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Zur theorie der konformen abbildung kreisförmiger bereiche

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Rendiconti del Circolo Matematico di Palermo (1884-1940)

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  1. The substance of this theorem was given byA. M. Cauchy,Memoire sur les fonctions qui ne peuvent obtenir que deux valeurs égales et de signes contraires par suite des transpositions opérées entre les variables qu’elles renferment (lu à ľInstitut le 30 novembre 1812) [Journal de ľÉcole Polytechnique, XVIIe Cahier (1815), pp. 29-112]. It is (XVIII. 5) ofTh. Muir,The Theory of Determinants in the Historical Order of Development (London, Macmillan and Co.), Part. I (Second Edition, 1906):General Determinants up to 1841; Part. II (Second Edition, 1906):Special Determinants up to 1841, hereafter referred to as: MujrHistory. — Compare: Binet (MuirHistory, Part I, p. 83).

  2. J. Binet,Mémoire sur un systéme de formules analytiques, et leur application a des considerations géométriques (lu à ľInstitut le 30 novembre 1812) [Journal de ľÉcole Polytechnique, XVIe Cahier (1813), pp. 280–354]; MuirHistory (XXX.), Part I, p. 85.

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  3. A. L. Cauchy, loc. cit. I); MumHistory (XXX. 2), Part I, p. 121. Compare:Th. Muir,The Sum of the r-line Minors of the Square of a Determinant [Proceedings of the Royal Society of Edinburgh, Vol. XXVI (1906), pp. 533–539].

  4. J. J. Sylvester,On the Relation between the Minor Determinants of Linearly Equivalent Quadratic Functions [Philosophical Magazine, Vol. I (1851), pp. 295–305].

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  5. Compare:Th. Muir, loc. cit. 3), arts 6 and 5.

  6. Compare:Th. Muir,The Minors of a Product-Determinant [Proceedings of the Royal Society of Edinburgh, Vol. XXVII (1907), pp. 79–87]. In this paper of Muir’s the minors are expressed in terms of bipartites. His article 6 is an example of Sylvester’ theorem of 1851 [loc. cit. 4)] with the second factor in the result expressed in bipartite form.

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Pick, G. Zur theorie der konformen abbildung kreisförmiger bereiche. Rend. Circ. Matem. Palermo 37, 341–344 (1914). https://doi.org/10.1007/BF03014828

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