M. Havlı́ček

673 total citations
48 papers, 404 citations indexed

About

M. Havlı́ček is a scholar working on Algebra and Number Theory, Geometry and Topology and Statistical and Nonlinear Physics. According to data from OpenAlex, M. Havlı́ček has authored 48 papers receiving a total of 404 indexed citations (citations by other indexed papers that have themselves been cited), including 29 papers in Algebra and Number Theory, 23 papers in Geometry and Topology and 21 papers in Statistical and Nonlinear Physics. Recurrent topics in M. Havlı́ček's work include Advanced Topics in Algebra (29 papers), Algebraic structures and combinatorial models (23 papers) and Nonlinear Waves and Solitons (14 papers). M. Havlı́ček is often cited by papers focused on Advanced Topics in Algebra (29 papers), Algebraic structures and combinatorial models (23 papers) and Nonlinear Waves and Solitons (14 papers). M. Havlı́ček collaborates with scholars based in Czechia, Canada and Russia. M. Havlı́ček's co-authors include Pavel Exner, Edita Pelantová, J. Patera, J. Tolar, J. Hořejší, Č. Burdík, P. Winternitz, Piotr Bożek, A. U. Klimyk and J. Niederle and has published in prestigious journals such as SHILAP Revista de lepidopterología, Communications in Mathematical Physics and Physics Letters A.

In The Last Decade

M. Havlı́ček

39 papers receiving 359 citations

Peers — A (Enhanced Table)

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

Name	h						Papers	Cites
M. Havlı́ček Czechia	11	228	218	144	126	80	48	404
D. P. Zhelobenko Russia	7	289 1.3×	211 1.0×	110 0.8×	268 2.1×	39 0.5×	21	514
Frédéric Patras France	12	292 1.3×	298 1.4×	48 0.3×	119 0.9×	50 0.6×	64	472
Rutwig Campoamor-Stursberg Spain	12	358 1.6×	336 1.5×	295 2.0×	151 1.2×	75 0.9×	124	566
J. Tolar Czechia	9	83 0.4×	92 0.4×	77 0.5×	61 0.5×	76 0.9×	34	244
Leonid Chekhov Russia	15	421 1.8×	127 0.6×	293 2.0×	359 2.8×	30 0.4×	68	753
D. E. Littlewood United Kingdom	10	280 1.2×	151 0.7×	71 0.5×	206 1.6×	33 0.4×	21	554
Paul Zinn-Justin France	14	430 1.9×	106 0.5×	190 1.3×	227 1.8×	90 1.1×	52	690
D P Želobenko	6	217 1.0×	167 0.8×	83 0.6×	253 2.0×	38 0.5×	10	430
Anatol N. Kirillov Japan	12	438 1.9×	260 1.2×	130 0.9×	208 1.7×	18 0.2×	35	579
Luc Haine Belgium	15	229 1.0×	99 0.5×	314 2.2×	117 0.9×	74 0.9×	25	512

Countries citing papers authored by M. Havlı́ček

Since Specialization

Citations

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

Fields of papers citing papers by M. Havlı́ček

Since Specialization

Physical SciencesHealth SciencesLife SciencesSocial Sciences

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

Co-authorship network of co-authors of M. Havlı́ček

This figure shows the co-authorship network connecting the top 25 collaborators of M. Havlı́ček. A scholar is included among the top collaborators of M. Havlı́ček 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 M. Havlı́ček. M. Havlı́ček 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

Havlı́ček, M., et al.. (2023). Orthonormal Bases on $\mathit{L}^2$($\mathbb{R}$$^+$). Journal of Advances in Mathematics and Computer Science. 38(11). 95–102.

Havlı́ček, M., et al.. (2018). Construction of representations of Poincaré group using Lie fields. Journal of Mathematical Physics. 59(2).

Havlı́ček, M., Edita Pelantová, & J. Tolar. (2010). On Representations of sl(n, C) Compatible with a Z2-grading. Acta Polytechnica. 50(5). 1 indexed citations

Havlı́ček, M., Edita Pelantová, J. Patera, & J. Tolar. (2002). DISTINGUISHED BASES OF sl(n,C) AND THEIR SYMMETRIES. 366–370. 3 indexed citations

Havlı́ček, M., J. Patera, Edita Pelantová, & J. Tolar. (2002). Automorphisms of the fine grading of sl(n,C) associated with the generalized Pauli matrices. Journal of Mathematical Physics. 43(2). 1083–1094. 17 indexed citations

Havlı́ček, M., J. Patera, & Edita Pelantová. (2000). On Lie gradings III. Gradings of the real forms of classical Lie algebras. Linear Algebra and its Applications. 314(1-3). 1–47. 30 indexed citations

Havlı́ček, M., J. Patera, & Edita Pelantová. (1998). On Lie gradings II. Linear Algebra and its Applications. 277(1-3). 97–125. 60 indexed citations

Havlı́ček, M., et al.. (1998). Representations of the cyclically symmetric q-deformed algebra Uq(so3). Czechoslovak Journal of Physics. 48(11). 1347–1353. 1 indexed citations

Havlı́ček, M., Edita Pelantová, & A. U. Klimyk. (1997). Nonstandard Uq(so3) and Uq(so4): tensor products of representations, oscillator realizations and roots of unity. Czechoslovak Journal of Physics. 47(1). 13–16. 2 indexed citations

10.

Bożek, Piotr, et al.. (1985). A new relationship between Lie algebras of Poincaré and de Sitter groups. 5 indexed citations

11.

Havlı́ček, M., et al.. (1982). Boson–fermion representations of Lie superalgebras: The example of osp(1,2). Journal of Mathematical Physics. 23(3). 350–353. 7 indexed citations

12.

Burdík, Č., M. Havlı́ček, & Pavel Exner. (1981). Highest-weight representations of the sl(n+1,C) algebras: Maximal representations. Journal of Physics A Mathematical and General. 14(5). 1039–1054. 1 indexed citations

13.

Burdík, Č., Pavel Exner, & M. Havlı́ček. (1981). A complete set of irreducible highest-weight representations forsl (3, ℂ). Czechoslovak Journal of Physics. 31(11). 1201–1206.

14.

Havlı́ček, M., et al.. (1980). New method for computation of discrete spectrum of radical Schrödinger operator. Applications of Mathematics. 25(5). 358–372. 9 indexed citations

15.

Exner, Pavel, et al.. (1979). Quantum-mechanical pseudo-hamiltonians. Czechoslovak Journal of Physics. 29(12). 1325–1341. 9 indexed citations

16.

Havlı́ček, M., et al.. (1976). Canonical realizations of the lie algebrasp(2n, R). International Journal of Theoretical Physics. 15(11). 867–876. 11 indexed citations

17.

Havlı́ček, M. & Pavel Exner. (1975). Matrix canonical realizations of the Lie algebra $o(m, n)$ . I. Basic formulæ and classification. French digital mathematics library (Numdam). 23(4). 335–347. 2 indexed citations

18.

Havlı́ček, M., et al.. (1975). Canonical realizations of the lie algebras gl(n, R) and sl(n, R) I. Formulae and classification. Reports on Mathematical Physics. 8(3). 391–399. 15 indexed citations

19.

Havlı́ček, M. & Pavel Exner. (1973). Note on the description of an unstable system. Czechoslovak Journal of Physics. 23(6). 594–600. 10 indexed citations

20.

Havlı́ček, M., et al.. (1967). The tensor product of one-particle representations of an infinite-dimensional Lie algebra. Czechoslovak Journal of Physics. 17(10). 809–821. 2 indexed citations

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