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Revolutions and Continuity in Greek Mathematics / ed. by Michalis Sialaros.

Contributor(s): Material type: TextTextSeries: Science, Technology, and Medicine in Ancient Cultures ; 8Publisher: Berlin ; Boston : De Gruyter, [2018]Copyright date: ©2018Description: 1 online resource (X, 391 p.)Content type:
Media type:
Carrier type:
ISBN:
  • 9783110563658
  • 9783110565270
  • 9783110565959
Subject(s): DDC classification:
  • 510.938 23
LOC classification:
  • QA31 .R48 2018
Other classification:
  • online - DeGruyter
Online resources: Available additional physical forms:
  • Issued also in print.
Contents:
Frontmatter -- Preface -- Contents -- Notes on Contributors -- Introduction: Revolutions in Greek Mathematics -- Counter-Revolutions in Mathematics -- Diophantus and Premodern Algebra: New Light on an Old Image -- Geometer, in a Landscape: Embodied Mathematics in Hero’s Dioptra -- How Much Does a Theorem Cost? -- Diagrammatizing Mathematics: Some Remarks on a Revolutionary Aspect of Ancient Greek Mathematics -- Composition and Removal of Ratios in Geometric and Logistic Texts from the Hellenistic to the Byzantine Period -- Why Did the Greeks Develop Proportion Theory? A Conjecture -- Recursive Knowledge Procedures Informing the Design of the Parthenon : One Instance of Continuity between Greek and Near Eastern Mathematical Practices -- Diophantus, al-Karajī, and Quadratic Equations -- Substantiae sunt sicut numeri: Aristotle on the Structure of Numbers -- The Axiomatization of Mathematics and Plato’s Conception of Knowledge in the Meno and the Republic -- The Anthyphairetic Revolutions of the Platonic Ideas -- Name index -- General index
Summary: This volume brings together a number of leading scholars working in the field of ancient Greek mathematics to present their latest research. In their respective area of specialization, all contributors offer stimulating approaches to questions of historical and historiographical ‘revolutions’ and ‘continuity’. Taken together, they provide a powerful lens for evaluating the applicability of Thomas Kuhn’s ideas on ‘scientific revolutions’ to the discipline of ancient Greek mathematics. Besides the latest historiographical studies on ‘geometrical algebra’ and ‘premodern algebra’, the reader will find here some papers which offer new insights into the controversial relationship between Greek and pre-Hellenic mathematical practices. Some other contributions place emphasis on the other edge of the historical spectrum, by exploring historical lines of ‘continuity’ between ancient Greek, Byzantine and post-Hellenic mathematics. The terminology employed by Greek mathematicians, along with various non-textual and material elements, is another topic which some of the essays in the volume explore. Finally, the last three articles focus on a traditionally rich source on ancient Greek mathematics; namely the works of Plato and Aristotle.
Holdings
Item type Current library Call number URL Status Notes Barcode
eBook eBook Biblioteca "Angelicum" Pont. Univ. S.Tommaso d'Aquino Nuvola online online - DeGruyter (Browse shelf(Opens below)) Online access Not for loan (Accesso limitato) Accesso per gli utenti autorizzati / Access for authorized users (dgr)9783110565959

Frontmatter -- Preface -- Contents -- Notes on Contributors -- Introduction: Revolutions in Greek Mathematics -- Counter-Revolutions in Mathematics -- Diophantus and Premodern Algebra: New Light on an Old Image -- Geometer, in a Landscape: Embodied Mathematics in Hero’s Dioptra -- How Much Does a Theorem Cost? -- Diagrammatizing Mathematics: Some Remarks on a Revolutionary Aspect of Ancient Greek Mathematics -- Composition and Removal of Ratios in Geometric and Logistic Texts from the Hellenistic to the Byzantine Period -- Why Did the Greeks Develop Proportion Theory? A Conjecture -- Recursive Knowledge Procedures Informing the Design of the Parthenon : One Instance of Continuity between Greek and Near Eastern Mathematical Practices -- Diophantus, al-Karajī, and Quadratic Equations -- Substantiae sunt sicut numeri: Aristotle on the Structure of Numbers -- The Axiomatization of Mathematics and Plato’s Conception of Knowledge in the Meno and the Republic -- The Anthyphairetic Revolutions of the Platonic Ideas -- Name index -- General index

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This volume brings together a number of leading scholars working in the field of ancient Greek mathematics to present their latest research. In their respective area of specialization, all contributors offer stimulating approaches to questions of historical and historiographical ‘revolutions’ and ‘continuity’. Taken together, they provide a powerful lens for evaluating the applicability of Thomas Kuhn’s ideas on ‘scientific revolutions’ to the discipline of ancient Greek mathematics. Besides the latest historiographical studies on ‘geometrical algebra’ and ‘premodern algebra’, the reader will find here some papers which offer new insights into the controversial relationship between Greek and pre-Hellenic mathematical practices. Some other contributions place emphasis on the other edge of the historical spectrum, by exploring historical lines of ‘continuity’ between ancient Greek, Byzantine and post-Hellenic mathematics. The terminology employed by Greek mathematicians, along with various non-textual and material elements, is another topic which some of the essays in the volume explore. Finally, the last three articles focus on a traditionally rich source on ancient Greek mathematics; namely the works of Plato and Aristotle.

Issued also in print.

Mode of access: Internet via World Wide Web.

In English.

Description based on online resource; title from PDF title page (publisher's Web site, viewed 28. Feb 2023)