Difference between revisions of "Book/Conceptual Mathematics/OnSymmetries"
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In 1872 [[wikipedia:Felix Klein|Felix Klein]] proposed that the way to study an object is to investigate all its [[wikipedia:automorphism|automorphism]]s, which he called [[symmetry|symmetries]]. | In 1872 [[wikipedia:Felix Klein|Felix Klein]] proposed that the way to study an object is to investigate all its [[wikipedia:automorphism|automorphism]]s, which he called [[symmetry|symmetries]]. | ||
Sir William Hamilton also had a one-pager | Sir William Hamilton also had a one-pager memo that relates [[wikipedia:Quaternion|quaternion]] with the subject of [[symmetry]]<ref>{{:Paper/Memorandum respecting a new System of Roots of Unity}}</ref>. | ||
[[Category:Category Theory]] | [[Category:Category Theory]] | ||
[[Category:Concept]] | [[Category:Concept]] | ||
[[Category:Symmetry]] | [[Category:Symmetry]] | ||
</noinclude> | </noinclude> |
Revision as of 07:14, 29 August 2021
Lawvere, William; Schanuel, Stephen (January 8, 2009). Conceptual Mathematics_A First Introduction to Categories (2nd ed.). local page: Cambridge University Press. p. 180. ISBN 978-0521719162.
In 1872 Felix Klein proposed that the way to study an object is to investigate all its automorphisms, which he called symmetries.
Sir William Hamilton also had a one-pager memo that relates quaternion with the subject of symmetry[1].
- ↑ Sir William Rowan Hamilton (1856). "Memorandum respecting a new System of Roots of Unity" (PDF). Philosophical Magazine. local page. 12: 446.