Padovan polynomials

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Template:Onesource In mathematics, Padovan polynomials are a generalization of Padovan sequence numbers. These polynomials are defined by:^[1]

P_{n} (x) = {\begin{cases} 1, & if n = 1 \\ 0, & if n = 2 \\ x, & if n = 3 \\ x P_{n - 2} (x) + P_{n - 3} (x), & if n \geq 4 . \end{cases}

The first few Padovan polynomials are:

P_{1} (x) = 1

P_{2} (x) = 0

P_{3} (x) = x

P_{4} (x) = 1

P_{5} (x) = x^{2}

P_{6} (x) = 2 x

P_{7} (x) = x^{3} + 1

P_{8} (x) = 3 x^{2}

P_{9} (x) = x^{4} + 3 x

P_{10} (x) = 4 x^{3} + 1

P_{11} (x) = x^{5} + 6 x^{2} .

The Padovan numbers are recovered by evaluating the polynomials P_n−3(x) at x = 1.

Evaluating P_n−3(x) at x = 2 gives the nth Fibonacci number plus (−1)ⁿ. (sequence A008346 in the OEIS)

The ordinary generating function for the sequence is

\sum_{n = 1}^{\infty} P_{n} (x) t^{n} = \frac{t}{1 - x t^{2} - t^{3}} .

See also

Polynomial sequences

References

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