Naim Tuğlu

457 total citations
31 papers, 321 citations indexed

About

Naim Tuğlu is a scholar working on Statistical and Nonlinear Physics, Discrete Mathematics and Combinatorics and Algebra and Number Theory. According to data from OpenAlex, Naim Tuğlu has authored 31 papers receiving a total of 321 indexed citations (citations by other indexed papers that have themselves been cited), including 24 papers in Statistical and Nonlinear Physics, 15 papers in Discrete Mathematics and Combinatorics and 15 papers in Algebra and Number Theory. Recurrent topics in Naim Tuğlu's work include Advanced Mathematical Theories and Applications (24 papers), Advanced Combinatorial Mathematics (15 papers) and Advanced Mathematical Identities (14 papers). Naim Tuğlu is often cited by papers focused on Advanced Mathematical Theories and Applications (24 papers), Advanced Combinatorial Mathematics (15 papers) and Advanced Mathematical Identities (14 papers). Naim Tuğlu collaborates with scholars based in Türkiye, South Korea and Taiwan. Naim Tuğlu's co-authors include Can Kızılateş, Alexey Stakhov, Pentti Haukkanen, Taekyun Kim, Bruce E. Sagan, H. M. Srivastava, Bayram Çekım, Dursun Taşçı, Paula Catarino and Toufik Mansour and has published in prestigious journals such as Chaos Solitons & Fractals, Applied Mathematics and Computation and Linear Algebra and its Applications.

In The Last Decade

Naim Tuğlu

30 papers receiving 287 citations

Peers — A (Enhanced Table)

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

Name	h						Papers	Cites
Naim Tuğlu Türkiye	10	254	120	98	93	79	31	321
Can Kızılateş Türkiye	12	294 1.2×	102 0.8×	121 1.2×	81 0.9×	90 1.1×	56	360
Dursun Taşçı Türkiye	11	322 1.3×	92 0.8×	108 1.1×	65 0.7×	130 1.6×	39	367
Jósé L. Ramírez Colombia	10	172 0.7×	61 0.5×	176 1.8×	186 2.0×	79 1.0×	79	359
László Szalay Hungary	11	143 0.6×	29 0.2×	166 1.7×	89 1.0×	105 1.3×	68	331
Ákos Pintér Hungary	12	99 0.4×	56 0.5×	324 3.3×	122 1.3×	123 1.6×	64	529
Engın Özkan Türkiye	13	424 1.7×	39 0.3×	116 1.2×	47 0.5×	160 2.0×	80	457
Mark Shattuck United States	10	87 0.3×	128 1.1×	264 2.7×	351 3.8×	47 0.6×	121	443
Alain Togbé United States	13	287 1.1×	73 0.6×	335 3.4×	145 1.6×	215 2.7×	144	594
E M Matveev Russia	7	278 1.1×	71 0.6×	369 3.8×	181 1.9×	145 1.8×	11	550
Leon C. Woodson United States	4	80 0.3×	68 0.6×	176 1.8×	310 3.3×	55 0.7×	6	333

Countries citing papers authored by Naim Tuğlu

Since Specialization

Citations

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

Fields of papers citing papers by Naim Tuğlu

Since Specialization

Physical SciencesHealth SciencesLife SciencesSocial Sciences

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

Co-authorship network of co-authors of Naim Tuğlu

This figure shows the co-authorship network connecting the top 25 collaborators of Naim Tuğlu. A scholar is included among the top collaborators of Naim Tuğlu 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 Naim Tuğlu. Naim Tuğlu is excluded from the visualization to improve readability, since they are connected to all nodes in the network.

All Works

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20 of 20 papers shown

Tuğlu, Naim, et al.. (2023). Apostol Bernoulli-Fibonacci Polynomials, Apostol Euler-Fibonacci Polynomials and Their Generating Functions. DergiPark (Istanbul University). 15(1). 203–211. 5 indexed citations

Tuğlu, Naim, et al.. (2023). A study of harmonic Fibonacci polynomials associated With Bernoulli-F and Euler–Fibonacci polynomials. Indian Journal of Pure and Applied Mathematics. 55(4). 1129–1141. 1 indexed citations

Kızılateş, Can, Naim Tuğlu, & Bayram Çekım. (2019). On the (p, q)–Chebyshev Polynomials and Related Polynomials. Mathematics. 7(2). 136–136. 9 indexed citations

Srivastava, H. M., et al.. (2019). Some results on the q-analogues of the incomplete Fibonacci and Lucas Polynomials. Miskolc mathematical notes/Mathematical notes. 20(1). 511–511. 11 indexed citations

Tuğlu, Naim, et al.. (2019). Bernoulli F-polynomials and Fibo–Bernoulli matrices. Advances in Difference Equations. 2019(1). 14 indexed citations

Kızılateş, Can & Naim Tuğlu. (2018). On the Norms of Geometric and Symmetric Geometric Circulant Matrices with the Tribonacci Number. DergiPark (Istanbul University). 6 indexed citations

Tuğlu, Naim, et al.. (2017). q-Riordan representation. Linear Algebra and its Applications. 525. 105–117. 4 indexed citations

Tuğlu, Naim, et al.. (2015). q-Bernoulli Matrices and Their Some Properties. Gazi university journal of science. 28(2). 269–273. 2 indexed citations

Tuğlu, Naim & Can Kızılateş. (2015). On the Norms of Some Special MatricesWith the Harmonic Fibonacci Numbers. Gazi university journal of science. 28(3). 497–501. 5 indexed citations

10.

Tuğlu, Naim, et al.. (2015). On the harmonic and hyperharmonic Fibonacci numbers. Advances in Difference Equations. 2015(1). 18 indexed citations

11.

Tuğlu, Naim & Can Kızılateş. (2015). On the norms of circulant and r-circulant matrices with the hyperharmonic Fibonacci numbers. Journal of Inequalities and Applications. 2015(1). 19 indexed citations

12.

Kızılateş, Can & Naim Tuğlu. (2015). Some Combinatorial Identities of \(q\)-Harmonic and \(q\)-Hyperharmonic Numbers. Communications in Mathematics and Applications. 6(2). 33–40. 2 indexed citations

13.

Taşçı, Dursun, et al.. (2014). Some Identities for Fibonacci and Incomplete Fibonacci p-Numbers via the Symmetric Matrix Method. 17. 1 indexed citations

14.

Taşçı, Dursun, et al.. (2012). Incomplete Bivariate Fibonacci and Lucas p‐Polynomials. Discrete Dynamics in Nature and Society. 2012(1). 7 indexed citations

15.

Taşçı, Dursun, et al.. (2011). On Fibo-Pascal Matrix Involving k-Fibonacci and k-Pell Matrices. Arabian Journal for Science and Engineering. 36(6). 1031–1037. 5 indexed citations

16.

Tuğlu, Naim, et al.. (2008). Hyperbolic Functions with Second Order Recurrence Sequences.. Ars Combinatoria. 88. 6 indexed citations

17.

Tuğlu, Naim, et al.. (2007). The Binet Formulas for the Pell and Pell-Lucas p-Numbers.. Ars Combinatoria. 85. 8 indexed citations

18.

Mansour, Toufik, et al.. (2007). Norms of circulant and semicirculant matrices and Horadams sequence.. Ars Combinatoria. 85(11). 1265–80. 9 indexed citations

19.

Tuğlu, Naim, et al.. (2004). A note on bounds for norms of the reciprocal LCM matrix. Mathematical Inequalities & Applications. 491–496. 8 indexed citations

20.

Tuğlu, Naim & Dursun Taşçı. (2002). On the LCUMReciprocal GCUD Matrices. 55. 12.

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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