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Volume 10, Issue 2 (2018), Pages [41] - [153]
THERE ARE INFINITELY MANY FIBONACCI COMPOSITES WITH PRIME SUBSCRIPTS
[1] J. R. Munkres, Topology, (2nd Edition), Prentice Hall,
[2] K. Kuratowsky and A. Mostowsky, Set Theory: With an Introduction to Descriptive Set Theory, North-Holland, Publishing Company (1976), 118-120.
[3] Fengsui Liu, On the Sophie Germain prime conjecture, WSEAS Transactions on Mathematics 10(12) (2011), 421-430.
[4] Fengsui Liu, Which polynomials represent infinitely many primes, Global Journal of Pure and Applied Mathematics 14(1) (2018), 161-180.
[5] Fengsui Liu, There are infinitely many Mersnne composite numbers with prime exponents, Advances in Pure Mathematics 8(7) (2018), 686-698.
DOI: https://doi.org/10.4236/apm.2018.87041
[6] L. Somer, Generalization of a theorem of Drobot, Fibonacci Quarterly 40(5) (2000), 435-437.
[7] Michiel Hazewinkel, Encyclopedia of Mathematics, Limit.
http://eom.springer.de/l/l058820.htm
[8] Terence Tao, Open Question: The Parity Problem in Sieve Theory.
http://terrytao.wordpress.com/2007/06/05/open-question-the-parity-problem-in-sieve-theory
[9] V. Drobot, On primes in the Fibonacci sequence, Fibonacci Quarterly 38(1) (2000), 71-72.