Abstract
This article puts forward the notion of “evolving diagram” as an important case of mathematical diagram. An evolving diagram combines, through a dynamic graphical enrichment, the representation of an object and the representation of a piece of reasoning based on the representation of that object. Evolving diagrams can be illustrated in particular with category-theoretic diagrams (hereafter “diagrams*”) in the context of “sketch theory,” a branch of modern category theory. It is argued that sketch theory provides a diagrammatic* theory of diagrams*, that it helps to overcome the rivalry between set theory and category theory as a general semantical framework, and that it suggests a more flexible understanding of the opposition between formal proofs and diagrammatic reasoning. Thus, the aim of the paper is twofold. First, it claims that diagrams* provide a clear example of evolving diagrams, and shed light on them as a general phenomenon. Second, in return, it uses sketches, understood as evolving diagrams, to show how diagrams* in general should be re-evaluated positively.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Adámek J., Rosický J. (1994) Locally presentable and accessible categories, volume 189 of Lecture notes. Cambridge University Press, Cambridge
Brown J. R. (2005) Naturalism, pictures, and platonic intuitions. In: Mancosu P., Jørgensen K.F., Pedersen S.A. (eds) Visualization, explanation and reasoning styles in mathematics (Chap. 3, pp. 57–74). Berlin: Springer.
Coppey L. (1992) Esquisses et types. Diagrammes 27: LC1–LC33
Ehresmann C. (1968) Esquisses et types de structures algébriques. Bulletin of the Polytechnic Institute of Iasi XIV: 1–14
Foltz F. (1969) Sur la catégorie des foncteurs dominés. Cahiers de topologie et géométrie différentielle catégoriques XI(2): 101–130
Kennison J. F. (1968) On limit-preserving functors. Illinois Journal of Mathematics 12: 616–619
Lambek J., Scott P. (1999) Introduction to higher order categorical logic, volume 7 of Cambridge studies in advanced mathematics. Cambridge University Press, Cambridge
Lawvere, F. W. (1963). Functorial semantics of algebraic theories and some algebraic problems in the context of functorial semantics of algebraic theories. PhD thesis, Columbia University.
Makkai M., Paré R. (1989) Accessible categories: The foundations of categorical model theory, volume 104 of Contemporary mathematics. American Mathematical Society, Providence
Osborne M. S. (2000) Homological algebra. Springer, New York
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Halimi, B. Diagrams as sketches. Synthese 186, 387–409 (2012). https://doi.org/10.1007/s11229-011-9986-5
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11229-011-9986-5