Keith Number
A Keith number is an 
-digit Integer 
such that if a Fibonacci-like sequence (in which each term in the sequence isthe sum of the previous terms) is formed with the first terms taken as the decimal digits of the number , then itself occurs as a term in the sequence. For example, 197 is a Keith number since it generates the sequence 1, 9, 7,17, 33, 57, 107, 197, ... (Keith). Keith numbers are also called Repfigit Numbers.
There is no known general technique for finding Keith numbers except by exhaustive search. Keith numbers are much rarerthan the Primes, with only 52 Keith numbers with 
digits: 14, 19, 28, 47, 61, 75, 197, 742, 1104, 1537, 2208, 2580,3684, 4788, 7385, 7647, 7909, ... (Sloane's A007629). In addition, three 15-digit Keith numbers are known (Keith 1994). It is not known if there are an Infinite number of Keith numbers.
References
Esche, H. A. ``Non-Decimal Replicating Fibonacci Digits.'' J. Recr. Math. 26, 193-194, 1994. Heleen, B. ``Finding Repfigits--A New Approach.'' J. Recr. Math. 26, 184-187, 1994. Keith, M. ``Repfigit Numbers.'' J. Recr. Math. 19, 41-42, 1987. Keith, M. ``All Repfigit Numbers Less than 100 Billion ( Keith, M. ``Keith Numbers.'' http://users.aol.com/s6sj7gt/mikekeit.htm. Robinson, N. M. ``All Known Replicating Fibonacci Digits Less than One Thousand Billion ( Shirriff, K. ``Computing Replicating Fibonacci Digits.'' J. Recr. Math. 26, 191-193, 1994. Sloane, N. J. A. Sequence A007629in ``The On-Line Version of the Encyclopedia of Integer Sequences.''http://www.research.att.com/~njas/sequences/eisonline.html. ``Table: Repfigit Numbers (Base 
).'' J. Recr. Math. 26, 181-184, 1994.
).'' J. Recr. Math. 26, 188-191, 1994.
) Less than 
.'' J. Recr. Math. 26, 195, 1994.
- Kochansky's Approximation
- Koch Antisnowflake
- Koch Island
- Koch Snowflake
- Koebe Function
- Koebe's Constant
- Kollros' Theorem
- Kolmogorov-Arnold-Moser Theorem
- Kolmogorov Complexity
- Kolmogorov Constant
- Kolmogorov Entropy
- Kolmogorov-Sinai Entropy
- Kolmogorov-Smirnov Test
- Korselt's Criterion
- Kovalevskaya Exponent
- Kozyrev-Grinberg Theory
- k-Partite Graph
- Kramers Rate
- Krawtchouk Polynomial
- Kreisel Conjecture
- Kronecker Decomposition Theorem
- Kronecker Delta
- Kronecker Product
- Kronecker's Polynomial Theorem
- Kronecker Symbol