Howard S. Cohl

769 total citations
44 papers, 373 citations indexed

About

Howard S. Cohl is a scholar working on Applied Mathematics, Statistical and Nonlinear Physics and Computational Theory and Mathematics. According to data from OpenAlex, Howard S. Cohl has authored 44 papers receiving a total of 373 indexed citations (citations by other indexed papers that have themselves been cited), including 21 papers in Applied Mathematics, 13 papers in Statistical and Nonlinear Physics and 12 papers in Computational Theory and Mathematics. Recurrent topics in Howard S. Cohl's work include Mathematical functions and polynomials (14 papers), Advanced Mathematical Identities (8 papers) and Scientific Research and Discoveries (8 papers). Howard S. Cohl is often cited by papers focused on Mathematical functions and polynomials (14 papers), Advanced Mathematical Identities (8 papers) and Scientific Research and Discoveries (8 papers). Howard S. Cohl collaborates with scholars based in United States, Germany and Spain. Howard S. Cohl's co-authors include Joel E. Tohline, A. Rau, Moritz Schubotz, A. L. Kiplinger, D. F. Neidig, H. M. Srivastava, Abdou Youssef, Volker Markl, E. G. Kalnins and John Cazes and has published in prestigious journals such as SHILAP Revista de lepidopterología, The Astrophysical Journal and Monthly Notices of the Royal Astronomical Society.

In The Last Decade

Howard S. Cohl

39 papers receiving 352 citations

Peers — A (Enhanced Table)

Peers by citation overlap · career bar shows stage (early→late) cites · hero ref

Name h Career Trend Papers Cites
Howard S. Cohl United States 9 131 102 72 60 51 44 373
Victor Kowalenko Australia 10 100 0.8× 104 1.0× 62 0.9× 44 0.7× 29 0.6× 37 321
Fedor Petrov Russia 12 133 1.0× 198 1.9× 104 1.4× 65 1.1× 31 0.6× 62 546
Bernard Jancewicz Poland 10 66 0.5× 113 1.1× 102 1.4× 19 0.3× 31 0.6× 28 317
W. W. Zachary United States 11 44 0.3× 197 1.9× 60 0.8× 27 0.5× 39 0.8× 49 395
Jianyuan Xiao China 13 116 0.9× 106 1.0× 55 0.8× 25 0.4× 177 3.5× 28 561
Luca Rizzi Italy 12 238 1.8× 328 3.2× 135 1.9× 23 0.4× 29 0.6× 31 539
Cesare Tronci United Kingdom 11 67 0.5× 88 0.9× 48 0.7× 12 0.2× 13 0.3× 41 413
Boris V. Alexeev Russia 8 23 0.2× 66 0.6× 92 1.3× 18 0.3× 22 0.4× 30 220
Warner A. Miller United States 16 370 2.8× 217 2.1× 58 0.8× 29 0.5× 56 1.1× 59 733
Jürgen Struckmeier Germany 12 169 1.3× 99 1.0× 24 0.3× 13 0.2× 51 1.0× 46 377

Countries citing papers authored by Howard S. Cohl

Since Specialization
Citations

This map shows the geographic impact of Howard S. Cohl's research. It shows the number of citations coming from papers published by authors working in each country. You can also color the map by specialization and compare the number of citations received by Howard S. Cohl with the expected number of citations based on a country's size and research output (numbers larger than one mean the country cites Howard S. Cohl more than expected).

Fields of papers citing papers by Howard S. Cohl

Since Specialization
Physical SciencesHealth SciencesLife SciencesSocial Sciences

This network shows the impact of papers produced by Howard S. Cohl. Nodes represent research fields, and links connect fields that are likely to share authors. Colored nodes show fields that tend to cite the papers produced by Howard S. Cohl. The network helps show where Howard S. Cohl may publish in the future.

Co-authorship network of co-authors of Howard S. Cohl

This figure shows the co-authorship network connecting the top 25 collaborators of Howard S. Cohl. A scholar is included among the top collaborators of Howard S. Cohl based on the total number of citations received by their joint publications. Widths of edges represent the number of papers authors have co-authored together. Node borders signify the number of papers an author published with Howard S. Cohl. Howard S. Cohl is excluded from the visualization to improve readability, since they are connected to all nodes in the network.

All Works

20 of 20 papers shown
1.
Cohl, Howard S., et al.. (2023). Multi-integral representations for Jacobi functions of the first and second kind. Arab Journal of Basic and Applied Sciences. 30(1). 583–592. 1 indexed citations
2.
Schubotz, Moritz, et al.. (2023). Discovery and recognition of formula concepts using machine learning. Scientometrics. 128(9). 4971–5025. 1 indexed citations
3.
Cohl, Howard S., et al.. (2022). Utility of integral representations for basic hypergeometric functions and orthogonal polynomials. The Ramanujan Journal. 61(2). 649–674.
4.
Cohl, Howard S., et al.. (2022). On the Relation Between Gegenbauer Polynomials and the Ferrers Function of the First Kind. Analysis Mathematica. 48(3). 695–716. 1 indexed citations
5.
Cohl, Howard S., Justin Park, & Hans Volkmer. (2021). Gauss Hypergeometric Representations of the Ferrers Function of the Second Kind. Symmetry Integrability and Geometry Methods and Applications. 2 indexed citations
6.
Cohl, Howard S., et al.. (2020). Terminating Basic Hypergeometric Representations and Transformations for the Askey–Wilson Polynomials. Symmetry. 12(8). 1290–1290. 1 indexed citations
7.
Schubotz, Moritz, et al.. (2019). Towards Formula Concept Discovery and Recognition. KOPS (University of Konstanz). 108–115. 4 indexed citations
8.
Schubotz, Moritz, et al.. (2018). Improving the representation and conversion of mathematical formulae by considering the textual context. KOPS (University of Konstanz). 39(3). 228–240. 1 indexed citations
9.
Cohl, Howard S., et al.. (2018). Some Generating Functions for q-Polynomials.. SHILAP Revista de lepidopterología. 10(12). 2 indexed citations
10.
Cohl, Howard S., et al.. (2018). Fundamental Solutions and Gegenbauer Expansions of Helmholtz Operators in Riemannian Spaces of Constant Curvature. Symmetry Integrability and Geometry Methods and Applications. 14. 4 indexed citations
11.
Cohl, Howard S., et al.. (2016). Convergence of Magnus integral addition theorems for confluent hypergeometric functions. Integral Transforms and Special Functions. 27(10). 767–774. 1 indexed citations
12.
Cohl, Howard S.. (2016). Report from the Open Problems Session at OPSFA13. Symmetry Integrability and Geometry Methods and Applications. 12. 2 indexed citations
13.
Cohl, Howard S., et al.. (2015). UWB signal processing: Projection, B-splines, and modified Gegenbauer bases. 4. 11–15. 4 indexed citations
14.
Schubotz, Moritz, et al.. (2014). Evaluation of Similarity-Measure Factors for Formulae Based on the NTCIR-11 Math Task. NTCIR. 7 indexed citations
15.
Cohl, Howard S.. (2012). TABLE ERRATA for Magnus, Oberhettinger & Soni (1966): Formulas and Theorems for the Special Functions of Mathematical Physics | NIST. Mathematics of Computation. 81(280). 1 indexed citations
16.
Cohl, Howard S.. (2011). Fundamental Solution of Laplace's Equation in Hyperspherical Geometry. Symmetry Integrability and Geometry Methods and Applications. 10 indexed citations
17.
Cohl, Howard S., et al.. (2010). Generalized Heine’s identity for complex Fourier series of binomials. Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences. 467(2126). 333–345. 3 indexed citations
18.
Cohl, Howard S., A. Rau, Joel E. Tohline, et al.. (2001). Useful alternative to the multipole expansion of1/rpotentials. Physical Review A. 64(5). 40 indexed citations
19.
Cohl, Howard S., Joel E. Tohline, A. Rau, & H. M. Srivastava. (2000). Developments in determining the gravitational potential using toroidal functions. Astronomische Nachrichten. 321(5-6). 363–372. 36 indexed citations
20.
Cohl, Howard S., Xian‐He Sun, & Joel E. Tohline. (1997). Parallel Implementation of a Data-Transpose Technique for the Solution of Poisson's Equation in Cylindrical Coordinates.. PPSC. 2 indexed citations

Rankless uses publication and citation data sourced from OpenAlex, an open and comprehensive bibliographic database. While OpenAlex provides broad and valuable coverage of the global research landscape, it—like all bibliographic datasets—has inherent limitations. These include incomplete records, variations in author disambiguation, differences in journal indexing, and delays in data updates. As a result, some metrics and network relationships displayed in Rankless may not fully capture the entirety of a scholar's output or impact.

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