Fibonorial

In mathematics, the Fibonorial, also called the Fibonacci factorial, where is a nonnegative integer, is defined as the product of the first positive Fibonacci numbers, i.e.
where is the ^th Fibonacci number, and gives the empty product.
The Fibonorial is defined analogously to the factorial. The Fibonorial numbers are used in the definition of Fibonomial coefficients similarly as the factorial numbers are used in the definition of binomial coefficients.

Asymptotic behaviour

The series of fibonorials is asymptotic to a function of the golden ratio :.
Here the fibonorial constant is defined by, where and is the golden ratio.
An approximate truncated value of is 1.226742010720.

Almost-Fibonorial numbers

Almost-Fibonorial numbers:.
Almost-Fibonorial primes: prime numbers among the almost-Fibonorial numbers.

Quasi-Fibonorial numbers

Quasi-Fibonorial numbers:.
Quasi-Fibonorial primes: prime numbers among the quasi-Fibonorial numbers.

Connection with the q-Factorial

The fibonorial can be expressed in terms of the q-factorial and the golden ratio :

Sequences

Product of first nonzero Fibonacci numbers.
and for such that and are primes, respectively.