Geodesic
Some sufficient conditions for finding a second solution of the quadratic equation in a Banach space
Mathematica slovaca, Tome 38 (1988) no. 4, pp. 403-408
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Classification : 47J05 
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Argyros, Ioannis K. Some sufficient conditions for finding a second solution of the quadratic equation in a Banach space. Mathematica slovaca, Tome 38 (1988) no. 4, pp. 403-408. http://geodesic.mathdoc.fr/item/MASLO_1988_38_4_a13/

[1] ANSELONE P. M., MOORE R. H.: An extension of the Newton-Kantorovich method for ѕolving nonlinear equationѕ. Tech. Rep. No. 520, U.S. Army Mathematicѕ Reѕearch Center, Univerѕity of Wiѕconѕin, Madiѕon 1965.

[2] ARGYROS I. K.: On a contraction theorem and applications. (to appear in "Proceedings of Symposia in Pure Mathematices" of the American Mathematical Society). | MR | Zbl

[3] ARGYROS I. K.: Quadratic equations in Banach space, perturbation techniques and applications to Chandrasekhar's and related equations. Ph.D. dissertation, University of Georgia, Athens 1984.

[4] BOWDEN R. L., ZWEIFEL P. F.: Aѕtrophyѕicѕ. J. 1976 219-232.

[5] CHANDRASEKHAR S.: Radiative Tranѕfer. Dover Publ., New York, 1960. | MR

[6] KELLEY C. T.: Solution of the Chandraѕekhar H equation by Newton'ѕ method. J. Math. Phyѕ. 21, 1980, 1625-1628. | MR

[7] ARGYROS I. K.: Approximation of ѕome quadratic integral equationѕ in tranѕport theory. J. Integral Equationѕ 4, 1982, 221-237. | MR

[8] MULLIKIN T. W.: Some probability diѕtributionѕ for neutron tranѕport in half-ѕpace. J. Applied Probability 5, 1968, 357-374. | MR

[9] RALL L. B.: Quadratic equations in Banach space. Rend. Circ. Math. Palermo 10, 1961, 314-332. | MR

[10] ARGYROS I. K.: Computational Solution of Nonlinear Operator Equations. John Wiley Publ., New York, 1968.

[11] STIBBS D. W. N., WEIR R. E.: On the H-functions for isotropic scattering. Monthly Not. Roy. Aѕtron. Soc. 119, 1959, 515-525. | MR | Zbl