论文信息 - On autoconvolution and regularization

On autoconvolution and regularization

We consider the ill-posed nonlinear integral equation x*x=y of autoconvolution defined on the interval (0,1). We discuss conditions for the compactness, injectivity and weak closedness of the associated integral operator. The general theory of Tikhonov regularization for nonlinear ill-posed problems can be applied, and provides an approach to define different levels and degrees of ill-posedness in Hilbert spaces. For the autoconvolution problem we observe a varying degree of ill-posedness depending on the smoothness of solutions and on the behaviour of solutions and their derivatives for small arguments.

Bernd Hofmann | R. Gorenflo | B. Hofmann | R Gorenflo

[1] D. E. Edmunds,et al. FOURIER ANALYSIS AND APPROXIMATION, VOL. I , 1973 .

[2] Otmar Scherzer,et al. The Use of Tikhonov Regularization in the Identification of Electrical Conductivities from Overdetermined Boundary Data , 1992 .

[3] Approximation of Gaussian random elements and statistics , 1992 .

[4] R. Ash,et al. Real analysis and probability , 1975 .

[5] Sergio Vessella,et al. Abel Integral Equations , 1990 .

[6] J. Reade. Eigenvalues of Positive Definite Kernels II , 1983 .

[7] V. Dose,et al. Deconvolution of appearance potential spectra II , 1979 .

[8] H. Engl,et al. Convergence rates for Tikhonov regularisation of non-linear ill-posed problems , 1989 .