Zobrazeno 1 - 5
of 5
pro vyhledávání: '"MSC 65R30"'
This paper is concerned with the numerical analysis of the autoconvolution equation $x*x=y$ restricted to the interval [0,1]. We present a discrete constrained least squares approach and prove its convergence in $L^p(0,1),1
Autor:
Hofmann, B.
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert space setting. We define local ill-posedness of a nonlinear operator equation $F(x) = y_0$ in a solution point $x_0$ and the interplay between the no
Autor:
Hofmann, B., Fleischer, G.
In this paper we deal with the `strength' of ill-posedness for ill-posed linear operator equations Ax = y in Hilbert spaces, where we distinguish according_to_M. Z. Nashed [15] the ill-posedness of type I if A is not compact, but we have R(A) 6= R(A)
Autor:
Hofmann, B.
In this paper, we study ill-posedness concepts of nonlinear and linear inverse problems in a Hilbert space setting. We define local ill-posedness of a nonlinear operator equation $F(x) = y_0$ in a solution point $x_0$ and the interplay between the no
This paper is concerned with the numerical analysis of the autoconvolution equation $x*x=y$ restricted to the interval [0,1]. We present a discrete constrained least squares approach and prove its convergence in $L^p(0,1),1
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::d6a84c868c849eefa0313b79a90b8fdb
https://monarch.qucosa.de/id/qucosa:17495
https://monarch.qucosa.de/id/qucosa:17495