А. Б. Бакушинский scite author profile

In a series of publications of the second author, including some with coauthors, globally strictly convex Tikhonov-like functionals were constructed for some nonlinear ill-posed problems. The main element of such a functional is the presence of the Carleman Weight Function. Compared with previous publications, the main novelty of this paper is that the existence of the regularized solution (i.e. the minimizer) is proved rather than assumed. The method works for both ill-posed Cauchy problems for some quasilinear PDEs of the second order and for some Coefficient Inverse Problems. However, to simplify the presentation, we focus here only on ill-posed Cauchy problems. Along with the theory, numerical results are presented for the case of a 1-D quasiliear parabolic PDE with the lateral Cauchy data given on one edge of the interval (0,1).

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Remarks on choosing a regularization parameter using the quasi-optimality and ratio criterion

Бакушинский¹

1984

USSR Computational Mathematics and Mathematical Physics

147

179

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A general method of constructing regularizing algorithms for a linear ill-posed equation in Hilbert space

Бакушинский¹

1967

USSR Computational Mathematics and Mathematical Physics

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Methods for solving monotonic variational inequalities, based on the principle of iterative regularization

Бакушинский¹

1977

USSR Computational Mathematics and Mathematical Physics

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Iterative method for the solution of nonlinear ill-posed problems and their applications

Бакушинский¹

1992

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