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  • P-ISSN1226-0657
  • E-ISSN2287-6081
  • KCI

ON ZERO DISTRIBUTIONS OF SOME SELF-RECIPROCAL POLYNOMIALS WITH REAL COEFFICIENTS

Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics / Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics, (P)1226-0657; (E)2287-6081
2017, v.24 no.2, pp.69-77
https://doi.org/10.7468/jksmeb.2017.24.2.69
Han, Seungwoo
Kim, Seon-Hong
Park, Jeonghun

Abstract

If q(z) is a polynomial of degree n with all zeros in the unit circle, then the self-reciprocal polynomial <TEX>$q(z)+x^nq(1/z)$</TEX> has all its zeros on the unit circle. One might naturally ask: where are the zeros of <TEX>$q(z)+x^nq(1/z)$</TEX> located if q(z) has different zero distribution from the unit circle? In this paper, we study this question when <TEX>$q(z)=(z-1)^{n-k}(z-1-c_1){\cdots}(z-1-c_k)+(z+1)^{n-k}(z+1+c_1){\cdots}(z+1+c_k)$</TEX>, where <TEX>$c_j$</TEX> > 0 for each j, and q(z) is a 'zeros dragged' polynomial from <TEX>$(z-1)^n+(z+1)^n$</TEX> whose all zeros lie on the imaginary axis.

keywords
polynomials, self-recipocal polynomials, zeros, zero dragging

Journal of the Korean Society of Mathematical Education Series B: The Pure and Applied Mathematics