A quasi-Toeplitz (QT) matrix is a semi-infinite matrix of the form A=T(a)+E\documentclass[12pt]{minimal}
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\begin{document}$$A=T(a)+E$$\end{document} where T(a) is the Toeplitz matrix with entries (T(a))i,j=aj-i\documentclass[12pt]{minimal}
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\begin{document}$$(T(a))_{i,j}=a_{j-i}$$\end{document}, for aj-i∈C\documentclass[12pt]{minimal}
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\begin{document}$$a_{j-i}\in \mathbb {C}$$\end{document}, i,j≥1\documentclass[12pt]{minimal}
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\begin{document}$$i,j\ge 1$$\end{document}, while E is a matrix representing a compact operator in ℓ2\documentclass[12pt]{minimal}
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\begin{document}$$\ell ^2$$\end{document}. The matrix A is finitely representable if ak=0\documentclass[12pt]{minimal}
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\begin{document}$$a_k=0$$\end{document} for k<-m\documentclass[12pt]{minimal}
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\begin{document}$$k<-m$$\end{document} and for k>n\documentclass[12pt]{minimal}
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\begin{document}$$k>n$$\end{document}, given m,n>0\documentclass[12pt]{minimal}
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\begin{document}$$m,n>0$$\end{document}, and if E has a finite number of nonzero entries. The problem of numerically computing eigenpairs of a finitely representable QT matrix is investigated, i.e., pairs (λ,v)\documentclass[12pt]{minimal}
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\begin{document}$$(\lambda ,\varvec{v})$$\end{document} such that Av=λv\documentclass[12pt]{minimal}
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\begin{document}$$A\varvec{v}=\lambda \varvec{v}$$\end{document}, with λ∈C\documentclass[12pt]{minimal}
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\begin{document}$$\lambda \in \mathbb {C}$$\end{document}, v=(vj)j∈Z+\documentclass[12pt]{minimal}
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\begin{document}$$\varvec{v}=(v_j)_{j\in \mathbb {Z}^+}$$\end{document}, v≠0\documentclass[12pt]{minimal}
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\begin{document}$$\varvec{v}\ne 0$$\end{document}, and ∑j=1∞|vj|2<∞\documentclass[12pt]{minimal}
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\begin{document}$${\sum }_{j=1}^\infty |v_j|^2<\infty$$\end{document}. It is shown that the problem is reduced to a finite nonlinear eigenvalue problem of the kind WU(λ)β=0\documentclass[12pt]{minimal}
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\begin{document}$$WU(\lambda )\varvec{\beta }=0$$\end{document}, where W is a constant matrix and U depends on λ\documentclass[12pt]{minimal}
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\begin{document}$$\lambda$$\end{document} and can be given in terms of either a Vandermonde matrix or a companion matrix. Algorithms relying on Newton’s method applied to the equation det WU(λ)=0\documentclass[12pt]{minimal}
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\begin{document}$$WU(\lambda )=0$$\end{document} are analyzed. Numerical experiments show the effectiveness of this approach. The algorithms have been included in the CQT-Toolbox [Numer. Algorithms 81 (2019), no. 2, 741–769].
