Difference between revisions of "Monsters, Moonshine and Black Sheep"
Abel Maciel (talk | contribs) (→DC I/O 2020 Keynote by ABEL MACIEL) |
Abel Maciel (talk | contribs) (→DC I/O 2020 Keynote by ABEL MACIEL) |
||
Line 4: | Line 4: | ||
[[Category:Conferences]] | [[Category:Conferences]] | ||
− | =DC I/O 2020 Keynote by [[ABEL MACIEL]]= | + | [[Category:DCIO]] |
+ | [[Category:DCIO2020]] | ||
+ | [[Category:DCIO Proceedings]] | ||
+ | [[Category:Conferences]] | ||
+ | |||
+ | ==DC I/O 2020 Keynote by [[ABEL MACIEL]]== | ||
Think about a number, any number. What structures lie within this number and what symmetries can it represent? | Think about a number, any number. What structures lie within this number and what symmetries can it represent? | ||
Line 11: | Line 16: | ||
Although varied, descriptions of symmetry from the perspective of mathematics, natural sciences and the arts are all anchored to the fundamental properties of invariance in response to a transformational action. This underlying fundamental truth of symmetry - the sense of some implicit structure being preserved - has proven to be one of the most powerful devices in the development of theoretical physics [Anderson 1972]. | Although varied, descriptions of symmetry from the perspective of mathematics, natural sciences and the arts are all anchored to the fundamental properties of invariance in response to a transformational action. This underlying fundamental truth of symmetry - the sense of some implicit structure being preserved - has proven to be one of the most powerful devices in the development of theoretical physics [Anderson 1972]. | ||
If we were to ask some ‘advanced AI’ or supreme alien civilization to create their own mathematics, what would they come up with? Would it be like human mathematics? Could they out-perform human intelligence? To explore this thought experiment, we have to touch on symmetry and group theory. | If we were to ask some ‘advanced AI’ or supreme alien civilization to create their own mathematics, what would they come up with? Would it be like human mathematics? Could they out-perform human intelligence? To explore this thought experiment, we have to touch on symmetry and group theory. | ||
+ | |||
+ | =Reference= | ||
+ | |||
+ | Full text in: [https://www.designcomputation.org/dcio2020 Maciel, A. (Ed.), 2020. Design Computation Input/Output 2020, 1st ed. Design Computation, London, UK. ISBN: 978-1-83812-940-8, DOI:10.47330/DCIO.2020.QPRF9890] | ||
=Reference= | =Reference= | ||
Full text in: [https://www.designcomputation.org/dcio2020 Maciel, A. (Ed.), 2020. Design Computation Input/Output 2020, 1st ed. Design Computation, London, UK. ISBN: 978-1-83812-940-8, DOI:10.47330/DCIO.2020.QPRF9890] | Full text in: [https://www.designcomputation.org/dcio2020 Maciel, A. (Ed.), 2020. Design Computation Input/Output 2020, 1st ed. Design Computation, London, UK. ISBN: 978-1-83812-940-8, DOI:10.47330/DCIO.2020.QPRF9890] |
Revision as of 22:21, 1 October 2020
DC I/O 2020 Keynote by ABEL MACIEL
Think about a number, any number. What structures lie within this number and what symmetries can it represent? Symmetry, an agreement in dimensions of due proportion, can be conceived of as a sense of harmony and beauty, appearing as balanced compositions. In mathematics, symmetry has a more precise definition and usually refers to an object that is invariant under some particular actions of transformation, including translation, reflection, rotation, or scaling. These two definitions are very different, but they are also fundamentally connected. They can be observed in the passage of time, spatial relationships, all objects (including abstract objects like theoretical models), language and music, to name a few.
Although varied, descriptions of symmetry from the perspective of mathematics, natural sciences and the arts are all anchored to the fundamental properties of invariance in response to a transformational action. This underlying fundamental truth of symmetry - the sense of some implicit structure being preserved - has proven to be one of the most powerful devices in the development of theoretical physics [Anderson 1972]. If we were to ask some ‘advanced AI’ or supreme alien civilization to create their own mathematics, what would they come up with? Would it be like human mathematics? Could they out-perform human intelligence? To explore this thought experiment, we have to touch on symmetry and group theory.