Framing Cyclic Revolutionary Emergence of Opposing Symbols of Identity

---

Framing Cyclic Revolutionary Emergence of Opposing Symbols of Identity (Non-Kairos references)

[Parts: First | All] [Links: To-K | From-K | From-Kx ]

---

Béziau, Jean-Yves.  Around and Beyond the Square of Opposition. Springer, 2012.

Béziau, Jean-Yves / Basti, Gianfranco.  The Square of Opposition: a cornerstone of thought. Birkhäuser, 2017.

Beer, Stafford.  Beyond Dispute: the invention of team syntegrity. Wiley, 1994.

Bennett, John G.  The Dramatic Universe: search for a unified vision of reality, Coombe Springs Press, 1956.

Berger, Peter L. / Luckmann, Thomas.  The Social Construction of Reality. Anchor, 1966.

Blake, Anthony G. E.  The Intelligent Enneagram. Shambhala, 1996.

Blanché, R.  Sur l'opposition des concepts. Theoria, 19, 1953..

Blanché, R.  Structures intellectuelles: essai sur l'organisation systématique des concepts.Vrin, 1966..

Blanché, R.  Raison et discours: défense de la logique réflexive. Vrin, 1967..

Carayannis, Elias / Campbell, David F. J.  Triple Helix, Quadruple Helix and Quintuple Helix and How Do Knowledge, Innovation and the Environment Relate To Each Other?. International Journal of Social Ecology and Sustainable Development, 1, 2012, 1, pp. 41-69. [abstract]

Chaitin, G. J.  Meta Math!. The Quest for Omega. Vintage, 2006. [text]

Chatti, Saloua / Schang, Fabien.  The Cube, the Square and the Problem of Existential Import. History and Philosophy of Logic, 34, 2013, 2, pp. 101-132. [abstract]

Clark, G.  New light on Peirce's iconic notation for the sixteen binary connectives. Paper presented at the Sesquicentennial Congress at Harvard University. 1989.

Deacon, Terrence W.  What's Missing from Theories of Information? In: Paul Davies and Niels Henrik Gregersen (Eds.), Information and the Nature of Reality: From Physics to Metaphysics. Cambridge University Press, 2010, pp. 146-169. [text]

Deacon, Terrence W.  Incomplete Nature: how mind emerged from matter. W. W. Norton, 2011.

Demey, Lorenz / Smessaert, Hans.  Logical and Geometrical Distance in Polyhedral Aristotelian Diagrams in Knowledge Representation. Symmetry, 2017. [text]

Demey, Lorenz / Smessaert, Hans.  Metalogical Decorations of Logical Diagrams. Logica Universalis, 10, 2016, pp. 233-292..

Dennis, Lynnclaire / McNair, Jytte Brender / Kauffman, Louis H.  (Eds.).    The Mereon Matrix: unity, perspective and paradox. Newnes, 2013.

Du, Guoping / Wang, Hongguang / Shen, Jie.  Oppositional Logic. In: He X., Horty J., Pacuit E. (Eds.)., Logic, Rationality and Interaction. LORI 2009. Lecture Notes in Computer Science, 5834, 2009.. [abstract]

Edmondson, Amy C.  A Fuller Explanation: the synergetic geometry of R. Buckminster Fuller. Springer, 2012.

Edmondson, Amy C.  Cosmic Railroad Tracks: Great Circles. In: A Fuller Explanation. Design Science Collection. Birkhäuser Boston, 1987. [abstract]

Fuller, R. Buckminster.  Synergetics: Explorations in the Geometry of Thinking. Macmillan, 1975.

Goonatilake, Susantha.  Toward a Global Science: mining civilizational knowledge. Indiana University Press, 1999.

Kauffman, Louis H.  The Mathematics of Charles Sanders Peirce. Cybernetics and Human Knowing, 8, 2001, 1-2, pp. 79-110. [text]

Lakoff, George / Núñez, Rafael E.  Where Mathematics Comes From: how the embodied mind brings mathematics into being. Basic Books, 2001.

Luzeaux, Dominique / Sallantin, Jean / Dartnell, Christopher.  Logical Extensions of Aristotle's Square. Logica Universalis, 2, 2008, 1, pp. 167-187. [abstract]

McClain, Ernest G.  The Pythagorean Plato: prelude to the song itself. Nicolas-Hays, 1978.

McClain, Ernest G.  The Myth of Invariance: the origins of the Gods, Mathematics and Music from the Rg Veda to Plato. Nicolas-Hays, 1976.

Moretti, A.  "Arrow-Hexagons". In: Buchsbaum A. and Koslow A. (Eds.), The Road to Universal Logic - Vol. II, Birkhäuser, Basel, 2015. [text]

Moretti, A.  Was Lewis Carroll an Amazing Oppositional Geometer?. History and Philosophy of Logic, 35, 4, 2014. [abstract]

Moretti, A.  The Geometry of Logical Opposition. Université de Neuchâtel, 2009.

Moretti, A.  The Geometry of Standard Deontic Logic. Logica Universalis 2009, 3, pp. 19-57..

Moretti, A.  Why the Logical Hexagon?", Logica Universalis, 6 (1-2), 2012.

Mushakoji, Kinhide.  Global Issues and Interparadigmatic Dialogue: essays on multipolar politics. Albert Meynier, 1988.

Mushakoji, Kinhide.  Scientific Revolution and Inter-paradigmatic Dialogue. United Nations University, 1979. [text]

Pellissier, R.  Setting n-opposition. Logica Universalis, 2, 2, 2008 (pre-final draft). [text]

Popko, Edward S.  Divided Spheres: geodesics and the orderly subdivision of the sphere. CRC Press, 2012.

Sauriol, Pierre.  Remarques sur la Théorie de l'hexagone logique de Blanché. Dialogue, 7, 1968, pp. 374-390..

Sauriol, Pierre.  La structure tétrahexaédrique du systéme complet des propositions catégoriques. Dialogue, 15, 1976..

Schmeikal, Bernd.  The Emergence of Orientation and the Geometry of Logic. Quality and Quantity, 32, 1998, pp. 119-154. [abstract]

Smessaert, Hans / Demey, Lorenz.  Visualising the Boolean Algebra B4 in 3D. In: Diagrammatic Representation and Inference, Springer, 2016; pp. 289-292. [abstract]

Smessaert, Hans.  On the 3D Visualisation of Logical Relations. Logica Universalis, 3, 2009, pp. 303-332. [abstract]

Smessaert, Hans.  The Classical Aristotelian Hexagon Versus the Modern Duality Hexagon. Logica Universalis, 6, 2012, 1-2, pp. 171-199. [abstract]

Thom, René.  Structural Stability and Morphogenesis: an outline of a general theory of models. W. A. Benjamin, 1972. [text]

Thompson, William I.  Pacific Shift. Random House, 1986.

Thompson, William I.  From Nation to Emanation: Planetary Culture and World Governance. HarperCollins, 1982.

Warren, William H. / Rothman, Daniel B. / Schnapp, Benjamin H. / Ericson, Jonathan D.  Wormholes in Virtual Space: from cognitive maps to cognitive graphs. Cognition, 166, 2017, pp. 152-163. [text]

Young, Arthur M.  The Geometry of Meaning. Delacorte Press, 1976.

Zellweger, Shea.  Untapped potential in Peirce's iconic notation for the sixteen binary connectives. In: N. Hauser, et al (Eds), Studies in the Logic of Charles Peirce, Indiana University Press, 1997, pp. 334-386.

Zellweger, Shea.  Notation, Relational Iconicity, and Rethinking the Propositional Calculus. 8th International Congress of Logic, Methodology and Philosophy of Science. Moscow, 1987..