
PublicationWe study a quasilinear elliptic problem $-\text{div} (\nabla \Phi(\nabla u))+V(x)N'(u)=f(u)$ with anisotropic convex function $\Phi$ on the whole $\R^n$. To prove existence of a nontrivial weak solution we use the mountain pass theorem for a functional defined on anisotropic Orlicz-Sobolev space $\WLPhispace(\R^n)$. As the domain is unbounded we need to use Lions type lemma formulated for Young functions. Our assumptions broaden...
seen 197 times