| 词条 | Zimmer's conjecture |
| 释义 |
Zimmer's conjecture is a statement in mathematics "which has to do with the circumstances under which geometric spaces exhibit certain kinds of symmetries."[1] It was named after the mathematician Robert Zimmer. The conjecture states that there can exist symmetries (specifically higher-rank lattices) in a higher dimension that cannot exist in lower dimensions. In 2017, the conjecture was proven by Aaron Brown and Sebastian Hurtado-Salazar of the University of Chicago and David Fisher of Indiana University.[1][2][3] References1. ^1 {{Cite news|url=https://www.quantamagazine.org/a-proof-about-where-symmetries-cant-exist-20181023/|title=A Proof About Where Symmetries Can’t Exist|last=Hartnett|first=Kevin|date=2018-10-23|work=Quanta Magazine|access-date=2018-11-02}} {{math-stub}}2. ^{{cite arxiv|last=Brown|first=Aaron|last2=Fisher|first2=David|last3=Hurtado|first3=Sebastian|date=2017-10-07|title=Zimmer's conjecture for actions of SL(𝑚,ℤ)|eprint=1710.02735|class=math.DS}} 3. ^{{Cite news|url=https://www.ipam.ucla.edu/programs/workshops/new-methods-for-zimmers-conjecture/|title=New Methods for Zimmer's Conjecture|work=IPAM|access-date=2018-11-02|language=en-US}} 2 : Symmetry|Conjectures that have been proved |
| 随便看 |
|
开放百科全书收录14589846条英语、德语、日语等多语种百科知识,基本涵盖了大多数领域的百科知识,是一部内容自由、开放的电子版国际百科全书。