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Relevant bibliographies by topics / Numbus

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Academic literature on the topic 'Numbus'

Author: Grafiati

Published: 4 June 2021

Last updated: 1 February 2022

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Journal articles on the topic "Numbus"

1

Solomko, M., and B. Krulikovskyj. "Оптимізація перенесення при додаванні двійкових чисел у теоретико-числовому базисі Радемахера." Computer systems and network 1, no. 1 (February 23, 2016): 88–101. http://dx.doi.org/10.23939/csn2016.857.088.

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Azarija, Jernej, and Riste Škrekovski. "Euler's idoneal numbers and an inequality concerning minimal graphs with a prescribed number of spanning trees." Mathematica Bohemica 138, no. 2 (2013): 121–31. http://dx.doi.org/10.21136/mb.2013.143285.

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Montémont, Véronique. "Roubaud’s number on numbers." Journal of Romance Studies 7, no. 3 (December 2007): 111–21. http://dx.doi.org/10.3828/jrs.7.3.111.

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Lyubomudrov, Alexey Alexeevich. "An Approach to Dividing Modules of Numbers by the Values of Bases in Number Systems in Residual Classes." Revista Gestão Inovação e Tecnologias 11, no. 4 (July 10, 2021): 1547–52. http://dx.doi.org/10.47059/revistageintec.v11i4.2207.

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Steele, G. Ander. "Carmichael numbers in number rings." Journal of Number Theory 128, no. 4 (April 2008): 910–17. http://dx.doi.org/10.1016/j.jnt.2007.08.009.

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Hofweber, T. "Number Determiners, Numbers, and Arithmetic." Philosophical Review 114, no. 2 (April 1, 2005): 179–225. http://dx.doi.org/10.1215/00318108-114-2-179.

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Jędrzejak, Tomasz. "Congruent numbers over real number fields." Colloquium Mathematicum 128, no. 2 (2012): 179–86. http://dx.doi.org/10.4064/cm128-2-3.

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Fellows, Michael R., Serge Gaspers, and Frances A. Rosamond. "Parameterizing by the Number of Numbers." Theory of Computing Systems 50, no. 4 (October 29, 2011): 675–93. http://dx.doi.org/10.1007/s00224-011-9367-y.

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Day, Sophie, Celia Lury, and Nina Wakeford. "Number ecologies: numbers and numbering practices." Distinktion: Journal of Social Theory 15, no. 2 (May 4, 2014): 123–54. http://dx.doi.org/10.1080/1600910x.2014.923011.

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Fu, Ruiqin, Hai Yang, and Jing Wu. "The Perfect Numbers of Pell Number." Journal of Physics: Conference Series 1237 (June 2019): 022041. http://dx.doi.org/10.1088/1742-6596/1237/2/022041.

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Dissertations / Theses on the topic "Numbus"

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Ho, Kwan-hung, and 何君雄. "On the prime twins conjecture and almost-prime k-tuples." Thesis, The University of Hong Kong (Pokfulam, Hong Kong), 2002. http://hub.hku.hk/bib/B29768421.

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Chan, Ching-yin, and 陳靖然. "On k-tuples of almost primes." Thesis, The University of Hong Kong (Pokfulam, Hong Kong), 2013. http://hdl.handle.net/10722/195967.

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Anderson, Crystal Lynn. "An Introduction to Number Theory Prime Numbers and Their Applications." Digital Commons @ East Tennessee State University, 2006. https://dc.etsu.edu/etd/2222.

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The author has found, during her experience teaching students on the fourth grade level, that some concepts of number theory haven't even been introduced to the students. Some of these concepts include prime and composite numbers and their applications. Through personal research, the author has found that prime numbers are vital to the understanding of the grade level curriculum. Prime numbers are used to aide in determining divisibility, finding greatest common factors, least common multiples, and common denominators. Through experimentation, classroom examples, and homework, the author has introduced students to prime numbers and their applications.

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Fransson, Jonas. "Generalized Fibonacci Series Considered modulo n." Thesis, Linnéuniversitetet, Institutionen för matematik (MA), 2013. http://urn.kb.se/resolve?urn=urn:nbn:se:lnu:diva-26844.

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In this thesis we are investigating identities regarding Fibonacci sequences. In particular we are examiningthe so called Pisano period, which is the period for the Fibonacci sequence considered modulo n to repeatitself. The theory shows that it suces to compute Pisano periods for primes. We are also looking atthe same problems for the generalized Pisano period, which can be described as the Pisano period forthe generalized Fibonacci sequence.

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Ewers-Rogers, Jennifer. "Very young children's understanding and use of numbers and number symbols." Thesis, University College London (University of London), 2002. http://discovery.ucl.ac.uk/10007376/.

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Children grow up surrounded by numerals reflecting various uses of number. In their primary school years they are expected to grasp arithmetical symbols and use measuring devices. While much research on number development has examined children's understanding of numerical concepts and principles, little has investigated their understanding of these symbols. This thesis examines studies of understanding and use of number symbols in a range of contexts and for a variety of purposes. It reports several studies on the use of numerals by children aged between 3 and 5 years in Nursery settings in England, Japan and Sweden and their understanding of the meanings of these symbols. 167 children were observed and interviewed individually in the course of participating in a range of practical activities; the activities were designed for the study and considered to be appropriate and interesting for young children. The results are discussed in terms of how they complement existing theories of number development and their relevance to early years mathematics education.

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Brown, Bruce J. L. "Numbers: a dream or reality? A return to objects in number learning." Saechsische Landesbibliothek- Staats- und Universitaetsbibliothek Dresden, 2012. http://nbn-resolving.de/urn:nbn:de:bsz:14-qucosa-82378.

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Bronder, Justin S. "The AKS Class of Primality Tests: A Proof of Correctness and Parallel Implementation." Fogler Library, University of Maine, 2006. http://www.library.umaine.edu/theses/pdf/BronderJS2006.pdf.

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Kong, Yafang, and 孔亚方. "On linear equations in primes and powers of two." Thesis, The University of Hong Kong (Pokfulam, Hong Kong), 2013. http://hub.hku.hk/bib/B50533769.

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It is known that the binary Goldbach problem is one of the open problems on linear equations in primes, and it has the Goldbach-Linnik problem, that is, representation of an even integer in the form of two odd primes and powers of two, as its approximate problem. The theme of my research is on linear equations in primes and powers of two. Precisely, there are two cases: one pair of linear equations in primes and powers of two, and one class of pairs of linear equations in primes and powers of two, in this thesis. In 2002, D.R. Heath-Brown and P.C. Puchta obtained that every sufficiently large even integer is the sum of two odd primes and k powers of two. Here k = 13, or = 7 under the generalized Riemann hypothesis. In 2010, B. Green and T. Tao obtained that every pair of linear equations in four prime variables with coefficients matrix A = (a_ij)s×t with s ≤ t, satisfying nondegenerate condition, that is, A has full rank and the only elements of the row-space of A over Q with two or fewer nonzero entries is the zero vector, is solvable. The restriction on the coefficient matrix means that they excluded the case of the binary Goldbach problem. Motivated by the above results, it is obtained that for every pair of sufficiently large positive even integers B1, B2, the simultaneous equation {█({B1 = p1 + p2 + 2v1 + 2v2 + · · · + 2vk ,@B2 = p3 + p4 + 2v1 + 2v2 + · · · + 2vk ,)┤ (1) is solvable, where p1, · · · , p4 are odd primes, each vi is a positive integer, and the positive integer k ≥ 63 or ≥ 31 under the generalized Riemann hypothesis. Note that, in 1989, M.C. Liu and K.M. Tsang have obtained that subject to some natural conditions on the coefficients, every pair of linear equations in five prime variables is solvable. Therefore one class of pairs of linear equations in four prime variables with special coefficient matrix and powers of two is considered. Indeed, it is deduced that every pair of integers B1 and B2 satisfying B1 ≡ 0 (mod 2), 3BB1 > e^(eB^48 ), B2 ≡ ∑_1^4▒= 1^(a_i ) (mod 2) and |B2| < BB1, where B = max1≤j≤4(2, |aj|), can be represented as {█(B1 = 〖p1〗_1 + p2 + 2^(v_1 ) + 2^(v_2 )+ · · · + 2^(v_k )@B2 = a1p1 + a2p2 + a3p3 + a4p4 + 2^(v_1 )+ 2^(v_2 )+ · · · + 2^(v_k ) )┤ (2) with k being a positive integer. Here p1, · · · p4 are odd primes, each 〖v 〗_iis a positive integer and the integral coefficients ai (i = 1, 2, 3, 4) satisfy {█((〖a 〗_1- 〖a 〗_2, 〖a 〗_3, 〖a 〗_4) = 1,@〖a 〗_1 〖a 〗_2< 0, 〖a 〗_3 〖a 〗_4<0,)┤ Moreover it is calculated that the positive integer k ≥ g(〖a 〗_1- 〖a 〗_2, 〖a 〗_3, 〖a 〗_4) where g(〖a 〗_21- 〖a 〗_22, 〖a 〗_23, 〖a 〗_24) = [(log⁡〖G(〖a 〗_21, …, 〖a 〗_24 〗)-log⁡〖F (〖a 〗_21, …, 〖a 〗_24)〗)/log0.975805-84.0285], (3) G(〖a 〗_21, 〖a 〗_22, 〖a 〗_23, 〖a 〗_24) = (min(1/(|a_24 |), 1/(|a_23 |)) - (〖|a〗_(21 )- a_22 |)/(|〖a_23 a〗_24 |) 〖(3B)〗^(-1) ×〖(3B)〗^(-1) (1-0.000001)- 〖(3B)〗^(-1-4), with B = max1≤j≤4(2, |a2j|), and F(a_21, …, a_24) = √(f(a_21)f〖(a〗_22 )) with f(a_2i) = {█(4414.15h (a_21-1)+5.088331 if a_21≠1@59.8411 if a_21=1,)┤ for i = 1, 2, and h(n) =∏_(p|n,p>2)▒(p-1)/(p-2). This result, if without the powers of two, can make up some of the cases excluded in Green and Tao’s paper.
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Mathematics
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Ketkar, Pallavi S. (Pallavi Subhash). "Primitive Substitutive Numbers are Closed under Rational Multiplication." Thesis, University of North Texas, 1998. https://digital.library.unt.edu/ark:/67531/metadc278637/.

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Lehr (1991) proved that, if M(q, r) denotes the set of real numbers whose expansion in base-r is q-automatic i.e., is recognized by an automaton A = (Aq, Ar, ao, δ, φ) (or is the image under a letter to letter morphism of a fixed point of a substitution of constant length q) then M(q, r) is closed under addition and rational multiplication. Similarly if we let M(r) denote the set of real numbers α whose base-r digit expansion is ultimately primitive substitutive, i.e., contains a tail which is the image (under a letter to letter morphism) of a fixed point of a primitive substitution then in an attempt to generalize Lehr's result we show that the set M(r) is closed under multiplication by rational numbers. We also show that M(r) is not closed under addition.

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Spolaor, Silvana de Lourdes Gálio. "Números irracionais: e e." Universidade de São Paulo, 2013. http://www.teses.usp.br/teses/disponiveis/55/55136/tde-02102013-160720/.

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Nesta dissertação são apresentadas algumas propriedades de números reais. Descrevemos de maneira breve os conjuntos numéricos N, Z, Q e R e apresentamos demonstrações detalhadas da irracionalidade dos números \'pi\' e e. Também, apresentamos um texto sobre o número e, menos técnico e mais intuitivo, na tentativa de auxiliar o professor no preparo de aulas sobre o número e para alunos do Ensino Médio, bem como, alunos de cursos de Licenciatura em Matemática
In this thesis we present some properties of real numbers. We describe briefly the numerical sets N, Z, Q and R, and we present detailed proofs of irrationality of numbers \'pi\' and e. We also present a text about the number e less technical and more intuitive in an attempt to assist the teacher in preparing lessons about number e for High School students as well as for Teaching degree in Mathematics students

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Books on the topic "Numbus"

1

Schlesinger, Barry M. Numbus 7 Solar Backscatter Ultraviolet (SBUV) spectral scan solar irradiance and earth radiance product user's guide. Greenbelt, Md: Goddard Space Flight Center, 1988.

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Bess, T. Dale. Atlas of wide-field-of-view outgoing longwave radiation derived from Numbus 7 Earth Radiation Budget Data set - November 1978 to October 1985. Hampton, Va: Langley Research Center, 1987.

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Badiou, Alain. Number and numbers. Cambridge: Polity Press, 2008.

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Parshin, A. N. Number Theory IV: Transcendental Numbers. Berlin, Heidelberg: Springer Berlin Heidelberg, 1998.

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Sabbagh, Karl. Dr. Riemann's Zeros: The search for the $1 million solution to the greatest problem in mathematics. London: Atlantic, 2002.

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Walks on ordinals and their characteristics. Basel: Birkhäuser, 2007.

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Rational number theory in the 20th century: From PNT to FLT. London: Springer, 2012.

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Which numbers are real? Washington, D.C: Mathematical Association of America, 2012.

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Sabbagh, Karl. Dr. Riemann's zeroes. London: Atlantic, 2002.

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Sabbagh, Karl. Dr. Riemann's zeros: [the search for the $1 million solution to the greatest problem in mathematics]. London: Atlantic Books, 2003.

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Book chapters on the topic "Numbus"

1

Hart, F. Mary. "Numbers and Number Systems." In Guide to Analysis, 1–24. London: Macmillan Education UK, 1988. http://dx.doi.org/10.1007/978-1-349-09390-8_1.

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Hart, F. Mary. "Numbers and Number Systems." In Guide to Analysis, 3–29. London: Macmillan Education UK, 2001. http://dx.doi.org/10.1007/978-1-349-87194-0_2.

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Pólya, George, and Gabor Szegö. "Complex Numbers and Number Sequences." In Problems and Theorems in Analysis I, 103–13. Berlin, Heidelberg: Springer Berlin Heidelberg, 1998. http://dx.doi.org/10.1007/978-3-642-61983-0_10.

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Hilbert, David. "Algebraic Numbers and Number Fields." In The Theory of Algebraic Number Fields, 3–7. Berlin, Heidelberg: Springer Berlin Heidelberg, 1998. http://dx.doi.org/10.1007/978-3-662-03545-0_1.

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Coppel, W. A. "The Number of Prime Numbers." In Number Theory, 363–98. New York, NY: Springer New York, 2009. http://dx.doi.org/10.1007/978-0-387-89486-7_9.

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Westphal, Laurie E. "Numbers and Number Sense Menus." In Differentiating Instruction With Menus for the Inclusive Classroom Math, 57–101. New York: Routledge, 2021. http://dx.doi.org/10.4324/9781003234265-6.

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Westphal, Laurie E. "Numbers and Number Sense Menus." In Differentiating Instruction With Menus Advanced-Level Menus Grades K-2, 51–82. New York: Routledge, 2021. http://dx.doi.org/10.4324/9781003234494-6.

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Bass, Hyman. "Quantities, Numbers, Number Names and the Real Number Line." In New ICMI Study Series, 465–75. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-63555-2_19.

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Fellows, Michael R., Serge Gaspers, and Frances A. Rosamond. "Parameterizing by the Number of Numbers." In Parameterized and Exact Computation, 123–34. Berlin, Heidelberg: Springer Berlin Heidelberg, 2010. http://dx.doi.org/10.1007/978-3-642-17493-3_13.

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Vorobiew, Nicolai N. "Number-Theoretic Properties of Fibonacci Numbers." In Fibonacci Numbers, 51–87. Basel: Birkhäuser Basel, 2002. http://dx.doi.org/10.1007/978-3-0348-8107-4_3.

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Conference papers on the topic "Numbus"

1

Milinkovic, Luka, Marija Antic, and Zoran Cica. "Pseudo-random number generator based on irrational numbers." In TELSIKS 2011 - 2011 10th International Conference on Telecommunication in Modern Satellite, Cable and Broadcasting Services. IEEE, 2011. http://dx.doi.org/10.1109/telsks.2011.6143212.

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Jeong, Young-Seob, Kyojoong Oh, Chung-Ki Cho, and Ho-Jin Choi. "Pseudo Random Number Generation Using LSTMs and Irrational Numbers." In 2018 IEEE International Conference on Big Data and Smart Computing (BigComp). IEEE, 2018. http://dx.doi.org/10.1109/bigcomp.2018.00091.

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Sirisantisamrid, Kaset. "Identification of Thai characters and numbers on plate number." In 2017 9th International Conference on Information Technology and Electrical Engineering (ICITEE). IEEE, 2017. http://dx.doi.org/10.1109/iciteed.2017.8250447.

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Berthe, Valerie, and Laurent Imbert. "On converting numbers to the double-base number system." In Optical Science and Technology, the SPIE 49th Annual Meeting, edited by Franklin T. Luk. SPIE, 2004. http://dx.doi.org/10.1117/12.558895.

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Kruse, Gerald. ""Magic numbers" approach to introducing binary number representation in CSO." In the 8th annual conference. New York, New York, USA: ACM Press, 2003. http://dx.doi.org/10.1145/961511.961637.

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Zhang, Yunlei, Yuuki Tanaka, and Shugang Wei. "Recoding algorithms for minimal signed-digit numbers in residue number system." In TENCON 2013 - 2013 IEEE Region 10 Conference. IEEE, 2013. http://dx.doi.org/10.1109/tencon.2013.6718910.

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Chervyakov, Nikolay I., Mikhail G. Babenko, Darya S. Konyaeva, Natalya N. Kuchukova, Ekaterina A. Kuchukova, and Natalya G. Gudieva. "Experimental analysis of large prime numbers generation in residue number system." In 2017 International Conference "Quality Management,Transport and Information Security, Information Technologies" (IT&QM&IS). IEEE, 2017. http://dx.doi.org/10.1109/itmqis.2017.8085822.

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Georgieva-Grosse, Mariana Nikolova, and Georgi Nikolov Georgiev. "Theorem for Existence and for the Number of Some Real Numbers." In 2018 Progress in Electromagnetics Research Symposium (PIERS-Toyama). IEEE, 2018. http://dx.doi.org/10.23919/piers.2018.8598211.

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Guessous, Fatima-Ezzahra, and Noureddine Chabini. "Reducing the number of embedded multipliers in squaring large size complex numbers." In 2015 27th International Conference on Microelectronics (ICM). IEEE, 2015. http://dx.doi.org/10.1109/icm.2015.7437978.

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Xiao, Xudong, Jack Edwards, Hassan Hassan, and R. Gaffney. "Role of Turbulent Prandtl Number on Heat Flux at Hypersonic Mach Numbers." In 43rd AIAA Aerospace Sciences Meeting and Exhibit. Reston, Virigina: American Institute of Aeronautics and Astronautics, 2005. http://dx.doi.org/10.2514/6.2005-1098.

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Reports on the topic "Numbus"

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Bailey, David H. A Pseudo-Random Number Generator Based on Normal Numbers. Office of Scientific and Technical Information (OSTI), December 2004. http://dx.doi.org/10.2172/860344.

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Cotton, M., L. Eggert, J. Touch, M. Westerlund, and S. Cheshire. Internet Assigned Numbers Authority (IANA) Procedures for the Management of the Service Name and Transport Protocol Port Number Registry. RFC Editor, August 2011. http://dx.doi.org/10.17487/rfc6335.

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Reynolds, J., and J. Postel. Assigned Numbers. RFC Editor, July 1992. http://dx.doi.org/10.17487/rfc1340.

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Reynolds, J., and J. Postel. Assigned Numbers. RFC Editor, October 1994. http://dx.doi.org/10.17487/rfc1700.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, December 1985. http://dx.doi.org/10.17487/rfc0960.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, November 1986. http://dx.doi.org/10.17487/rfc0990.

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Reynolds, J. K., and J. Postel. Internet numbers. RFC Editor, March 1987. http://dx.doi.org/10.17487/rfc0997.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, May 1987. http://dx.doi.org/10.17487/rfc1010.

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Romano, S., and M. K. Stahl. Internet numbers. RFC Editor, November 1987. http://dx.doi.org/10.17487/rfc1020.

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Reynolds, J. K., and J. Postel. Assigned numbers. RFC Editor, March 1990. http://dx.doi.org/10.17487/rfc1060.

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