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M.A. Krasnosel’skii theorem and iterative methods for solving ill-posed linear problems with a self-adjoint operatorThe paper deals with iterative methods for solving linear operator equations x=Bx+f and Ax
Regularization of ill-posed problems in Hilbert space by means of the implicit iteration process solving linear operator equations as well as in solving applied incorrect problems which occur in dynamics
Solution of the Fredholm Equation of the First Kind by the Mesh Method with the Tikhonov RegularizationAbstract: We consider a linear ill-posed problem for the Fredholm equation of the first kind
Inverse Problem for the Equation ManagementscopeThe decision of one of the variants of the linear inverse problem of the potential for infinitely
INVERSE PROBLEM FOR THE NEWTONIAN POTENTIAL FOR INFINITELY THIN BODY IN STRATIFIED MEDIAThe decision of one of the variants of the linear inverse problem of the potential for infinitely
INVERSE PROBLEM FOR THE NEWTONIAN POTENTIAL FOR BODY OF CONSTANT THICKNESS IN STRATIFIED MEDIAGiven the solution of the linear inverse problem of the potential for a body of constant thickness
Global stability result for parabolic Cauchy problems of problems are known to be ill-posed and even severely ill-posed. Until now, there are only few partial
Solution of the Fredholm equation of the first kind by mesh method with Tikhonov regularizationWe consider linear ill-posed problem for the Fredholm equation of the first kind. For its
On linear inverse potential problem for bodies of constant thickness with data on the potential field on an approximately given surface as an ill-posed problem. The extremal of smoothing functional is used as an approximate solution
Regularized computation of oscillatory integrals with stationary points becomes an ill-posed task. The regularized algorithm presented in the article describes the stable method
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