Difference between revisions of "Book/Conceptual Mathematics/OnSymmetries"
Jump to navigation
Jump to search
| (8 intermediate revisions by the same user not shown) | |||
| Line 8: | Line 8: | ||
|edition=2nd | |edition=2nd | ||
|url= | |url= | ||
|location=[[Book/Conceptual Mathematics|local page]] | |location=[[Book/Conceptual Mathematics/OnSymmetries|local page]] | ||
|publisher=Cambridge University Press | |publisher=Cambridge University Press | ||
|page= 180 | |page= 180 | ||
| Line 16: | Line 16: | ||
<noinclude> | <noinclude> | ||
=On Page 180= | |||
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]]. | |||
==Other references== | |||
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>. | |||
==Related Pages== | |||
[[Category:Category Theory]] | [[Category:Category Theory]] | ||
[[Category:Concept]] | |||
[[Category:Symmetry]] | |||
</noinclude> | </noinclude> | ||
Latest revision as of 07:15, 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.
On Page 180
In 1872 Felix Klein proposed that the way to study an object is to investigate all its automorphisms, which he called symmetries.
Other references
Sir William Hamilton also had a one-pager memo that relates quaternion with the subject of symmetry[1].
Related Pages
- ↑ Sir William Rowan Hamilton (1856). "Memorandum respecting a new System of Roots of Unity" (PDF). Philosophical Magazine. local page. 12: 446.