%I #15 Feb 26 2018 19:21:35
%S 1,3,1,11,57,51,17,187,953,947,913,827,313,2867,14609,13243,5049,
%T 46003,234385,209723,69945,768819,3914001,3912635,3904441,3879859,
%U 3740561,3388219,1282361,11746099,59848977,54211515,20517817,187937715
%N Terms of Binary Gleichniszahlen-Reihe (BGR) sequence A045998 converted into decimal (Look and Say Sequence, mod 2, read in binary and converted to decimal).
%D N. Worrick, S. Lewis and B. Shrader, A possible formula for the length of BGR sequences, Graph Theory Notes of New York, XXXVI (1999), p. 25.
%H Lars Blomberg, <a href="/A048522/b048522.txt">Table of n, a(n) for n = 0..3999</a>
%e To generate the sequence, start with a 1. There is one 1, so the sequence becomes 11. Now there are 2 1s, but 2 is 0 mod 2, so it becomes 01. Then we get 1011, 111001, 110011, 010001, and so on. The terms in the series are these numbers converted to base 10. Note that leading zeros are not discarded during this process! - _William K. Grannis_, May 05 2016
%Y Cf. A005150, A045998, A045999.
%K nonn,base
%O 0,2
%A _Patrick De Geest_, Jun 15 1999
%E Edited by _N. J. A. Sloane_, Aug 11 2016