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On a theorem of Szegö, Kac, and Baxter. (English) Zbl 0141.07001


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[1] Glen Baxter, ”Polynomials defined by a difference system”,J. Math. Anal. and App. vol.2 (1961), pp. 223–263. · Zbl 0116.35704
[2] Glen Baxter, ”A convergence equivalence related to polynomials orthogonal on the unit circle”,Trans. Amer. Math. Soc., vol.99 (1961), pp. 471–487. · Zbl 0116.35705
[3] Glen Baxter, ”A norm inequality for a ’finite section’ Wiener-Hopf equation”,Illinois J. of Math., vol.7 (1963), pp. 97–103. · Zbl 0113.09101
[4] A Calderón, F. Spitzer, and H. Widom, ’Inversion of Toeplitz matrices”,Illinois J. Math., vol.3 (1959), pp. 490–498. · Zbl 0091.11101
[5] I.I. Hirschman, Jr., ”Finite sections of Wiener-Hopf equations and Szegö polynomials” to appear,in Jour, of Math. Analysis and Applications.
[6] M. Kac,”Toeplitz matrices, translation kernels, and a related problem in probability”,Duke Math. J., vol.21 (1954), pp. 501–510. · Zbl 0056.10201
[7] G. Szegö, ”Ein Grenzwertsatz über die Toeplitzschen Determinanten einer reellen positiven Funktion”,Math. Annalen, vol.76 (1915), pp. 490–503. · JFM 45.0518.02
[8] G. Szsgö, ”On certain Hsrmitian forms associated with the Fourier series of a positive function”,Commun. du seminaire math. de l’Univ. de Lund, tome supp. (1952), pp. 228–237.
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