Duo Wang

1.1k total citations · 1 hit paper
20 papers, 809 citations indexed

About

Duo Wang is a scholar working on Geometry and Topology, Statistical and Nonlinear Physics and Mathematical Physics. According to data from OpenAlex, Duo Wang has authored 20 papers receiving a total of 809 indexed citations (citations by other indexed papers that have themselves been cited), including 15 papers in Geometry and Topology, 10 papers in Statistical and Nonlinear Physics and 7 papers in Mathematical Physics. Recurrent topics in Duo Wang's work include Advanced Differential Equations and Dynamical Systems (14 papers), Quantum chaos and dynamical systems (7 papers) and Mathematical Dynamics and Fractals (6 papers). Duo Wang is often cited by papers focused on Advanced Differential Equations and Dynamical Systems (14 papers), Quantum chaos and dynamical systems (7 papers) and Mathematical Dynamics and Fractals (6 papers). Duo Wang collaborates with scholars based in China, United States and France. Duo Wang's co-authors include Shui-Nee Chow, Chengzhi Li, Hai Huang, Cars Hommes, Jing Li, Guoting Chen, Jianping Peng, Lina Zhang, B. Drachman and Jiazhong Yang and has published in prestigious journals such as Transactions of the American Mathematical Society, Journal of Differential Equations and Journal of Computational and Applied Mathematics.

In The Last Decade

Duo Wang

20 papers receiving 747 citations

Hit Papers

Normal Forms and Bifurcation of Planar Vector Fields 1994 2026 2004 2015 1994 100 200 300 400 500
What are hit papers?

Hit papers significantly outperform the citation benchmark for their cohort. A paper qualifies if it has ≥500 total citations, achieves ≥1.5× the top-1% citation threshold for papers in the same subfield and year (this is the minimum needed to enter the top 1%, not the average within it), or reaches the top citation threshold in at least one of its specific research topics.

  1. Normal Forms and Bifurcation of Planar Vector Fields
    1994 524 citations Shui-Nee Chow, Chengzhi Li et al. Cambridge University Press eBooks profile →

Peers — A (Enhanced Table)

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

Name h Career Trend Papers Cites
Duo Wang China 10 377 361 261 194 121 20 809
Christian Mira France 13 609 1.6× 209 0.6× 322 1.2× 106 0.5× 289 2.4× 38 988
Luis T. Magalhães Portugal 8 333 0.9× 147 0.4× 481 1.8× 284 1.5× 17 0.1× 14 885
Hui Fang China 14 266 0.7× 97 0.3× 107 0.4× 185 1.0× 20 0.2× 46 711
Hanns-Otto Walther Netherlands 2 140 0.4× 68 0.2× 208 0.8× 159 0.8× 20 0.2× 2 648
Iram Gléria Brazil 15 216 0.6× 39 0.1× 50 0.2× 118 0.6× 181 1.5× 57 583
Stephen Schecter United States 17 254 0.7× 171 0.5× 220 0.8× 126 0.6× 23 0.2× 73 834
Hans‐Otto Walther Germany 21 272 0.7× 164 0.5× 436 1.7× 390 2.0× 25 0.2× 102 1.3k
A. N. Sharkovsky Ukraine 11 328 0.9× 94 0.3× 202 0.8× 97 0.5× 66 0.5× 40 606
Frederick R. Marotto United States 7 456 1.2× 133 0.4× 256 1.0× 119 0.6× 63 0.5× 8 668
Benito Hernández‐Bermejo Spain 14 240 0.6× 124 0.3× 72 0.3× 34 0.2× 14 0.1× 41 561

Countries citing papers authored by Duo Wang

Since Specialization
Citations

This map shows the geographic impact of Duo Wang'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 Duo Wang with the expected number of citations based on a country's size and research output (numbers larger than one mean the country cites Duo Wang more than expected).

Fields of papers citing papers by Duo Wang

Since Specialization
Physical SciencesHealth SciencesLife SciencesSocial Sciences

This network shows the impact of papers produced by Duo Wang. 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 Duo Wang. The network helps show where Duo Wang may publish in the future.

Co-authorship network of co-authors of Duo Wang

This figure shows the co-authorship network connecting the top 25 collaborators of Duo Wang. A scholar is included among the top collaborators of Duo Wang 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 Duo Wang. Duo Wang 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.
Wang, Hefei, et al.. (2020). Redefined Epidemiological Model Predicts COVID-19 Spread in Mainland China and South Korea. SSRN Electronic Journal. 1 indexed citations
2.
Wang, Duo, et al.. (2018). A Filled Function for Non-smooth Box-constrained Global Optimization and Its Application. DEStech Transactions on Economics Business and Management. 1 indexed citations
3.
Li, Jing, et al.. (2017). Unique Normal Form and the Associated Coefficients for a Class of Three-Dimensional Nilpotent Vector Fields. International Journal of Bifurcation and Chaos. 27(14). 1750224–1750224. 2 indexed citations
4.
Li, Jing, et al.. (2017). Unique Normal Form for a Class of Three-Dimensional Nilpotent Vector Fields. International Journal of Bifurcation and Chaos. 27(8). 1750131–1750131. 4 indexed citations
5.
Li, Jing, Lina Zhang, & Duo Wang. (2014). Unique normal form of a class of 3 dimensional vector fields with symmetries. Journal of Differential Equations. 257(7). 2341–2359. 21 indexed citations
6.
Wang, Duo, Min Zheng, & Jianping Peng. (2008). FURTHER REDUCTION OF NORMAL FORMS AND UNIQUE NORMAL FORMS OF SMOOTH MAPS. International Journal of Bifurcation and Chaos. 18(3). 803–825. 3 indexed citations
7.
Wang, Duo, Min Zheng, & Jianping Peng. (2006). Further reduction of normal forms of formal maps. Comptes Rendus Mathématique. 343(10). 657–660. 3 indexed citations
8.
Chen, Guoting, Duo Wang, & Jiazhong Yang. (2005). Unique Orbital Normal Form for Vector Fields of Hopf-Zero Singularity. Journal of Dynamics and Differential Equations. 17(1). 3–20. 9 indexed citations
9.
Hommes, Cars, Hai Huang, & Duo Wang. (2004). A robust rational route to randomness in a simple asset pricing model. Journal of Economic Dynamics and Control. 29(6). 1043–1072. 114 indexed citations
10.
Peng, Jianping & Duo Wang. (2004). A SUFFICIENT CONDITION FOR THE UNIQUENESS OF NORMAL FORMS AND UNIQUE NORMAL FORMS OF GENERALIZED HOPF SINGULARITIES. International Journal of Bifurcation and Chaos. 14(9). 3337–3345. 10 indexed citations
11.
Chen, Guoting, Duo Wang, & Jiazhong Yang. (2003). Unique normal forms for Hopf-zero vector fields. Comptes Rendus Mathématique. 336(4). 345–348. 8 indexed citations
12.
Chen, Guoting, Duo Wang, & Xiaofeng Wang. (2002). UNIQUE NORMAL FORMS FOR NILPOTENT PLANAR VECTOR FIELDS. International Journal of Bifurcation and Chaos. 12(10). 2159–2174. 15 indexed citations
13.
Wang, Duo. (2001). . Zeitschrift für angewandte Mathematik und Physik. 52(4). 620–630. 16 indexed citations
14.
Wang, Xiaofeng, Guoting Chen, & Duo Wang. (2001). Unique normal forms for the Takens–Bogdanov singularity in a special case. Comptes Rendus de l Académie des Sciences - Series I - Mathematics. 332(6). 551–555. 4 indexed citations
15.
Wang, Duo, et al.. (2000). Unique Normal Form of Bogdanov–Takens Singularities. Journal of Differential Equations. 163(1). 223–238. 35 indexed citations
16.
Wang, Xiaofeng & Duo Wang. (1999). The $C^1$ closing lemma for nonsingular endomorphisms equivariant under free actions of finite groups. Transactions of the American Mathematical Society. 351(10). 4173–4182. 1 indexed citations
17.
Chow, Shui-Nee, Chengzhi Li, & Duo Wang. (1994). Normal Forms and Bifurcation of Planar Vector Fields. Cambridge University Press eBooks. 524 indexed citations breakdown →
18.
Drachman, B., et al.. (1990). Computation of normal forms. Journal of Computational and Applied Mathematics. 29(2). 129–143. 21 indexed citations
19.
Chow, Shui-Nee, Chengzhi Li, & Duo Wang. (1989). Uniqueness of periodic orbits of some vector fields with codimension two singularities. Journal of Differential Equations. 77(2). 231–253. 14 indexed citations
20.
Chow, Shui-Nee, et al.. (1989). A simple proof of the uniqueness of periodic orbits in the $1:3$ resonance problem. Proceedings of the American Mathematical Society. 105(4). 1025–1025. 3 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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