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Zeros of quasi-orthogonal $q$-Laguerre polynomials
Published 17 Aug 2021 in math.CA | (2108.07517v1)
Abstract: We investigate the interlacing of zeros of polynomials of different degrees within the sequences of $q$-Laguerre polynomials $\left{\tilde{L}n{(\delta)}(z;q)\right}{n=0}{\infty}$ characterized by $\delta\in(-2,-1).$ The interlacing of zeros of quasi-orthogonal polynomials $\tilde{L}_n{(\delta)}(z;q)$ with those of the orthogonal polynomials $\tilde{L}_m{(\delta+t)}(z;q), m,n\in\mathbb{N}, t\in{1,2}$ is also considered. New bounds for the least zero of the (order $1$) quasi-orthogonal $q$-Laguerre polynomials are derived.
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