Relevant bibliographies by topics / Divisori

Contents

  1. Journal articles
  2. Dissertations / Theses
  3. Books
  4. Book chapters
  5. Conference papers
  6. Reports

Academic literature on the topic 'Divisori'

Author: Grafiati
Published: 21 February 2023

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Journal articles on the topic "Divisori"

1

Mastrelli, Alberto Carlo. "Denominatori, divisori e multipli." Linguistica 31, no. 1 (1991): 291–94. http://dx.doi.org/10.4312/linguistica.31.1.291-294.

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Come è noto in matematica vi sono tre operazioni che consistono nel ricercare il massimo comun divisore, il minimo denominatore comune e il minimo comune multiplo: nella prima operazione si cerca il maggiore fra i multipli comuni a due o più numeri, nella seconda si cerca il minimo multiplo comune dei denomiriatori di due o piu frazioni, nella terza si cerca il piu piccolo tra i numeri divisibili per tutti i numeri dati.
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Salmon, Paolo. "Sui divisori di varieta’ riducibili." Rendiconti del Seminario Matematico e Fisico di Milano 57, no. 1 (1987): 55–61. http://dx.doi.org/10.1007/bf02925042.

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Macrì, Patrizia. "Divisori su uno spazio analitico reale." ANNALI DELL'UNIVERSITA' DI FERRARA 31, no. 1 (1985): 1–10. http://dx.doi.org/10.1007/bf02831755.

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Wang, Xingbo. "Some More New Properties of Consecutive Odd Numbers." Journal of Mathematics Research 9, no. 5 (2017): 61. http://dx.doi.org/10.5539/jmr.v9n5p61.

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The article proves several new properties of consecutive odd integers. The proved properties reveal divisors’ transition by subtracting two terms of an odd sequence, divisors’ stationary with adding or subtracting an item to the terms and pseudo-symmetric distribution of a divisor’s power in an odd sequence. The new properties are helpful for finding a divisor of an odd composite number in an odd sequence.
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Besana, G., and P. Olivotto. "Criteri numerici di molta ampiezza per divisori su alcune superfici algebriche." ANNALI DELL UNIVERSITA DI FERRARA 34, no. 1 (1988): 153–60. http://dx.doi.org/10.1007/bf02824980.

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Boiko, Denys. "Application of Divisors on a Hyperelliptic Curve in Python." Mohyla Mathematical Journal 3 (January 29, 2021): 11–24. http://dx.doi.org/10.18523/2617-70803202011-24.

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The paper studies hyperelliptic curves of the genus g > 1, divisors on them and their applications in Python programming language. The basic necessary definitions and known properties of hyperelliptic curves are demonstrated, as well as the notion of polynomial function, its representation in unique form, also the notion of rational function, norm, degree and conjugate to a polynomial are presented. These facts are needed to calculate the order of points of desirable functions, and thus to quickly and efficiently calculate divisors. The definition of a divisor on a hyperelliptic curve is sh
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Mooney, Christopher Park. "On irreducible divisor graphs in commutative rings with zero-divisors." Tamkang Journal of Mathematics 46, no. 4 (2015): 365–88. http://dx.doi.org/10.5556/j.tkjm.46.2015.1753.

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In this paper, we continue the program initiated by I. Beck's now classical paper concerning zero-divisor graphs of commutative rings. After the success of much research regarding zero-divisor graphs, many authors have turned their attention to studying divisor graphs of non-zero elements in integral domains. This inspired the so called irreducible divisor graph of an integral domain studied by J. Coykendall and J. Maney. Factorization in rings with zero-divisors is considerably more complicated than integral domains and has been widely studied recently. We find that many of the same technique
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Mulay, S. B. "Rings having zero-divisor graphs of small diameter or large girth." Bulletin of the Australian Mathematical Society 72, no. 3 (2005): 481–90. http://dx.doi.org/10.1017/s0004972700035310.

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Let R be a commutative ring possessing (non-zero) zero-divisors. There is a natural graph associated to the set of zero-divisors of R. In this article we present a characterisation of two types of R. Those for which the associated zero-divisor graph has diameter different from 3 and those R for which the associated zero-divisor graph has girth other than 3. Thus, in a sense, for a generic non-domain R the associated zero-divisor graph has diameter 3 as well as girth 3.
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Duarte, Eduardo Ruiz, and Octavio Páez Osuna. "Explicit endomorphism of the Jacobian of a hyperelliptic function field of genus 2 using base field operations." Studia Scientiarum Mathematicarum Hungarica 52, no. 2 (2015): 265–76. http://dx.doi.org/10.1556/012.2015.52.2.1313.

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We present an efficient endomorphism for the Jacobian of a curve C of genus 2 for divisors having a Non disjoint support. This extends the work of Costello and Lauter in [12] who calculated explicit formulæ for divisor doubling and addition of divisors with disjoint support in JF(C) using only base field operations. Explicit formulæ is presented for this third case and a different approach for divisor doubling.
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Lao Hussein Mude, Owino Maurice Oduor, and Ojiema Michael Onyango. "Automorphisms of Zero Divisor Graphs of Square Radical Zero Commutative Unital Finite Rings." JOURNAL OF ADVANCES IN MATHEMATICS 19 (August 24, 2020): 35–39. http://dx.doi.org/10.24297/jam.v19i.8834.

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There has been extensive research on the structure of zero divisors and units of commutative finite rings. However, the classification of such rings via a well-known structure of zero divisors has not been done in general. More specifically, the automorphisms of such classes of rings have not been fully characterized. In this paper, we obtain a more completeillustration of the automorphisms of zero divisor graphs of finite rings in which the product of any zero divisor
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Dissertations / Theses on the topic "Divisori"

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IMBIMBO, MARCO. "Strutture e tecniche di combinazione di potenza per applicazioni spaziali." Doctoral thesis, Università degli Studi di Roma "Tor Vergata", 2009. http://hdl.handle.net/2108/1130.

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Avezzu, Adelisa. "Il teorema di Riemann-Roch." Bachelor's thesis, Alma Mater Studiorum - Università di Bologna, 2014. http://amslaurea.unibo.it/7012/.

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Helmersson, Madeleine. "Annuity Divisors." Thesis, Umeå universitet, Institutionen för matematik och matematisk statistik, 2017. http://urn.kb.se/resolve?urn=urn:nbn:se:umu:diva-138767.

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This paper studies the differences and similarities between the discrete annuity divisor of the income pension compared to the continuous annuity divisor of the premium pension in Sweden. First discrete and continuous annuity divisors are compared and found to be equivalent given the same underlying mortality. The income divisor is based on observed mortality in a period setting while the premium divisor which is based on projected mortality in a cohort setting. The expected performance of the two methods is studied by constructing prediction intervals based on Lee-Carter models with either a
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Apaza, Nuñez Danny Joel. "El Teorema de De Rham-Saito." Pontificia Universidad Católica del Perú, 2014. http://repositorio.pucp.edu.pe/index/handle/123456789/95679.

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The theorem of De Rham-Saito is a generalization of a lemma due to De Rham [3], which was announced and used in [7] by Kyoji Saito, as noproof of this theorem was available, Le Dung Trang encouraged to Saito to publish the proof that can be seen in [8], which indirectly encourages us to detail the proof in this article for the many applications it has,we highlight the Godbillon-Vey algorithm [4]; in the proof of Theorem classical Frobenius given in [2]; in [6] we see some interesting applications, in the proof of Frobenius theorem with singularities [5]. In [1] we givefull details of the proof
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Müller, Fabian. "Effective divisors on moduli spaces of pointed stable curves." Doctoral thesis, Humboldt-Universität zu Berlin, Mathematisch-Naturwissenschaftliche Fakultät II, 2013. http://dx.doi.org/10.18452/16866.

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Diese Arbeit untersucht verschiedene Fragen hinsichtlich der birationalen Geometrie der Modulräume $\Mbar_g$ und $\Mbar_{g,n}$, mit besonderem Augenmerk auf der Berechnung effektiver Divisorklassen. In Kapitel 2 definieren wir für jedes $n$-Tupel ganzer Zahlen $\d$, die sich zu $g-1$ summieren, einen geometrisch bedeutsamen Divisor auf $\Mbar_{g,n}$, der durch Zurückziehen des Thetadivisors einer universellen Jacobi-Varietät mittels einer Abel-Jacobi-Abbildung erhalten wird. Er ist eine Verallgemeinerung verschiedener in der Literatur verwendeten Arten von Divisoren. Wir berechnen d
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Mooney, Christopher Park. "Generalized factorization in commutative rings with zero-divisors." Thesis, The University of Iowa, 2013. http://pqdtopen.proquest.com/#viewpdf?dispub=3595128.

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<p> The study of factorization in integral domains has a long history. Unique factorization domains, like the integers, have been studied extensively for many years. More recently, mathematicians have turned their attention to generalizations of this such as Dedekind domains or other domains which have weaker factorization properties. Many authors have sought to generalize the notion of factorization in domains. One particular method which has encapsulated many of the generalizations into a single study is that of &tau;-factorization, studied extensively by A. Frazier and D.D. Anderson. <
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Smith, Heather Christina. "Zero Divisors among Digraphs." VCU Scholars Compass, 2010. http://scholarscompass.vcu.edu/etd/2120.

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This thesis generalizes to digraphs certain recent results about graphs. There are special digraphs C such that AxC is isomorphic to BxC for some pair of distinct digraphs A and B. Lovasz named these digraphs C zero-divisors and completely characterized their structure. Knowing that all directed cycles are zero-divisors, we focus on the following problem: Given any directed cycle D and any digraph A, enumerate all digraphs B such that AxD is isomorphic to BxD. From our result for cycles, we generalize to an arbitrary zero-divisor C, developing upper and lower bounds for the collection of digra
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Soelberg, Lindsay Jennae. "Finding Torsion-free Groups Which Do Not Have the Unique Product Property." BYU ScholarsArchive, 2018. https://scholarsarchive.byu.edu/etd/6932.

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This thesis discusses the Kaplansky zero divisor conjecture. The conjecture states that a group ring of a torsion-free group over a field has no nonzero zero divisors. There are situations for which this conjecture is known to hold, such as linearly orderable groups, unique product groups, solvable groups, and elementary amenable groups. This paper considers the possibility that the conjecture is false and there is some counterexample in existence. The approach to searching for such a counterexample discussed here is to first find a torsion-free group that has subsets A and B such that AB has
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Valentim, Erivan Sousa. "A divisibilidade no Ensino Fundamental." Universidade Estadual da Paraíba, 2017. http://tede.bc.uepb.edu.br/jspui/handle/tede/2828.

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Submitted by Jean Medeiros (jeanletras@uepb.edu.br) on 2017-07-20T17:14:06Z No. of bitstreams: 1 PDF - Erivan Sousa Valentim.pdf: 10186922 bytes, checksum: ffae32fb65fe99f5c16bf7b416d3008d (MD5)<br>Approved for entry into archive by Secta BC (secta.csu.bc@uepb.edu.br) on 2017-08-29T15:42:48Z (GMT) No. of bitstreams: 1 PDF - Erivan Sousa Valentim.pdf: 10186922 bytes, checksum: ffae32fb65fe99f5c16bf7b416d3008d (MD5)<br>Made available in DSpace on 2017-08-29T15:42:48Z (GMT). No. of bitstreams: 1 PDF - Erivan Sousa Valentim.pdf: 10186922 bytes, checksum: ffae32fb65fe99f5c16bf7b416d3008d (MD5) P
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Torielli, Michele. "Free divisors and their deformations." Thesis, University of Warwick, 2012. http://wrap.warwick.ac.uk/53864/.

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A reduced divisor D = V (f) Cn is free if the sheaf Der(-logD) := f 2 DerCn (f) 2 (f)OCng of logarithmic vector fields is a locally free OCn-module. It is linear if, furthermore, Der(-logD) is globally generated by a basis consisting of vector fields all of whose coefficients, with respect to the standard basis @=@x1;...; @=@xn of the space DerCn of vector fields on Cn, are linear functions. In principle, linear free divisors, like other kinds of singularities, might be expected to appear in non-trivial parameterised families. As part of this thesis, however, we prove that for reductive linear
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Books on the topic "Divisori"

1

Hall, Richard R. Divisors. Cambridge University Press, 1988.

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Gerald, Tenenbaum, ed. Divisors. Cambridge University Press, 1988.

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Hall, R. R. Divisors. Cambridge University Press, 2008.

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Edwards, Harold M. Divisor Theory. Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-0-8176-4977-7.

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Edwards, Harold M. Divisor theory. Birkhäuser, 1990.

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Venturini, Juan C. Herida divisoria: Relatos. Ediciones de la Banda Oriental, 1991.

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Stiles, Gerald J. The force divisor. Rand Corp., 1989.

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Stiles, Gerald. The Force divisor. Rand Corporation, 1989.

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Schlee, Aldyr Garcia. Linha divisória. Melhoramentos, 1988.

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Huckaba, James A. Commutative rings with zero divisors. M. Dekker, 1988.

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Book chapters on the topic "Divisori"

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Bruin, N., and E. V. Flynn. "Rational Divisors in Rational Divisor Classes." In Lecture Notes in Computer Science. Springer Berlin Heidelberg, 2004. http://dx.doi.org/10.1007/978-3-540-24847-7_9.

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Edwards, Harold M. "A Theorem of Polynomial Algebra." In Divisor Theory. Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-0-8176-4977-7_1.

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Edwards, Harold M. "The General Theory." In Divisor Theory. Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-0-8176-4977-7_2.

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Edwards, Harold M. "Applications to Algebraic Number Theory." In Divisor Theory. Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-0-8176-4977-7_3.

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Edwards, Harold M. "Applications to the Theory of Algebraic Curves." In Divisor Theory. Birkhäuser Boston, 1990. http://dx.doi.org/10.1007/978-0-8176-4977-7_4.

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Fulton, William. "Divisors." In Intersection Theory. Springer New York, 1998. http://dx.doi.org/10.1007/978-1-4612-1700-8_3.

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Klivans, Caroline J. "Divisors." In The Mathematics of Chip-firing. Chapman and Hall/CRC, 2018. http://dx.doi.org/10.1201/9781315206899-8.

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Weik, Martin H. "divisor." In Computer Science and Communications Dictionary. Springer US, 2000. http://dx.doi.org/10.1007/1-4020-0613-6_5474.

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Cǎlugǎreanu, Grigore, and Peter Hamburg. "Zero Divisors." In Kluwer Texts in the Mathematical Sciences. Springer Netherlands, 1998. http://dx.doi.org/10.1007/978-94-015-9004-4_20.

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Cǎlugǎreanu, Grigore, and Peter Hamburg. "Zero Divisors." In Kluwer Texts in the Mathematical Sciences. Springer Netherlands, 1998. http://dx.doi.org/10.1007/978-94-015-9004-4_3.

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Conference papers on the topic "Divisori"

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Hackmann, Eva, Claus Lämmerzahl, Alfredo Macias, Claus Lämmerzahl, and Abel Camacho. "Geodesic equation and theta–divisor." In 2007. AIP, 2008. http://dx.doi.org/10.1063/1.2902777.

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Revathi, R., and R. Rajeswari. "On modular multiplicative divisor graphs." In 2013 International Conference on Pattern Recognition, Informatics and Mobile Engineering (PRIME). IEEE, 2013. http://dx.doi.org/10.1109/icprime.2013.6496447.

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Kluesner, John, and Michael Monagan. "Resolving Zero Divisors Using Hensel Lifting." In 2017 19th International Symposium on Symbolic and Numeric Algorithms for Scientific Computing (SYNASC). IEEE, 2017. http://dx.doi.org/10.1109/synasc.2017.00017.

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ALEKSANDROV, A. G. "LOGARITHMIC CONNECTIONS ALONG A FREE DIVISOR." In Proceedings of the 3rd ISAAC Congress. World Scientific Publishing Company, 2003. http://dx.doi.org/10.1142/9789812794253_0080.

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Elele, Aysegul Bayram, and Gulsen Ulucak. "3-zero-divisor hypergraph regarding an ideal." In 2017 7th International Conference on Modeling, Simulation, and Applied Optimization (ICMSAO). IEEE, 2017. http://dx.doi.org/10.1109/icmsao.2017.7934846.

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Akgüneş, Nihat. "Analyzing special parameters over zero-divisor graphs." In NUMERICAL ANALYSIS AND APPLIED MATHEMATICS ICNAAM 2012: International Conference of Numerical Analysis and Applied Mathematics. AIP, 2012. http://dx.doi.org/10.1063/1.4756146.

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Nagasaka, Kosaku. "Parametric Greatest Common Divisors using Comprehensive Gröbner Systems." In ISSAC '17: International Symposium on Symbolic and Algebraic Computation. ACM, 2017. http://dx.doi.org/10.1145/3087604.3087621.

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Chang, M. C., and Z. Ran. "DIVISORS ON $\bar M_g $ AND THE COSMOLOGICAL CONSTANT." In Proceedings of the Conference on Mathematical Aspects of String Theory. WORLD SCIENTIFIC, 1987. http://dx.doi.org/10.1142/9789812798411_0019.

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Jia, Peiyan, Haishun Du, Yong Jin, and Zhang Fan. "Bidirectional two-dimensional algorithm based on Divisor method." In 2012 IEEE International Conference on Signal Processing, Communications and Computing (ICSPCC). IEEE, 2012. http://dx.doi.org/10.1109/icspcc.2012.6335720.

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Mansour, Y., B. Schieber, and P. Tiwari. "Lower bounds for integer greatest common divisor computations." In [Proceedings 1988] 29th Annual Symposium on Foundations of Computer Science. IEEE, 1988. http://dx.doi.org/10.1109/sfcs.1988.21921.

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Reports on the topic "Divisori"

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Lodder, Jerry, David Pengelley, and Desh Ranjan. Euclid's Algorithm for the Greatest Common Divisor. The MAA Mathematical Sciences Digital Library, 2013. http://dx.doi.org/10.4169/loci003985.

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Liu, Xiu, and Xuanlong Ma. The Order Divisor Graph of a Finite Group. "Prof. Marin Drinov" Publishing House of Bulgarian Academy of Sciences, 2020. http://dx.doi.org/10.7546/crabs.2020.03.06.

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DAI, YANG, ALEXEY B. BORISOV, KEITH BOYER, and CHARLES K. RHODES. Determination of Supersymmetric Particle Masses and Attributes with Genetic Divisors. Office of Scientific and Technical Information (OSTI), 2001. http://dx.doi.org/10.2172/782713.

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Zhai, Liangliang, and Xuanlong Ma. Perfect Codes in Proper Order Divisor Graphs of Finite Groups. "Prof. Marin Drinov" Publishing House of Bulgarian Academy of Sciences, 2020. http://dx.doi.org/10.7546/crabs.2020.12.04.

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DAI, YANG, ALEXEY B. BORISOV, KEITH BOYER, and CHARLES K. RHODES. A p-Adic Metric for Particle Mass Scale Organization with Genetic Divisors. Office of Scientific and Technical Information (OSTI), 2001. http://dx.doi.org/10.2172/791885.

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Schneider, D. EBIT - Electronic Beam Ion Trap: N Divison experimental physics annual report 1995. Office of Scientific and Technical Information (OSTI), 1996. http://dx.doi.org/10.2172/464501.

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SGC, Servicio Geológico Colombiano. Mapa Geomorfológico aplicado a movimientos en masa escala 1:100.000. Plancha 325 El Diviso. Producto. Servicio Geológico Colombiano, 2015. http://dx.doi.org/10.32685/4.7.2015.767.

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SGC, Servicio Geológico Colombiano. Zonificación de la susceptibilidad y la amenaza relativa por movimientos en masa escala 1:100.000. Plancha 325 El Diviso. Producto. Servicio Geológico Colombiano, 2015. http://dx.doi.org/10.32685/4.7.2015.776.

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Blodgett, R. B., E. S. Finzel, R. R. Reifenstuhl, K. H. Clautice, K. D. Ridgway, and R. J. Gillis. Jurassic through Pliocene age megafossil samples collected in 2005 by the Alaska Divison of Geological & Geophysical Surveys from the Bristol Bay-Port Moller area, Alaska Peninsula. Alaska Division of Geological & Geophysical Surveys, 2008. http://dx.doi.org/10.14509/16501.

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SGC, Servicio Geológico Colombiano. Elaboración de la cartografía geológica de un conjunto de planchas escala 1:100.000 ubicadas en cuatro bloques del Territorio Nacional identificados por el Servicio Geológico Colombiano Grupo 2: Zonas Sur A y Sur B. Contrato 512 de 2013. Geología de la Plancha 325 El Diviso. Escala 1:100.000. Versión año 2015. Producto. Servicio Geológico Colombiano, 2015. http://dx.doi.org/10.32685/10.143.2015.499.

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