Productivity Rankings is a unique service offered only by “AD Scientific Index”. This is a ranking system derived from the i10 index in order to show the productivity of the scientist in publishing scientific articles of value. Productivity Rankings is an instrument that lists productive scientists in a given area, discipline, university, and country and can guide the development of meaningful incentives and academic policies. The world rankings, regional rankings, and university rankings of scientists in this table are developed based on the total i10 index. Additionally, click to view the special rankings based on Productivity Rankings: last 6 years' i10 index", Universities Rankings 2024 (Sort by : Total i10 Index), Universities Rankings 2024 (Sort by : Last 6 Years i10 Index) "Art and Humanities Rankings" and "Social Sciences and Humanities Rankings".
* Total i10 IndexRankings
Ranking Based On Selection :1
Operator Theory
Analysis
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
4
1
0.250
* Total i10 IndexRankings
Ranking Based On Selection :2
Department of Mathematics
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
3
2
0.667
* Total i10 IndexRankings
Ranking Based On Selection :3
Geometry
Quantitative Methods
Time series analysis
Decision Making
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
1
1
1.000
* Total i10 IndexRankings
Ranking Based On Selection :4
Geometric Function Theory
Univalent Functions
Special Functions
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
1
0
0.000
Mahir Hasansoy
Beykent University
İstanbul, Türkiye
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
4
1
0.250
Dilek Demirkuş
Beykent University
İstanbul, Türkiye
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
3
2
0.667
Hülya Başeğmez
Beykent University
İstanbul, Türkiye
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
1
1
1.000
Geometry
Quantitative Methods
Time series analysis
Decision Making
Tuğba Yavuz
Beykent University
İstanbul, Türkiye
i-10 Metrics
Total
Last 6 Years
Last 6 Years / Total
1
0
0.000
Geometric Function Theory
Univalent Functions
Special Functions