A240811 a(n) = length (or lifetime) of the meta-Fibonacci sequence f(1) = ... = f(n) = 1; f(k)=f(k-f(k-2))+f(k-f(k-n)) if that sequence is only defined for finitely many terms, or 0 if that sequence is infinite.
14, 54, 0, 37, 30, 63, 368, 47, 46, 108, 188, 118, 62, 209, 126, 197, 78, 127, 190, 141, 94, 130, 138, 226, 110, 134, 158, 138, 126, 170, 242, 371, 142, 190, 178, 225, 158, 206, 214, 304, 174, 226, 238, 245, 190, 250, 262, 328, 206, 234, 278, 357, 222, 290
Offset: 2
Keywords
References
- D. R. Hofstadter, Curious patterns and non-patterns in a family of meta-Fibonacci recursions, Lecture in Doron Zeilberger's Experimental Mathematics Seminar, Rutgers University, April 10 2014.
Links
- Lars Blomberg, Table of n, a(n) for n = 2..10000, "infinity" = 10^8.
- D. R. Hofstadter, Curious patterns and non-patterns in a family of meta-Fibonacci recursions, Lecture in Doron Zeilberger's Experimental Mathematics Seminar, Rutgers University, April 10 2014; Part 1, Part 2.
- D. R. Hofstadter, Graph of first 100 terms
- Index entries for Hofstadter-type sequences
Crossrefs
Extensions
More terms from Lars Blomberg, Oct 24 2014
Comments