Universal logic
Universal logic is the field of logic that studies the common features of all logical systems, aiming to be to logic what universal algebra is to algebra. A number of approaches to universal logic have been proposed since the twentieth century, using model theoretic, and categorical approaches.
Development
The roots of universal logic may go as far back as some work of Alfred Tarski in the early twentieth century, but the modern notion was first presented in the 1990s by Swiss logician Jean-Yves Béziau.[1][2] The term 'universal logic' has also been separately used by logicians such as Richard Sylvan and Ross Brady to refer to a new type of (weak) relevant logic.[3]
In the context defined by Béziau, three main approaches to universal logic have been explored in depth:[4]
- An abstract model theory system axiomatized by Jon Barwise,[5]
- a topological/categorical approach based on sketches (sometimes called categorical model theory),[6]
- a categorical approach originating in Computer Science based on Goguen and Burstall's notion of institution.[7]
While logic has been studied for centuries, Mossakowski et al commented in 2007 that "it is embarrassing that there is no widely acceptable formal definition of “a logic”.[8] These approaches to universal logic thus aim to address and formalize the nature of what may be called 'logic' as a form of "sound reasoning".[8]
World Congresses and Schools on Universal Logic
Since 2007, Béziau has been organizing world congresses and schools on universal logic. These events bring together hundreds of researchers and students in the field and offer tutorials and research talks on a wide range of subjects. Traditionally, the congresses have a contest and a secret speaker whose identity is only revealed when his or her talk begins.
- First World Congress and School on Universal Logic, 26 March–3 April 2005, Montreux, Switzerland. Participants included Béziau, Dov Gabbay, and David Makinson. (Secret Speaker: Saul Kripke.)
- Second World Congress and School on Universal Logic, 16–22 August 2007, Xi'an, China.
- Third World Congress and School on Universal Logic, 18–25 April 2010, Lisbon, Portugal. (Secret Speaker: Jaakko Hintikka.)
- Fourth World Congress and School on Universal Logic, 29 March–7 April 2013, Rio de Janeiro, Brazil.
- Fifth World Congress and School on Universal Logic, 20–30 June 2015, Istanbul, Turkey.
Publications in the field
A journal dedicated to the field, Logica Universalis, with Béziau as editor-in-chief started to be published by Birkhäuser Basel (an imprint of Springer) in 2007.[9] Springer also started to publish a book series on the topic, Studies in Universal Logic, with Béziau as series editor.[10]
An anthology titled Universal Logic was published in 2012, giving a new light on the subject. [11]
See also
References
- ↑ The Road to Universal Logic: Festschrift for 50th Birthday of Jean-Yves Béziau Volume I, edited by Arnold Koslow and Arthur Buchsbaum 2014 Birkhäuser ISBN 978-3319101927 pp 2-10
- ↑ Jean-Yves Béziau, ed. (2007). Logica universalis: towards a general theory of logic (2nd ed.). Springer. ISBN 978-3-7643-8353-4.
- ↑ Brady, R. 2006. Universal Logic. Stanford: CSLI Publications. ISBN 1-57586-255-7.
- ↑ Răzvan Diaconescu (2008). Institution-independent model theory. Birkhäuser. pp. 2–3. ISBN 978-3-7643-8707-5.
- ↑ Jon Barwise. Axioms for abstract model theory. Annals of Mathematical Logic,7:221–265, 1974
- ↑ Steffen Lewitzka "A Topological Approach to Universal Logic" Logica Universalis 2007 Birkhauser pp 35-61
- ↑ Razvan Diaconescu, "Three decades of institution theory" in Universal Logic: An Anthology edited by Jean-Yves Béziau 2012 Springer ISBN 978-3-0346-0144-3 pp 309-322
- 1 2 T. Mossakowski, J. A. Goguen, R. Diaconescu, A. Tarlecki, "What is a Logic?", Logica Universalis 2007 Birkhauser, pp. 113–133.
- ↑ http://www.springer.com/birkhauser/mathematics/journal/11787
- ↑ http://www.springer.com/series/7391
- ↑ Jean-Yves Béziau, ed. (2012). Universal Logic: an Anthology - From Paul Hertz to Dov Gabbay. Springer. ISBN 978-3-0346-0144-3.