Many general histories of mathematics mention prehistoric ``geometric'' decorations along with counting and tally-sticks as the earliest beginnings of mathematics, insinuating thus (without making it too explicit) that a direct line of development links such decorations to mathematical geometry. The article confronts this persuasion with a particular historical case: the changing character of geometrical decorations in the later Greek area from the Middle Neolithic through the first millennium BCE. The development during the ``Old European'' period (sixth through third millennium BCE, calibrated radiocarbon dates) goes from unsystematic and undiversified beginnings toward great phantasy and variation, and occasional suggestions of combined symmetries, but until the end largely restricted to the visually prominent, and not submitted to formal constraints; the type may be termed ``geometrical impressionism''. Since the late sixth millennium, spirals and meanders had been important. In the Cycladic and Minoan orbit these elements develop into seaweed and other soft, living forms. The patterns are vitalized and symmetries dissolve. One might speak of a change from decoration into art which, at the same time, is a step away from mathematical geometry. Mycenaean Greece borrows much of the ceramic style of the Minoans; other types of decoration, in contrast, display strong interest precisely in the formal properties of patterns -- enough, perhaps, to allow us to speak about an authentically mathematical interest in geometry. In the longer run, this has a certain impact on the style of vase decoration, which becomes more rigid and starts containing non-figurative elements, without becoming really formal. At the breakdown of the Mycenaean state system around 1200 BCE, the ``mathematical'' formalization disappears, and leaves no trace in the decorations of the subsequent Geometric period. These are, instead, further developments of the non-figurative elements and the repetitive style of late Mycenaean vase decorations. Instead of carrying over mathematical exploration from the early Mycenaean to the Classical age, they represent a gradual sliding-back into the visual geometry of earlier ages. The development of geometrical decoration in the Greek space from the Neolithic through the Iron Age is thus clearly structured when looked at with regard to geometric conceptualizations and ideals. But it is not linear, and no necessity leads from geometrical decoration toward geometrical exploration of formal structures (whether intuitive or provided with proofs). Classical Greek geometry, in particular, appears to have its roots much less directly (if at all) in early geometrical ornamentation than intimated by the general histories.
...MoreDescription Questions the notion that geometric decoration in prehistoric art is directly linked to developments in mathematical geometry.
Article
Fragoulis, D.;
Skembris, A.;
Papaodysseus, C.;
Rousopoulos, P.;
Panagopoulos, Th.;
Triantafyllou, C.;
Vlachopoulos, A.;
Doumas, C.;
(2005)
Origins and Application of Geometry in the Thera Prehistoric Civilization Ca. 1650 BC
(/isis/citation/CBB000651420/)
Article
Fabio Bellissima;
(2011)
L'antanairesi e la teoria armonica greca
(/isis/citation/CBB718056038/)
Book
Joost-Gaugier, Christiane L.;
(2006)
Measuring Heaven: Pythagoras and His Influence on Thought and Art in Antiquity and the Middle Ages
(/isis/citation/CBB000772136/)
Book
Peterson, Mark A.;
(2011)
Galileo's Muse: Renaissance Mathematics and the Arts
(/isis/citation/CBB001210032/)
Article
Roberts, Siobhan;
(2007)
A Reclusive Artist Meets Minds with a World-Famous Geometer: George Odom and H. S. M. (Donald) Coxeter
(/isis/citation/CBB000831477/)
Article
Lloyda, D. R.;
(2012)
How Old Are the Platonic Solids?
(/isis/citation/CBB001212292/)
Article
Yavetz, Ido;
(2001)
A New Role for the Hippopede of Eudoxus
(/isis/citation/CBB000101285/)
Article
Wagner, Roy;
(2009)
For Some Histories of Greek Mathematics
(/isis/citation/CBB000932767/)
Article
Phili, Christine;
(2008)
About Lacon's Foundations of Geometry in 1881: An Unknown Attempt before Hilbert
(/isis/citation/CBB000933119/)
Article
Saito, Ken;
(2003)
Phantom Theories of Pre-Eudoxean Proportion
(/isis/citation/CBB000740735/)
Article
Sidoli, Nathan;
Saito, Ken;
(2012)
Comparative Analysis in Greek Geometry
(/isis/citation/CBB001036229/)
Article
Terdimou, Maria;
(2007)
Geometry Versus Algebra. Ancient Greek and Western Mathematics:Parallel or Intersecting Options by the Greek Scholars of the 18th Century?
(/isis/citation/CBB000931865/)
Article
Saito, Ken;
Sidoli, Nathan;
(2010)
The Function of Diorism in Ancient Greek Analysis
(/isis/citation/CBB001022153/)
Article
Harari, Orna;
(2003)
The Concept of Existence and the Role of Constructions in Euclid's Elements
(/isis/citation/CBB000300433/)
Book
Archimedes, ;
(2004)
The Works of Archimedes: Translated into English Together with Eutocius' Commentaries, with Commentary and Critical Edition of the Diagrams, Vol. 1
(/isis/citation/CBB000640054/)
Article
Roby, Courtney;
(2014)
Experiencing Geometry in Roman Surveyors' Texts
(/isis/citation/CBB001450113/)
Article
Nikolantonakis, Konstantinos;
(2007)
The Treatise “On the Section of a Cylinder” of Serenus of Antinoeia and the Apollonian Tradition
(/isis/citation/CBB000933151/)
Article
Webster, Colin;
(2014)
Euclid's Optics and Geometrical Astronomy
(/isis/citation/CBB001451440/)
Thesis
La Nave, Federica;
(2005)
Belief Without Proof from Ancient Geometry to Renaissance Algebra
(/isis/citation/CBB001560809/)
Book
Apollonius, ;
(2002)
Apollonius's Conics Book IV
(/isis/citation/CBB000203100/)
Be the first to comment!