This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A121736 #22 Apr 28 2021 02:44:21 %S A121736 1,56,133,912,1463,1539,6480,7371,8645,24320,27664,40755,51072,86184, %T A121736 150822,152152,238602,253935,293930,320112,362880,365750,573440, %U A121736 617253,861840,885248,915705,980343,2273920,2282280,2785552,3424256,3635840 %N A121736 Dimensions of the irreducible representations of the simple Lie algebra of type E7 over the complex numbers, listed in increasing order. %C A121736 We include "1" for the 1-dimensional trivial representation and we list each dimension once, ignoring the possibility that inequivalent representations may have the same dimension. %C A121736 See also comments in A030649. %D A121736 N. Bourbaki, Lie groups and Lie algebras, Chapters 4-6, Springer, 2002. %D A121736 J. E. Humphreys, Introduction to Lie algebras and representation theory, Springer, 1997. %H A121736 Andy Huchala, <a href="/A121736/b121736.txt">Table of n, a(n) for n = 1..20000</a> (terms 1..2856 from Skip Garibaldi) %H A121736 Andy Huchala, <a href="/A121736/a121736.java.txt">Java program</a> %H A121736 Wikipedia, <a href="http://en.wikipedia.org/wiki/E7_%28mathematics%29">E_7 (mathematics)</a> %F A121736 Given a vector of 7 nonnegative integers, the Weyl dimension formula tells you the dimension of the corresponding irreducible representation. The list of such dimensions is then sorted numerically. %e A121736 The highest weight 0000000 corresponds to the 1-dimensional module on which E7 acts trivially. The smallest faithful representation of E7 is the so-called "standard" representation of dimension 56 (the second term in the sequence), with highest weight 0000001; it is minuscule and supports the famous invariant quartic form. The adjoint representation of dimension 133 (the third term in the sequence), has highest weight 1000000. %o A121736 (GAP) # see program given in sequence A121732 %Y A121736 Cf. A121732, A121737, A121738, A121739, A104599, A121741, A030649. %K A121736 nonn %O A121736 1,2 %A A121736 Skip Garibaldi (skip(AT)member.ams.org), Aug 18 2006