Letteratura scientifica selezionata sul tema "Leibniz"
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Articoli di riviste sul tema "Leibniz"
Liu, Linlin, e Shuanhong Wang. "The construction of Hom-Leibniz H-pseudoalgebras". Filomat 36, n. 8 (2022): 2617–36. http://dx.doi.org/10.2298/fil2208617l.
Testo completoDella Rocca, Michael. "A New Defense of the Principle of Sufficient Reason". Journal of Philosophy 120, n. 4 (2023): 220–27. http://dx.doi.org/10.5840/jphil202312049.
Testo completoLodge, Paul. "Leibniz’s Philosophical Dream of Rational and Intuitive Enlightenment". Dialogue and Universalism 32, n. 1 (2022): 203–19. http://dx.doi.org/10.5840/du202232112.
Testo completoMovahedi, Hamed. "A Deleuzian Dialogue between Leibniz and Ruyer: Monads, Absolute Survey and Life". Deleuze and Guattari Studies 18, n. 2 (maggio 2024): 246–76. http://dx.doi.org/10.3366/dlgs.2024.0553.
Testo completoWerther, David. "Leibniz and the Possibility of God's Existence". Religious Studies 32, n. 1 (marzo 1996): 37–48. http://dx.doi.org/10.1017/s0034412500024057.
Testo completoZARIŅŠ, VALTERS. "FREEDOM AS THE MAIN PROBLEM OF PHILOSOPHY GÜNTHER NEUMANN DER FREIHEITSBEGRIFF BEI GOTTFRIED WILHELM LEIBNIZ UND MARTIN HEIDEGGER. PHILOSOPHISCHE SCHRIFTEN, BAND 9. Berlin: Duncker & Humblot, 2019 ISBN 978-3-428-15537-8 HEIDEGGER UND LEIBNIZ. MIT EINEM GELEITWORT VON FRIEDRICH-WILHELM VON HERRMANN (DAS DENKEN MARTIN HEIDEGGERS II 2 HRSG. VON HANS-CHRISTIAN GÜNTHER). Traugott Bautz Verlag, Nordhausen, 2020 ISBN 978-3-95948-493-0". HORIZON / Fenomenologicheskie issledovanija/ STUDIEN ZUR PHÄNOMENOLOGIE / STUDIES IN PHENOMENOLOGY / ÉTUDES PHÉNOMÉNOLOGIQUES 10, n. 1 (2021): 305–11. http://dx.doi.org/10.21638/2226-5260-2021-10-1-305-311.
Testo completoGarber, Daniel. "Leibniz On Form and Matter". Early Science and Medicine 2, n. 3 (1997): 326–51. http://dx.doi.org/10.1163/157338297x00177.
Testo completoKrivenko, Ekaterina Yahyaoui. "Space, Law, and Justice in Leibniz: Leibniz as a Theorist of Spatial Justice". Law and History Review 36, n. 4 (10 settembre 2018): 891–914. http://dx.doi.org/10.1017/s0738248018000391.
Testo completoSolomon, Graham. "Leibniz and Topological Equivalence". Dialogue 32, n. 4 (1993): 721–24. http://dx.doi.org/10.1017/s0012217300011355.
Testo completoMalek, Abdul. "KEPLER – NEWTON – LEIBNIZ – HEGEL". JOURNAL OF ADVANCES IN PHYSICS 19 (15 settembre 2021): 221–23. http://dx.doi.org/10.24297/jap.v19i.9106.
Testo completoTesi sul tema "Leibniz"
Hogan, Adam D. "Leibniz Did Not State Leibniz's Law". Ohio University / OhioLINK, 2014. http://rave.ohiolink.edu/etdc/view?acc_num=ohiou1397054389.
Testo completoPoças, Jacinta Rodrigues. "Leibniz hierarchy". Master's thesis, Universidade de Aveiro, 2009. http://hdl.handle.net/10773/2916.
Testo completoA Lógica Algébrica Abstracta estuda o processo pelo qual uma classe de álgebras pode ser associada a uma lógica. Nesta dissertação, analisamos este processo agrupando lógicas partilhando certas propriedades em classes. O conceito central neste estudo é a congruência de Leibniz que assume o papel desempenhado pela equivalência no processo tradicional de Lindenbaum- Tarski. Apresentamos uma hierarquia entre essas classes que é designada por hierarquia de Leibniz, caracterizando as lógicas de cada classe por propriedades meta-lógicas, por exemplo propriedades do operador de Leibniz. Estudamos também a recente abordagem comportamental que usa lógicas multigénero, lógica equacional comportamental e, consequentemente, uma versão comportamental do operador de Leibniz. Neste contexto, apresentamos alguns exemplos, aos quais aplicamos esta nova teoria, capturando alguns fenómenos de algebrização que não era possível formalizar com a abordagem standard. ABSTRACT: Abstract Algebraic logic studies the process by which a class of algebras can be associated with a logic. In this dissertation, we analyse this process by grouping logics sharing certain properties into classes. The central concept in this study is the Leibniz Congruence that assumes the role developed by the equivalence in the traditional Lindenbaum-Tarski process. We show a hierarchy between these classes, designated by Leibniz hierarchy, by characterizing logics in each class by meta-logical properties, for example properties of the Leibniz operator. We also study a recent behavioral approach which uses many-sorted logics, behavioral equational logic and, consequently, a behavioral version of the Leibniz operator. In this context, we provide some examples, to which we apply this new theory, capturing some phenomena of algebraization that are not possible to formalize using the standard approach.
Oudom, Jean-Michel. "Cogèbres de Leibniz duales et homologie des algèbres de Leibniz". Montpellier 2, 1997. http://www.theses.fr/1997MON20015.
Testo completoDavillé, Louis. "Leibniz historien : essai sur l'activité et la méthode historiques de Leibniz /". Darmstatd : Scientia Verlag AAlen, 1986. http://catalogue.bnf.fr/ark:/12148/cb37472128m.
Testo completoSchneider, Ulrich Johannes. "Leibniz und der Eklektizismus". Universitätsbibliothek Leipzig, 2014. http://nbn-resolving.de/urn:nbn:de:bsz:15-qucosa-149007.
Testo completoLacerda, Tessa Moura. "A expressão em Leibniz". Universidade de São Paulo, 2006. http://www.teses.usp.br/teses/disponiveis/8/8133/tde-30012008-112330/.
Testo completoExpression is one of the most important notions of Leibniz\'s philosophy. The philosopher addresses it directly in some texts, however, more than an object of analysis, the notion of expression organizes and makes reflections about Leibnizian theology, ontology and epistemology converge. Leibniz is not the first to deal with expression; the originality of his approach lies in a mathematical interpretation of expression, which makes it possible to define it as an analogy of relations between expression and expresser. One thing expresses another, says Leibniz, when there is a regular and reciprocal correspondence between the two, or between what can be said of one and the other. Accordingly, expression presupposes analogy and harmony. Having defined the relation of expression in these terms, it is possible, at the theological or metaphysical level, to explain how God expresses himself in simple, absolute and infinite forms, which express themselves in general systems of phenomena or possible worlds, which are expressed in individual notions and do not exist outside them. At the ontological level, we shall say that individuals express God as a cause and the world which they are part of. These individuals, in turn, express themselves as phenomena that are unified by tho ught as bodies. The relation that defines the bodies and the relation between bodies express the ideal relations that individual substances maintain amongst themselves, the physical order expresses the metaphysical order. At the epistemological level, we shall say that our ideas express the ideas of God; we agree with God in the same relations. But to know these relations, the present expression in an idea has to be developed. The classification of ideas in Leibniz presupposes this progressive development that takes place as a gradual analysis: the ideas may be obscure or clear, these ones confused or distinct, these ones inadequate or adequate, and the adequate ideas may be the object of a blind or symbolic knowledge and of an intuitive knowledge, very rare. The scope of the notion of expression makes it possible to put heterogeneous orders into a relation and to show the convergence and similarity of different things. In this measure, we can relate such different things as characters and thoughts, hence Leibniz\'s quest for a universal language or Characteristic.
Schneider, Ulrich Johannes. "Leibniz’ Revolution des Bibliothekskatalogs". SLUB Dresden, 2016. https://slub.qucosa.de/id/qucosa%3A7776.
Testo completoSchneider, Ulrich Johannes. "Leibniz und der Eklektizismus". de Gruyter, 2002. https://ul.qucosa.de/id/qucosa%3A12761.
Testo completoPlanas-Bielsa, Victor. "Leibniz manifolds and Lyapunov". Nice, 2004. http://www.theses.fr/2004NICE4027.
Testo completoThe first part of this thesis shows that various relevant dynamical system scan be described as vector fields associated to smooth functions vi a bracket that defines what we call a Leibniz structure. Several examples can be described using this construction that generalises the standard Poisson brackets. The symmetries of these systems and the associated reduction in Leibniz and almost Poisson manifolds are described in detail. The second part of this thesis includes results centred around the nonlinear stability of equilibrium in Poisson dynamical systems. We prove an energy-Casimir type sufficient condition for stability that uses function (not necessary conserved) that takes into account certain asymptotically stable behaviour that may occur in the Poisson category. We discussed also two situations in which the use of Casimir functions in stability is equivalent to the topological methods introduced by Patrick et al
Feeney, Thomas D. "Leibniz on Metaphysical Perfection". Thesis, Yale University, 2017. http://pqdtopen.proquest.com/#viewpdf?dispub=10584944.
Testo completoLeibniz makes substantive use of harmony and metaphysical perfection, but he very rarely offers more than a brief gloss in direct explanation of these terms. I argue that they name the same fundamental property. The definition of metaphysical perfection (hereafter, "perfection") as unity-in-variety misleads if taken as a reduction of perfection to separately necessary and jointly sufficient conditions for anything to enjoy perfection. The definition of harmony in terms of intelligibility leads to the same underlying notion, for intelligibility is defined in terms of unity and variety.
Chapter 1 introduces the tension between Leibniz's substantive use of perfection and his demand that it meet a high standard of intelligibility. Chapter 2 argues that there is no satisfactory account of compossibility in the literature because each of the viable proposals misunderstands the role of perfection. The current dispute rests in a disagreement about the best reductive account of perfection: either to sheer variety, or to variety and unity as independently intelligible but inversely proportional criteria for perfection. Either way, incompossibility relations become externally applied limits on God's will to maximize the variety of existing substances. Leibniz rejects all such external limits. I propose a new solution, in which two possibles are compossible if and only if they are jointly thinkable, that is, if they are members of an ideal unity. This involves a distinction between the variety that does contribute to unity and the variety that does not—and this distinction requires that we already have some notion of perfection prior to the appeal to variety.
Chapter 3 develops this account of perfection and incompossibility further, by introducing another puzzle God aims to create the most perfect world, but worlds are aggregates and aggregates seem to rank too low in Leibniz's ontology to explain God's aim. What is the world that God would care for it? God, being wise, does not and would not will multiple times in creating. Rather, God creates multiple substances through a single act of will. Acts of creative will, though, are individuated by the agent's concept of the object. This suggests that groups of substances are unified into worlds by God's intellect thinking of their many essences under a single idea. This is Leibniz's limited Spinozism: he is a metaphysical atomist about existing things, but a holist about the ideal and its value.
Chapters 4 and 5 tell the story of how Leibniz came to these views. The narrative is helpful in part because it sheds some light on Leibniz's motivations. Also, I argue that the mistakes common to recent approaches to compossibility have textual support only from premature versions of Leibniz's account of perfection, versions Leibniz rejected in part because they generate the problems discussed in Chapters 2 and 3.
Chapter 4 explores Leibniz's transition to philosophical maturity in the later 167os. He gave priority to the divine intellect throughout his career, but in the Paris Period, he left no work for the will at all: to exist is to be harmonious, and the existence of finite things depends directly on the divine intellect. This theory had theodicean advantages, but it also led to a necessitarianism just as absolute as Spinoza's. After studying Spinoza and leaving Paris, Leibniz placed the divine will between existence and harmony, or perfection. Perfection and harmony were now associated with God's ideas; coming to exist required, in addition, an act of God's will.
Having associated harmony with the possibles in God's mind, Leibniz now needed to explain why God does not maximize perfection by creating every substance. Chapter 5 deals with the gradual development after 1678, as Leibniz worked out how to determine the joint value of many independent substances. Just as previously he had separated existence from harmony while retaining a close connection between the two, the mature Leibniz distinguished harmony from the possible substances in God's mind. Harmony and perfection, on this final account, belong even to aggregates, which count as unities thanks only to their relation to a mind. With this in hand, Leibniz was finally in a position to argue that God leaves some possibles uncreated in order the maximize the perfection of what God does create.
Leibniz defended his commitment to a harmoniously limited, intelligible world by gradually distinguishing perfection from existence and from substantiality. Likewise, we profit by distinguishing Leibnizian perfection from (apparently) more accessible notions.
Libri sul tema "Leibniz"
Jolley, Nicholas. Leibniz. second edition. | New York: Routledge, 2019. |: Routledge, 2019. http://dx.doi.org/10.4324/9780429422775.
Testo completoBouveresse, Renée. Leibniz. Paris: Presses universitaires de France, 1994.
Cerca il testo completoLeibniz. New York, NY: Routledge, 2005.
Cerca il testo completoRateau, Paul. Leibniz. Strasbourg: Université Marc Bloch, 2004.
Cerca il testo completoJolley, Nicholas. Leibniz. London: Routledge, 2005.
Cerca il testo completo1951-, Wilson Catherine, a cura di. Leibniz. Aldershot, Hants, England: Dartmouth, Ashgate ; Burlington, Vt., 2001.
Cerca il testo completoRoss, G. MacDonald. Leibniz. Rotterdam: Lemniscaat, 2001.
Cerca il testo completoLeibniz. Cambridge, UK: Polity Press, 2014.
Cerca il testo completoname, No. On Leibniz. Pittsburgh, PA: University of Pittsburgh Press, 2003.
Cerca il testo completoRescher, Nicholas. On Leibniz. Pittsburgh, Pa: University of Pittsburgh Press, 2013.
Cerca il testo completoCapitoli di libri sul tema "Leibniz"
Anglin, W. S., e J. Lambek. "Leibniz". In The Heritage of Thales, 159–62. New York, NY: Springer New York, 1995. http://dx.doi.org/10.1007/978-1-4612-0803-7_30.
Testo completoAnglin, W. S. "Leibniz". In Mathematics: A Concise History and Philosophy, 181–84. New York, NY: Springer New York, 1994. http://dx.doi.org/10.1007/978-1-4612-0875-4_31.
Testo completoSeager, William. "Leibniz". In A Companion to the Philosophy of Science, 224–28. Oxford, UK: Blackwell Publishers Ltd, 2017. http://dx.doi.org/10.1002/9781405164481.ch34.
Testo completoMerchant, Carolyn. "Leibniz*". In Science and Nature, 68–87. New York, NY : Routledge, 2017.: Routledge, 2017. http://dx.doi.org/10.4324/9781315111988-7.
Testo completoLook, Brandon C. "Kant’s Leibniz". In Leibniz and Kant, 1–26. Oxford University Press, 2021. http://dx.doi.org/10.1093/oso/9780199606368.003.0001.
Testo completoTissandier, Alex. "Leibniz and Expression". In Affirming Divergence, 40–57. Edinburgh University Press, 2018. http://dx.doi.org/10.3366/edinburgh/9781474417747.003.0003.
Testo completoRutherford, Donald. "Leibniz as Idealist". In Oxford Studies In Early Modern Philosophy, 141–90. Oxford University PressOxford, 2008. http://dx.doi.org/10.1093/oso/9780199550401.003.0005.
Testo completoNewlands, Samuel. "Leibniz on Modality". In Modality, 118–43. Oxford University PressNew York, 2024. http://dx.doi.org/10.1093/oso/9780190089856.003.0006.
Testo completoRodriguez-Pereyra, Gonzalo. "Leibniz". In The Routledge Companion to Metaphysics, 109–18. Routledge, 2009. http://dx.doi.org/10.4324/9780203879306-13.
Testo completoBrown, Gregory. "Leibniz". In The Cambridge History of Moral Philosophy, 268–82. Cambridge University Press, 2017. http://dx.doi.org/10.1017/9781139519267.022.
Testo completoAtti di convegni sul tema "Leibniz"
Wu, Zhixiang. "Leibniz conformal algebras of rank three". In The Eighth China–Japan–Korea International Symposium on Ring Theory. WORLD SCIENTIFIC, 2021. http://dx.doi.org/10.1142/9789811230295_0014.
Testo completoWADE, AISSA. "ON SOME PROPERTIES OF LEIBNIZ ALGEBROIDS". In Infinite Dimensional Lie Groups in Geometry and Representation Theory. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812777089_0005.
Testo completoRikhsiboev, Ikrom M., e Isamiddin S. Rakhimov. "Classification of three dimensional complex Leibniz algebras". In THE 5TH INTERNATIONAL CONFERENCE ON RESEARCH AND EDUCATION IN MATHEMATICS: ICREM5. AIP, 2012. http://dx.doi.org/10.1063/1.4724168.
Testo completoHu, Naihong, Dong Liu e Linsheng Zhu. "Leibniz Superalgebras Graded by Finite Root Systems". In Proceedings of the International Conference. WORLD SCIENTIFIC, 2012. http://dx.doi.org/10.1142/9789814365123_0003.
Testo completoAlmutari, Hassan, e Abd Ghafur Ahmad. "Quasi-centroids of four dimensional Leibniz algebras". In THE 2018 UKM FST POSTGRADUATE COLLOQUIUM: Proceedings of the Universiti Kebangsaan Malaysia, Faculty of Science and Technology 2018 Postgraduate Colloquium. AIP Publishing, 2019. http://dx.doi.org/10.1063/1.5111215.
Testo completoSo, Hiroto. "Leibniz rule, locality and supersymmetry on lattice". In The 30th International Symposium on Lattice Field Theory. Trieste, Italy: Sissa Medialab, 2012. http://dx.doi.org/10.22323/1.164.0231.
Testo completoHolland, L. "REID’S CRITIQUE OF LEIBNIZ NOTION OF FREE AGENCY". In 2nd International Academic Conference on Humanities and Social Science. Acavent, 2019. http://dx.doi.org/10.33422/2iachss.2019.02.52.
Testo completoKasim, Suzila Mohd, Isamiddin S. Rakhimov e Sharifah Kartini Said Husain. "Isomorphism classes of 10-dimensional filiform Leibniz algebras". In PROCEEDINGS OF THE 3RD INTERNATIONAL CONFERENCE ON MATHEMATICAL SCIENCES. AIP Publishing LLC, 2014. http://dx.doi.org/10.1063/1.4882563.
Testo completoHusain, Sh K. Said, I. S. Rakhimov e W. Basri. "Centroids and derivations of low-dimensional Leibniz algebra". In PROCEEDINGS OF THE 24TH NATIONAL SYMPOSIUM ON MATHEMATICAL SCIENCES: Mathematical Sciences Exploration for the Universal Preservation. Author(s), 2017. http://dx.doi.org/10.1063/1.4995838.
Testo completoBusch, Steffen, Christian Koetsier, Jeldrik Axmann e Claus Brenner. "LUMPI: The Leibniz University Multi-Perspective Intersection Dataset". In 2022 IEEE Intelligent Vehicles Symposium (IV). IEEE, 2022. http://dx.doi.org/10.1109/iv51971.2022.9827157.
Testo completoRapporti di organizzazioni sul tema "Leibniz"
Pradilla, Magdalena, John Alexander Rico Franco e Evelyn Garnica Estrada. El cálculo y las máquinas para calcular de Leibniz, Boole y Babbage. Corporación Universitaria Republicana, ottobre 2020. http://dx.doi.org/10.21017/cont.virt.2020.s1.
Testo completoSilberstein, Marian. Application of a Generalized Leibniz Rule for Calculating Electromagnetic Fields within Continuous Source Regions. Fort Belvoir, VA: Defense Technical Information Center, gennaio 1989. http://dx.doi.org/10.21236/ada212470.
Testo completoSchreiber, Verena. Lokale Präventionsgremien in Deutschland. Goethe-Universität, Institut für Humangeographie, maggio 2007. http://dx.doi.org/10.21248/gups.1092.
Testo completoJohnson, Joshua B., J. Edward Gates e W. Mark Ford. Notes on foraging activity of female Myotis leibii in Maryland. Newtown Square, PA: U.S. Department of Agriculture, Forest Service, Northern Research Station, 2009. http://dx.doi.org/10.2737/nrs-rp-8.
Testo completoRoby, Piper, Andrew Taylor, Gregg Janos e Will Seiter. New River Gorge Cliff Line Bat Inventory Survey. National Park Service, 2024. http://dx.doi.org/10.36967/2303814.
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