Logic and Logical Philosophy
Published by Nicolaus Copernicus University (Journal Finder)
ISSN : 1425-3305 eISSN : 2300-9802
Abbreviation : Log. Log. Philos.
Aims & Scope
Logic and Logical Philosophy is a journal chiefly devoted to philosophical logic and philosophy resulting from the application of logical tools to philosophical problems.
Other logical topics and applications of logic to related disciplines are not excluded.
The editors' aim is to publish well-written papers presenting new and important research results in the above-mentioned disciplines.
View Aims & ScopeMetrics & Ranking
Impact Factor
| Year | Value |
|---|---|
| 2025 | 0.4 |
| 2024 | 0.60 |
SJR (SCImago Journal Rank)
| Year | Value |
|---|---|
| 2024 | 0.557 |
Quartile
| Year | Value |
|---|---|
| 2024 | Q1 |
h-index
| Year | Value |
|---|---|
| 2024 | 15 |
Journal Rank
| Year | Value |
|---|---|
| 2024 | 10448 |
Journal Citation Indicator
| Year | Value |
|---|---|
| 2024 | 53 |
Impact Factor Trend
Abstracting & Indexing
Journal is indexed in leading academic databases, ensuring global visibility and accessibility of our peer-reviewed research.
Subjects & Keywords
Journal’s research areas, covering key disciplines and specialized sub-topics in Arts and Humanities, designed to support cutting-edge academic discovery.
Licensing & Copyright
This journal operates under an Open Access model. Articles are freely accessible to the public immediately upon publication. The content is licensed under a Creative Commons Attribution 4.0 International License (CC BY 4.0), allowing users to share and adapt the work with proper attribution.
Copyright remains with the author(s), and no permission is required for non-commercial use, provided the original source is cited.
Most Cited Articles
The Most Cited Articles section features the journal's most impactful research, based on citation counts. These articles have been referenced frequently by other researchers, indicating their significant contribution to their respective fields.
-
On the discussive conjunction in the propositional calculus for inconsistent deductive systems
Citation: 33
Authors: Stanisław
-
Logic of classical refutability and class of extensions of minimal logic
Citation: 19
Authors: Sergei P.
