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{{PàS|Recherche:Polynômes de Boubaker}}
== Boubaker Polynomials ==
[[Fichier:Boubaker Polynomials (n=0-6), x=(-2,2).svg|thumb|right|300px|Polynômes de Boubaker ''B''<sub>n</sub>(''x''), avec ''n'' de 0 à 6.]]
 
According to P. Barry ''et al.''<ref>Paul Barry and Aoife Hennessy, Journal of Integer Sequences (JIS),Meixner-Type Results for Riordan Arrays and Associated Integer Sequences, Chapter 6: '''''The Boubaker polynomials ''''' [http://www.emis.ams.org/journals/JIS/VOL13/Barry5/barry96s.pdf]</ref>, A. Kumar<ref> A. S. Kumar , An analytical solution to applied mathematics-related Love's equation using the ‘’’Boubaker polynomials’’’ expansion scheme| journal=International Journal of the Franklin Institute (elsevier) [http://cat.inist.fr/?aModele=afficheN&cpsidt=23388093]</ref> and N. B. Devins ''et al.'' (in the Encyclopedia of Physics Research)<ref> Encyclopedia of Physics Research, Chapter 21: Cryogenics Vessels Thermal Profilng Using the Boubaker Polynomials, Editors: Nancy B. Devins and Jillian P. Ramos, [https://www.novapublishers.com/catalog/product_info.php?products_id=26337&osCsid=] </ref>, The '''Boubaker polynomials ''' are the components of a polynomial sequence<ref>O.D. Oyodum, O.B. Awojoyogbe, M.K. Dada, J.N. Magnuson, Eur. Phys. J. Appl. Phys. Volume 46, pages 2120-21202, On the earliest definition of the '''Boubaker polynomials''' , [http://runners.ritsumei.ac.jp/cgi-bin/swets/hold-query-e?mode=1&key=&idxno=29124246] </ref>:
::
::
::::<math>
\begin{align}
B_0(x) & {} = 1 \\
B_1(x) & {} = x \\
B_2(x) & {} = x^2+2 \\
B_3(x) & {} = x^3+x \\
B_4(x) & {} = x^4-2 \\
B_5(x) & {} = x^5-x^3-3x \\
B_6(x) & {} = x^6-2x^4-3x^2+2 \\
B_7(x) & {} = x^7-3x^5-2x^3+5x \\
B_8(x) & {} = x^8-4x^6+8x^2-2 \\
B_9(x) & {} = x^9-5x^7+3x^5+10x^3-7x \\
& {}\,\,\, \vdots
\end{align}
</math>
 
According to H. Rahmanov<ref>H. Rahmanov, Journal of Studies in Nonlinear Sciences (SNS),2 (1): 46-49, 2011, A Solution to the non Linear Korteweg-De-Vries Equation in the Particular Case Dispersion-Adsorption Problem in Porous Media Using
the Spectral Boubaker Polynomials Expansion Scheme (BPES)[http://idosi.org/sns/2(1)11/9.pdf PDF]</ref> and M. Agida ''et al.''<ref>M. Agida and A S. Kumar, Journal of Studies in Nonlinear Sciences (SNS),2 (1): 46-49, 2011,A Boubaker Polynomials Expansion Scheme Solution to Random Love’s Equation in the Case of a Rational Kernel[http://www.ejtp.com/articles/ejtpv7i24p319.pdf PDF] </ref> ,The Boubaker Polynomials are the components of a polynomial sequence which arose from the discretization of the equations of heat transfer in a
conduction-convection pyrolysis spray framework, they have been named after Boubaker Boubaker (1897-1966).
 
The '''Boubaker polynomials ''' are also defined in general mode through the formula:
:<math>B_n(x)=\sum_{p=0}^{\lfloor n/2\rfloor}\frac{n-4p}{n-p} \binom{n-p}{p} (-1)^p x^{n-2p} </math>
 
The '''Boubaker polynomials ''' can also be defined through the differential equation:
:<math>\begin{align}
(x^2-1)(3nx^2+n-2)y{''}+3x(nx^2+3n-2)y{'}-n(3n^2x^2+n^2-6n+8)y=0 \,
 
\end{align}</math>
 
== Integer Sequences generated by the Boubaker polynomials” ==
The '''Boubaker polynomials ''' have generated many integer sequences in the [http://oeis.org/Seis.html On-Line Encyclopedia of Integer Sequences] (''OEIS'')<ref>[http://oeis.org/search?q=boubaker&sort=&language=english&go=Search On-Line Encyclopedia of Integer Sequences]</ref>:
* [[OEIS:A131386| A131386]] and [[OEIS:A167375| A167375]] by J. Ghanouchi and J. Mathar.
* [[OEIS:A135929|A135929]] , [[OEIS:A135936|A135936]] by Neil J. A. Sloane.
* [[OEIS:A136160| A136160]], [[OEIS:A136255|A136255]], [[OEIS:A136256|A136256]], [[OEIS:A137277|A137277]] and [[OEIS:A137289|A137289]] by R. L. Bagula
* [[OEIS:A137276|A137276]] by Roger L. Bagula and Gary Adamson.
* [[OEIS:A138476|A138476]], by A. Bannour.
* [[OEIS:A160242| A160242]] by Haidar Rahmanov.
* [[OEIS:A161718| A161718]] by M. Amlouk.
* [[OEIS:A162180| A162180]] by Haidar Rahmanov., N. J. A. Sloane and Joerg Arndt
* [[OEIS:A167373| A167373]], [[OEIS:A167543| A167543]] and [[OEIS:A167387| A167387]] by J. Ghanouchi .
* [[OEIS:A172254| A172254]] by L. Naing.
* [[OEIS:A167541| A167541]] by J. Ghanouchi, J. Mathar and N. J. A. Sloane.
* [[OEIS:A167544| A167544]] by J. Ghanouchi, J. Mathar and Vincenzo Librandi .
* [[OEIS:A192011| A192011]] by Paul Curtz and Johannes W. Meijer.
 
== Fields of applications ==
The '''Boubaker polynomials ''' have been widely used in different scientific fields:
=== [[Cryogenics]] ===
Heat equation inside low-temperatures vessels has been solved using the Boubaker Polynomials Expansion Scheme BPES. The results published by Allyson E. Hayes represent reliable and exploitable temperature profiles between -{{unité|252|{{abréviation|°C|degré Celsius}}}} and -{{unité|233|{{abréviation|°C|degré Celsius}}}}<ref>citation|title= Book:Cryogenics: Theory, Processes and Applications, Chapter 8: Cryogenics Vessels Thermal Profilng Using the Boubaker Polynomials Expansion Scheme Investigation , Editor: Allyson E.Hayes [https://www.novapublishers.com/catalog/product_info.php?products_id=17332&osCsid=06f25d4f739dc8ec36c5160f480acaef]</ref>
<ref>Satomi Matsumoto and Ueda Iwate, Book:Materials Science Researcher Biographical Sketches and Research Summaries, Cryogenics Vessels Thermal Profilng Using the Boubaker Polynomials Expansion Scheme Investigation,[https://www.novapublishers.com/catalog/product_info.php?products_id=30346&osCsid=48af8f140687bfc154e3bd2550d3ddac Chapter: Cryogenics Vessels Thermal Profilng Using the Boubaker Polynomials Expansion Scheme Investigation]</ref>.
=== [[Biology]] and [[Biophysics]] ===
The works of B. Dubey et al.<ref>Journal of Theoretical Biology (Elsevier)|id=doi:10.1016/j.jtbi.2010.12.002 B. Dubey, T.G. Zhao, M. Jonsson, H. Rahmanov,A solution to the accelerated-predator-satiety Lotka–Volterra predator–prey problem using Boubaker polynomial expansion scheme, [http://www.ncbi.nlm.nih.gov/pubmed/20109470] </ref> provided analytical solutions to the well-known [[Lotka-Volterra]] Predator-Prey equations in the case of quickly satiable predators. The model incorporated an original accelerated-predator-satiety function which is claimed to be closer to reality, and used the Boubaker Polynomials Expansion Scheme BPES. Thanks to this model, it has been demonstrated that, oppositely to most of the predator-pray problem scenarios predation is not strictly proportional to the prey density in presence predators which are ‘never not hungry’.
 
 
=== [[Dynamic Systems]] ===
A. Milgram used the Boubaker Polynomials Expansion Scheme BPES in order to discuss the stability of some dynamic systems<ref>Journal of Theoretical Biology (Elsevier)|id=doi:10.1016/j.jtbi.2010.01.026 A. Milgram|title = The stability of the Boubaker polynomials expansion scheme (BPES)-based solution to Lotka-Volterra problem | [http://www.ncbi.nlm.nih.gov/pubmed/21145326 ]</ref>.
=== [[Non-Linear Systems]] ===
Non-Linear Systems have been also subjected to Comparative Boubaker Polynomials Expansion Scheme (BPES) and Homotopy Perturbation Method (HPM) analysis by H. Koçak et al.<ref>Mathematical and Computer Modelling(Elsevier)|iddoi:10.1016/j.mcm.2011.02.031 H. Koçak, A. Yıldırım, D.H. Zhang, S.T. Mohyud-Din,The Comparative Boubaker Polynomials Expansion Scheme (BPES) and Homotopy Perturbation Method (HPM) for solving a standard nonlinear second-order boundary value problem,http://www.citeulike.org/article/8940425 </ref> and A. Yildirim<ref> The 7th International Conference on Differential Equations and Dynamic Systems, University of South Florida, Tampa, Fmorida {{Abréviation|USA|United States of America}}, 15-18 December 2010 <Page 40 > A. Yildirim,The boubaker polynomials expansion scheme for solving nonlinear science problems, http://web3.cas.usf.edu/main/depts/mth/7thde/data/Abstracts-7thDEDS-Tampa.pdf</ref>
=== [[Approximation Theory]] ===
Paul Barry and Aoife Hennessy outlined the role of the Boubaker polynomials and their associated integer sequences in arrays analysis and approximation theory<ref>Journal of Integer Sequences (JIS)Paul Barry, Aoife Hennessy,Meixner-Type Results for Riordan Arrays and Associated Integer Sequences, Chapter 6: '''''The Boubaker polynomials ''''' [http://www.emis.ams.org/journals/JIS/VOL13/Barry5/barry96s.pdf]</ref>
=== [[Thermodynamics]] and [[Calorimetry]] ===
In the field of thermodynamics and calorimetry, H. Koçak used the Boubaker Polynomials Expansion Scheme BPES in order to determine the coefficients of [[Antoine]] vapor-pressure equation coefficients<ref> Russian Journal of Physical Chemistry A, Focus on Chemistry (Springer) H. Koçak, Z. Dahong, A. Yildirim,A range-free method to determine antoine vapor-pressure heat transfer-related equation coefficients using the Boubaker polynomials expansion scheme [http://www.springerlink.com/content/d78h761823628gl2/]</ref>, as well as an analytical expression to temperature-dependent [[Kirkwood-Fröhlich]] dipole orientation parameter<ref> Indian Journal of Physics(Springer) H. Koçak, Z. Dahong, A. Yildirim,Analytical expression to temperature-dependent Kirkwood-Fröhlich dipole orientation parameter using the Boubaker Polynomials Expansion Scheme (BPES) http://www.springerlink.com/content/173787083245t267/</ref>. In the same context, A. Belhadj et al. performed accurate thermal profiles inside Laser keyholes using the same scheme<ref>Journal of Thermophysics and Heat Transfer (American Institute of Aeronautics and Astronautics) AIAA, A. Belhadj, O. F. Onyango and N. Rozibaeva,Boubaker Polynomials Expansion Scheme-Related Heat Transfer Investigation Inside Keyhole Model [http://pdf.aiaa.org/jaPreview/JTHT/2009/PVJA41850.pdf] </ref>{{,}}<ref>Journal of Thermal Analysis and Calorimetry(Akadémiai Kiadó, Springer Science & Kluwer Academic Publishers B.V.), id=doi:10.1007/s10973-009-0094-4, A. Belhadj, J. Bessrour, M. Bouhafs and L. Barrallier,Experimental and theoretical cooling velocity profile inside laser welded metals using keyhole approximation and Boubaker polynomials expansion [http://www.springerlink.com/content/2l03064124057686/?p=15de2fa57ce5478aa8a62c2b3a618213&pi=1]</ref>
=== [[Mechanics]] and [[Hydrology]] ===
NASA Astrophysics Data System published a study on Non-Linear Mechanics, carried out by D. H. Zhang , who used the Boubaker Polynomials Expansion Scheme (BPES) for identification of a non-linear 2-degree-of-freedom mechanical system. Thanks to these polynomials, differential equations governing mechanical system behaviours have been transformed into algebraic equations and solutions were plotted in the frequency–energy plane.<ref> International Journal of Non-Linear Mechanics (NASA Astrophysics Data System) D. H. Zhang,Study of a non-linear mechanical system using Boubaker polynomials expansion scheme BPES [http://adsabs.harvard.edu/abs/2011IJNLM..46..443Z] </ref>. Similarly, E. G. Ellouze et al. established the Boubaker Polynomials Copula as a tool for solving hydrological bivariate problems<ref>Studies in Nonlinear Sciences (SNS)Emna Gargouri-Ellouze, Noreen Sher Akbar, Sohail Nadeem,Modelling Nonlinear Bivariate Dependence Using the Boubaker Polynomials Copula '''The Boubaker polynomials ''' [http://idosi.org/sns/2(1)11/3.pdf]</ref>. E. G. Ellouze et al. applied the Boubaker Polynomials copula to a set of discrete random vectors possessing uniform margins. They further suggested a pragmatic way to fit the dependence structure of multivariate data to Boubaker Polynomials copula and empirical contingency tables, and finally established applications of the relationship between infiltration index and the average intensity of rainfall event in some zones.
=== [[Molecular Dynamics]] ===
In the field of molecular-scale dynamics, W. X. Yue et al. evaluated water molecule dipole orientation parameters<ref> Journal of Structural Chemistry (Springer) W. X. Yue, H. Koçak, D. H. Zhang , A. Yıldırım,A second attempt to establish an analytical expression to steam-water dipole orientation parameter using the Boubaker polynomials expansion scheme http://www.springerlink.com/content/57681724u74gvg76/</ref> using the Boubaker Polynomials
=== [[Fundamental Mathematics]] and [[Fundamental Physics]] ===
The Boubaker Polynomials have been used in fundamental mathematics as tools for solving some standard boundary value problems. ) D. H. Zhang et al.<ref> Applied Sciences,(Balkan Society of Geometers, Geometry Balkan Press) D. H. Zhang, L. Naing,The Boubaker polynomials expansion scheme BPES for solving a standard boundary value problem [http://www.mathem.pub.ro/apps/v12/A12-zh.pdf]</ref> proposed an analytical solution to well known applied-physics-related [[Klein-Gordon equation]]. Trough some examples, D. H. Zhang et al. presented good fundaments to the Boubaker Polynomials Expansion Scheme BPES , particularly when exact solutions expressions were difficult to establish.
In fundamental Physics, works of M. Agida et al. have also used the Boubaker Polynomials Expansion Scheme BPES in order to find exact analytical, piecewise continuous and differentiable solutions to [[Love’s equation]]<ref> El. Journal of theretical physics ( EJTP), M. Agida , A. S. Kumar, A Boubaker Polynomials Expansion Scheme Solution to Random Love’s Equation in the Case of a Rational Kernel [http://www.ejtp.com/articles/ejtpv7i24p319.pdf] </ref>,
=== [[Photovoltaics]] ===
Boubaker polynomials have been applied in the domain of material characterization. Fridjine et al. Use these polynomials differential equation and algebraic equation in order to investigate Photovoltaic-thermal hybrid solar cells materials<ref>Modern Physics Letters B ([ISSN: 0217-9849, by WS: World Scientific Publishing Co Pte Ltd] ), S. Fridjine and M. Amlouk,A New Parameter-Abacus for optimizing PV-T Hybrid solar devices functional materials using Boubaker Polynomials Expansion Scheme [http://www.worldscinet.com/mplb/23/2317/S0217984909020321.html]</ref>
=== [[Algebra]], [[Complex Analysyis]], [[Matrix Analysis]] and [[Cryptography]] ===
The contribution of the Boubaker polynomials<ref> The definition of the Boubaker Poynomials, H. Bannour's Website [http://www.bannour.com/polynomes_de_boubaker/t.karem/les_polynomes%20_de_boubaker.pdf]</ref> in Pure and applied algebra can be seen through the publications of A. Lzon et al.<ref> Recurrence relation for polynomial sequences via Riordan matrices, Pages 24-25: BOUBAKER POLYNOMIALS associated Riordan matrix, A. Luzon and M. Moron [http://arxiv.org/PS_cache/arxiv/pdf/0904/0904.2672v1.pdf]</ref>, S. Kumar<ref> International Journal of the Franklin Institute (elsevier), A. S. Kumar , An analytical solution to applied mathematics-related Love's equation using the ‘’’Boubaker polynomials’’’ expansion scheme [http://cat.inist.fr/?aModele=afficheN&cpsidt=23388093]</ref> K. Bülent et al.<ref > Kiliç Bülent, Erdal Bas, Page 7, Citation 27: Boubaker polynomials , [http://cujse.cankaya.edu.tr/archive/14/02_cujse_10018.pdf] </ref>, C. R. Caldera et al.<ref > C. R. Caldera and A. Milgram, , Notes on uniqueness of the Boubaker Polynomials Expansion Scheme (BPES) solution in the case of the Klein–Gordon equation ,Computers and Mathematics with Applications 62 (2011) 536–538, Elsevier [http://www.citeulike.org/article/9281375]</ref>{{,}}<ref > C. R. Caldera and A. Milgram, , Boubaker Polynomial Expansion Scheme BPES ternary materials optimization: A critical approach (Comment on a paper of MLBLUE),Material Letters (Elsevier) [http://journals1.scholarsportal.info/details.xqy?uri=/0167577x/unassigned/nfp_bpesbtaoapom.xml]</ref> and B. T. Rao et al.<ref> B. Tirimula Rao, P. Srinivsu, C. Anantha Rao, K. Satya Vivek Vardhan, Jami Vidyadhari ,Page 8 : Boubaker polynomials ,[http://papers.ssrn.com/sol3/Delivery.cfm/SSRN_ID1523651_code1403499.pdf?abstractid=1523651&mirid=3]</ref>
 
== References ==
<references />
== External links ==
* Encyclopedia of Physics Research: citation| title= Encyclopedia of Physics Research, Chapter 21: Cryogenics Vessels Thermal Profilng Using the Boubaker Polynomials, Editors: Nancy B. Devins and Jillian P. Ramos https://www.novapublishers.com/catalog/product_info.php?products_id=26337&osCsid=
* [[NASA]]: {{Abréviation|USA|United States of America}}-Physics Abstract Service Database
:citation|title=a New Parameter:. AN Abacus for Optimizing Pv-T Hybrid Solar Device Functional Materials Using the Boubaker Polynomials Expansion Scheme http://adsabs.harvard.edu/abs/2009MPLB...23.2179F and citation|title= http://adsabs.harvard.edu/cgi-bin/nph-data_query?doi=10.1007/s00231-009-0493-x&db_key=PHY&link_type=ABSTRACT&high=499df58f2b32224
* [[La Presse]]
:citation|title=De Khawarizmi à Euler|journal=La Presse Magazine|date=January 9, 2008 http://www.lapresse.tn/index.php?opt=15&categ=4&news=63764 aussi [http://www.tunisie7arts.com/?nomPage=suite&newsid=555 tunisie7arts.com]
:citation|title=Le polynôme de Boubaker|journal=La Presse Magazine|date=April 22, 2007|issue=1019|page=6 http://www.lapresse.tn/pdf/magazine/2007-04-23_weekend22-04-2007.pdf fr
* [[John Wiley & Sons]]
: citation|title=A new polynomial sequence... The Boubaker Polynomials|journal=Numerical Methods for Partial Differential Equations NMPDE http://www3.interscience.wiley.com/journal/120747691/abstract
* [[AIAA]] [[American Institute of Aeronautics and Astronautics]]''', Inc.
:citation|title=Solution to Heat Equation Using Boubaker Polynomials|journal=J. of Thermophysics and Heat Transfer http://pdf.aiaa.org/jaPreview/JTHT/2009/PVJA40216.pdf
* [[ASME]] [[American Society of Mechanical Engineers]]''', Inc.
:citation|title=Boubaker Polynomials Weak Solutions to a Robin Boundary Conditioned Dynamic-State Heat Transfer Problem |journal=International Journal of Heat Transfer http://scitation.aip.org/getabs/servlet/GetabsServlet?prog=normal&id=JHTRAO000131000011111305000001&idtype=cvips&gifs=yes
* [[WS]] World Scientific Publishing Co Pte Ltd
: citation|title=AMLOUK–BOUBAKER EXPANSIVITY..USING BOUBAKER POLYNOMIALS |journal=Functional Materials Letter http://www.worldscinet.com/fml/02/0201/S1793604709000533.html
* Academic Publications
:citation|title=A new polynomial sequence ...The Boubaker Polynomials|journal=International Journal of Applied Mathematics [http://www.diogenes.bg/ijam/]
* Other papers [http://www.adsabs.harvard.edu/ '''NASA''' Astrophysics Data System ]
:[http://adsabs.harvard.edu/abs/2010JCrGr.312..202F]
:[http://adsabs.harvard.edu/abs/2008EPJAP..44..317S]
:[http://adsabs.harvard.edu/abs/2009HMT....45.1247T]
:[http://adsabs.harvard.edu/abs/2009CAP.....9..278A]
:[http://adsabs.harvard.edu/abs/2009MPLB...23.2179F]
:[http://adsabs.harvard.edu/abs/2008MPLB...22.2893G]
:[http://adsabs.harvard.edu/abs/2009EPJAP..46b1201O]
:[http://adsabs.harvard.edu/abs/2011OptLT..43..546D]
:[http://adsabs.harvard.edu/abs/2010JEPT...83...83B]
:[http://adsabs.harvard.edu/abs/2010JCrGr.312..202F]
:[http://adsabs.harvard.edu/abs/2010CAP....10..289A]
:[http://adsabs.harvard.edu/abs/2009CAP.....9..622D]
:[http://adsabs.harvard.edu/abs/2009NHTA...5..401S]
:[http://adsabs.harvard.edu/abs/2009CAP.....9.1129L]
 
* [[ENEA]] Ente Nazionale per le Energie Alternative
: citation|title=An attempt... using Boubaker Polynomials|journal= International Journal of Heat and Technology http://termserv.casaccia.enea.it/eurotherm/indexHT.html
* [[Taylor and Francis]]
: citation|title=Numerical Distribution of Temperature During Welding Using Boubaker Polynomials |journal= Numerical Heat Transfer, Part A, Applications http://www.informaworld.com/smpp/content~db=all~content=a908590869?words=boubaker
* [[Università Statale di San Pietroburgo]],[[Санкт-Петербургский государственный университет]]
:: citation|title=Establishment of an Ordinary Generating Function and a Christoffel-Darboux Type First-Order Differential Equation for the Heat Equation Related Boubaker-Turki Polynomials|journal= Journal of Differential Equations and C.P. http://www.neva.ru/journal/j/pdf/boubaker2.pdf
::citation|title=Some new properties of the applied-physics related Boubaker polynomials http://www.neva.ru/journal/j/pdf/zhao.pdf
* [http://www.sav.sk/index.php?lang=sk&charset=&doc=org-ins&institute_no=65 Slovak Academy of Sciences],[http://www.sav.sk/index.php?lang=sk&charset=&doc=org-ins&institute_no=65 Ústav stavebníctva a architektúry SAV]
:: citation 3, Page 97 C.P.|=http://www.ustarch.sav.sk/ustarch/reports/USTARCH-SAV_Annual_Report_2010_up100211.pdf
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* [http://www.zentralblatt-math.org/zmath/ MATH Database 1931- 2011, © ''European Mathematical Society'', FIZ Karlsruhe & Springer-Verlag]
::: [http://www.zentralblatt-math.org/zmath/en/search/?q=an:05827339&type=pdf&format=complete Meixner-type results for Riordan arrays and associated integer sequences, Chap. 6 '''Boubaker Polynomials''']
::: [http://www.zentralblatt-math.org/zmath/en/search/?q=an:05829312&type=pdf&format=complete An analytical solution to applied mathematics-related Love’s equation using the '''Boubaker polynomials expansion scheme''']
:::[http://www.zentralblatt-math.org/zmath/en/search/?q=an:05791036&type=pdf&format=complete Some new features of the '''Boubaker polynomials''' expansion scheme]
:::[http://www.zentralblatt-math.org/zmath/en/search/?q=an:05695599&type=pdf&format=complete The '''Boubaker polynomials''' expansion scheme BPES for solving a standard boundary value problem]
* [http://planetmath.org/?op=getobj&from=objects&id=12200 PlanetMath]
* [http://www.proofwiki.org/wiki/Definition:Boubaker_Polynomials ProofWiki]
* [https://www.oeis.org/wiki/Boub%C9%91ker_Polynomi%C9%91ls On-line Integer Sequences Encyclopedia]
* [http://en.wikiversity.org/wiki/Boubaker_Polynomials Wikiversity]