Switch to: References

Citations of:

REVIEWS-David Hilbert's lectures on the foundations of geometry 1891-1902

M. Hallett, U. Majer & Jan von Plato

Bulletin of Symbolic Logic 12 (3):492-493 (2006)

Add citations

You must login to add citations.

Bridging the gap between analytic and synthetic geometry: Hilbert’s axiomatic approach.Eduardo N. Giovannini - 2016 - Synthese 193 (1):31-70.details The paper outlines an interpretation of one of the most important and original contributions of David Hilbert’s monograph Foundations of Geometry , namely his internal arithmetization of geometry. It is claimed that Hilbert’s profound interest in the problem of the introduction of numbers into geometry responded to certain epistemological aims and methodological concerns that were fundamental to his early axiomatic investigations into the foundations of elementary geometry. In particular, it is shown that a central concern that motivated Hilbert’s axiomatic investigations (...) Download Export citation Bookmark 7 citations
How to be a structuralist all the way down.Elaine Landry - 2011 - Synthese 179 (3):435 - 454.details This paper considers the nature and role of axioms from the point of view of the current debates about the status of category theory and, in particular, in relation to the "algebraic" approach to mathematical structuralism. My aim is to show that category theory has as much to say about an algebraic consideration of meta-mathematical analyses of logical structure as it does about mathematical analyses of mathematical structure, without either requiring an assertory mathematical or meta-mathematical background theory as a "foundation", (...) Download Export citation Bookmark 16 citations
Peano’s structuralism and the birth of formal languages.Joan Bertran-San-Millán - 2022 - Synthese 200 (4):1-34.details Recent historical studies have investigated the first proponents of methodological structuralism in late nineteenth-century mathematics. In this paper, I shall attempt to answer the question of whether Peano can be counted amongst the early structuralists. I shall focus on Peano’s understanding of the primitive notions and axioms of geometry and arithmetic. First, I shall argue that the undefinability of the primitive notions of geometry and arithmetic led Peano to the study of the relational features of the systems of objects that (...) Download Export citation Bookmark
‘Nobody could possibly misunderstand what a group is’: a study in early twentieth-century group axiomatics.Christopher D. Hollings - 2017 - Archive for History of Exact Sciences 71 (5):409-481.details In the early years of the twentieth century, the so-called ‘postulate analysis’—the study of systems of axioms for mathematical objects for their own sake—was regarded by some as a vital part of the efforts to understand those objects. I consider the place of postulate analysis within early twentieth-century mathematics by focusing on the example of a group: I outline the axiomatic studies to which groups were subjected at this time and consider the changing attitudes towards such investigations. Download Export citation Bookmark 1 citation
Metaphors for Mathematics from Pasch to Hilbert.Dirk Schlimm - 2016 - Philosophia Mathematica 24 (3):308-329.details How mathematicians conceive of the nature of mathematics is reflected in the metaphors they use to talk about it. In this paper I investigate a change in the use of metaphors in the late nineteenth and early twentieth centuries. In particular, I argue that the metaphor of mathematics as a tree was used systematically by Pasch and some of his contemporaries, while that of mathematics as a building was deliberately chosen by Hilbert to reflect a different view of mathematics. By (...) Download Export citation Bookmark 1 citation
Pasch’s philosophy of mathematics.Dirk Schlimm - 2010 - Review of Symbolic Logic 3 (1):93-118.details Moritz Pasch (1843ber neuere Geometrie (1882), in which he also clearly formulated the view that deductions must be independent from the meanings of the nonlogical terms involved. Pasch also presented in these lectures the main tenets of his philosophy of mathematics, which he continued to elaborate on throughout the rest of his life. This philosophy is quite unique in combining a deductivist methodology with a radically empiricist epistemology for mathematics. By taking into consideration publications from the entire span of Paschs (...) Download Export citation Bookmark 23 citations
David Hilbert and the foundations of the theory of plane area.Eduardo N. Giovannini - 2021 - Archive for History of Exact Sciences 75 (6):649-698.details This paper provides a detailed study of David Hilbert’s axiomatization of the theory of plane area, in the classical monograph Foundation of Geometry. On the one hand, we offer a precise contextualization of this theory by considering it against its nineteenth-century geometrical background. Specifically, we examine some crucial steps in the emergence of the modern theory of geometrical equivalence. On the other hand, we analyze from a more conceptual perspective the significance of Hilbert’s theory of area for the foundational program (...) Download Export citation Bookmark 1 citation

1