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Abstract
We present new results on the resolution of singular transmission problems in Hölder spaces completing in this way the work in L p cases given in [A. Favini, R. Labbas, K. Lemrabet, S. Maingot, Study of the limit of transmission problems in a thin layer by the sum theory of linear operators, Rev. Mater. Comput. 18 (1) (2005) 143–176]. Our approach makes use of the impedance notion operator [M.A. Leontovich, Approximate boundary conditions for the electromagnetic field on the surface of a good conductor. Investigations on radiowave propagation, Moscow Acad. Sci. (Part II) (1948)] which leads to obtain direct and simplified problems. We then use the Dunford calculus and some similar techniques as in [R. Labbas, Problèmes aux limites pour une équation différentielle abstraite de type elliptique, Thèse d’état, Université de Nice, 1987; A. El Haial, R. Labbas, On the ellipticity and solvability of abstract second-order differential equation, Electron. J. Differ. Eq. 57 (2001) 1–18; A. Favini, R. Labbas, S. Maingot, H. Tanabe, A. Yagi, Unified study of elliptic problems in Hölder spaces, C. R. Acad. Sci. Paris Ser. 1341 (2005)] in order to prove existence, uniqueness and maximal regularities results.
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