A phenomenological calculus for anisotropic systems
Axiomathes 16 (1-2) (2006)
| Abstract | The phenomenological calculus is a relational paradigm for complex systems, closely related in substance and spirit to Robert Rosen’s own approach. Its mathematical language is multilinear algebra. The epistemological exploration continues in this paper, with the expansion of the phenomenological calculus into the realm of anisotropy. | |||||||||
| Keywords | No keywords specified (fix it) | |||||||||
| Categories | No categories specified (fix it) | |||||||||
| Options |
|
|||||||||
Download options| PhilPapers Archive |
Upload a copy of this paper Check publisher's policy on self-archival Papers currently archived: 5,679 |
| External links |
 |
| Through your library | Configure |
Similar books and articlesMakoto Kanazawa (1992). The Lambek Calculus Enriched with Additional Connectives. Journal of Logic, Language and Information 1 (2).
Dov M. Gabbay (1976). On Kreisel's Notion of Validity in Post Systems. Studia Logica 35 (3):285 - 295.
Wojciech Buszkowski (1996). The Finite Model Property for BCI and Related Systems. Studia Logica 57 (2-3):303 - 323.
Maria Luisa Bonet & Samuel R. Buss (1993). The Deduction Rule and Linear and Near-Linear Proof Simulations. Journal of Symbolic Logic 58 (2):688-709.
Wojciech Zielonka (2002). On Reduction Systems Equivalent to the Lambek Calculus with the Empty String. Studia Logica 71 (1):31-46.
Henk Barendregt, Martin Bunder & Wil Dekkers (1993). Systems of Illative Combinatory Logic Complete for First-Order Propositional and Predicate Calculus. Journal of Symbolic Logic 58 (3):769-788.
Andreja Prijatelj (1992). Lambek Calculus with Restricted Contraction and Expansion. Studia Logica 51 (1):125 - 143.
Analytics
Monthly downloads |
Added to index2009-01-28Total downloads19 ( #64,378 of 549,087 )Recent downloads (6 months)1 ( #63,317 of 549,087 )How can I increase my downloads? |
My notes
Discussion
