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The Numerical Solution of Fredholm Integral Equations of the First Kind

Author: John T. Jefferies
Publisher:
ISBN:
Category : Integral equations
Languages : en
Pages : 26

Book Description

The Numerical Solution of Fredholm Integral Equations of the First Kind

Author: John T. Jefferies
Publisher:
ISBN:
Category : Integral equations
Languages : en
Pages : 26

Book Description

The Numerical Solution of Integral Equations of the Second Kind

Author: Kendall E. Atkinson
Publisher: Cambridge University Press
ISBN: 0521583918
Category : Mathematics
Languages : en
Pages : 572

Book Description
This book provides an extensive introduction to the numerical solution of a large class of integral equations.

The Numerical Solution of Fredholm Integral Equations of the First Kind

Author: Mohammad Iqbal
Publisher:
ISBN:
Category :
Languages : en
Pages :

Book Description

The numerical solution of Fredholm integral equations of the first kind

Author: Kevin Ray Hickey
Publisher:
ISBN:
Category :
Languages : en
Pages : 266

Book Description

The Numerical Solution of Fredholm Integral Equations of the First Kind

Author: J. Wrigley
Publisher:
ISBN:
Category : Fredholm equations
Languages : en
Pages : 262

Book Description

The Numerical Solution of Fredholm Integral Equations of the First Kind

Author: Jack Wrigley
Publisher:
ISBN:
Category : Fredholm equations
Languages : en
Pages : 186

Book Description

On the Numerical Solution of Fredholm Integral Equations of the First Kind

Author: Grace Wahba
Publisher:
ISBN:
Category :
Languages : en
Pages : 61

Book Description
The report is concerned with the numerical solution of a Fredholm integral equation of the first kind. Two methods in the literature seem to have resulted in satisfactory numerical examples. The first method is called the method of regularization of Tihonov and was studied experimentally by Tihonov and Glasko. The second method was discussed by Strand and Westwater and is called 'statistical estimation' of the solution. Both of these methods can be embedded in the general theory of the approximation of continuous linear functionals in a reproducing kernel Hilbert space. The overall purpose of this note is to demonstrate this statement in some considerable practical detail.