Abstract
Abstract.We prove a “collage” theorem for a generalized contractive type operators.
Authors
Stefan M. Soltuz
Tiberiu Popoviciu Institute of Numerical analysis, Romanian Academy
Keywords
generalized contractive type operators
Paper coordinates
Ş.M. Şoltuz, Inverse problems via generalized contractive operators, Rev. Anal. Numer. Theor. Approx., 39 (2010) no. 2, 164-168, https://doi.org/10.33993/jnaat392-1036
About this paper
Journal
Rev. Anal. Numer. Theor. Approx
Publisher Name
Romanian Academy
Print ISSN
2457-6794
Online ISSN
2501-059X
google scholar link
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[5] S.M. S ̧oltuz,Solving inverse problems via hemicontractive maps, Nonlinear Analysis,textbf71, pp. 2387–2390, 2009.
[6] S.M. S ̧oltuz,Solving inverse problems via weak-contractive maps, Rev. Anal. Numer.Theor. Approx.,37, no. 2, pp. 217–220, 2008.Received by the editors: February 11, 2010.
[2] H.E. KunzeandE.R. Vrscay,Solving inverse problems for ordinary differential equa-tions using the Picard contraction mapping, Inverse Problems,15, pp. 745–770, 1999.
[3] H.E. KunzeandS. Gomes,Solving an inverse problem for Urison-type integral equationsusing Banach’s fixed point theorem, Inverse Problems,19, pp. 411–418, 2003.[4] H.E. Kunze, J.E. HickenandE.R. Vrscay,Inverse problems for ODEs using contrac-tion maps and suboptimality for the ’collage method’, Inverse Problems,20, pp. 977-991,2004.
[5] S.M. S ̧oltuz,Solving inverse problems via hemicontractive maps, Nonlinear Analysis,textbf71, pp. 2387–2390, 2009.
[6] S.M. S ̧oltuz,Solving inverse problems via weak-contractive maps, Rev. Anal. Numer.Theor. Approx.,37, no. 2, pp. 217–220, 2008.Received by the editors: February 11, 2010.