Reciprocal polynomial

In mathematics, for a polynomial "p" with complex coefficients,: $p(z) = a_0 + a_1z + a_2z^2 + ldots + a_nz^n ,!$ we define the reciprocal polynomial, p*: $p^*(z) = overline{a}_n + overline{a}_{n-1}z + ldots + overline{a}_0z^n = z^noverline{p(ar{z}^{-1})}$

where $overline{a}_i$ denotes the complex conjugate of $a_i ,!$ .

A polynomial is called self-reciprocal if $p(z) equiv p^{*}(z)$ .

If the coefficients "a"_"i" are real then this reduces to "a"_"i" = "a"_"n"−"i". In this case "p" is also called a palindromic polynomial.

If "p"("z") is the minimal polynomial of "z"₀ with |"z"₀| = 1, and "p"("z") has real coefficients, then "p"("z") is self-reciprocal. This follows because

: $z_0^noverline{p(1/ar{z_0})} = z_0^noverline{p(z_0)} = z_0^nar{0} = 0$ .

So "z"₀ is a root of the polynomial $z^noverline{p(ar{z}^{-1})}$ which has degree "n". But, the minimal polynomial is unique, hence : $p(z) = z^noverline{p(ar{z}^{-1})}.$

A consequence is that the cyclotomic polynomials $Phi_n$ are self-reciprocal for $n > 1$ ; this is used in the special number field sieve to allow numbers of the form $x^{11} pm 1$ , $x^{13} pm 1$ , $x^{15} pm 1$ and $x^{21} pm 1$ to be factored taking advantage of the algebraic factors by using polynomials of degree 5, 6, 4 and 6 respectively - note that $phi$ of the exponents are 10, 12, 8 and 12.

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Reciprocal polynomial

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