The international independent ranking organisation AD Scientific Index is more than an ordinary "Ranking". The "AD Scientific Index" analyses the academic work of scientists using the H-index, i10 index and number of citations, and provides results that can be used to evaluate the productivity and efficiency of individuals and institutions. In addition to ranking according to "total H-index" for individuals and institutions, you can also see the ranking and analyses according to "last 6 years H-index", "total i10 Productivity index", "last 6 years i10 Productivity index", "total citations" and "last 6 years citations" only in "AD Scientific Index". See also: Subject Rankings, University Subject Rankings and Universities Rankings 2024 (Sort by: Last 6 years H Index). Click here for individual or institutional registration.
AD Scientific Index - World Scientists Rankings - 2024 | H INDEX | i10 INDEX | CITATION | |||||||||||||
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
University / Institution |
Country | Region | World | Name | Country | University / Institution | Subject | Total | Last 6 year | Last 6 year/total | Total | Last 6 year | Last 6 year/total | Total | Last 6 year | Last 6 year/total |
6 | 147,575 | 166,486 | 523,153 |
|
United States | University of Houston Downtown |
Natural Sciences / Mathematical Sciences
Graph Theory | Combinatorics | Mathematics | |
18 | 14 | 0.778 | 25 | 14 | 0.560 | 996 | 591 | 0.593 |
57 | 353,161 | 394,927 | 1,509,129 |
|
United States | University of Houston Downtown |
Natural Sciences / Mathematical Sciences
Time series | statistical computing | geostatistics | online learning | |
3 | 3 | 1.000 | 3 | 0 | 0.000 | 50 | 18 | 0.360 |
61 | 371,827 | 415,998 | 1,622,983 |
|
United States | University of Houston Downtown |
Natural Sciences / Mathematical Sciences
Geometric Computing | Computational Sciences | Grid/Mesh Generation | Machine Learning | |
3 | 2 | 0.667 | 2 | 2 | 1.000 | 118 | 48 | 0.407 |
70 | 402,773 | 451,025 | 1,820,743 |
|
United States | University of Houston Downtown |
Natural Sciences / Mathematical Sciences
High order finite difference schemes for partial differential equations. Persistence and stability analysis in dynamical systems that arise from mathematical biology | ecologyand epidemiology. Machine learning | SVM algorithm | |
2 | 1 | 0.500 | 0 | 0 | 0 | 13 | 4 | 0.308 |