In the December 2010 issue of *Scientific American*, an article "A Geometric Theory of Everything" by A. G. Lisi and J. O. Weatherall states "... what is arguably the most intricate structure known to mathematics, the exceptional Lie group E8." Elsewhere in the article it says "... what is perhaps the most beautiful structure in all of mathematics, the largest simple exceptional Lie group. E8." Are these sensible statements? What are some other candidates for the most intricate structure and for the most beautiful structure in all of mathematics? I think the discussion should be confined to "single objects," and not such general "structures" as modern algebraic geometry. Question asked by [Richard Stanley][1] ________________________ Here are the **top candidates** so far: 1) The absolute Galois group of the rationals 2) The natural numbers (and variations) 4) Homotopy groups of spheres 5) The Mandelbrot set 6) The Littlewood Richardson coeefficients (representations of $S_n$ etc.) 7) The class of ordinals 8) The monster vertex algebra 9) Classical Hopf fibration 10) Exotic Lie groups 11) The Cantor set 12) The 24 dimensional packing of unit spheres with kissing number 196560 (related to 8). 13) The simplicial symmetric sphere spectrum 14) F_un (whatever it is) 15) The Grothendiek-Teichmuller tower. 16) Riemann's zeta function 17) Schwartz space of functions And there are a few more... [1]: http://mathoverflow.net/users/2807/richard-stanley