A note on the filtered least squares minimal norm solution of first kind equations

Vol. 14 (2008), no. 3, pp. 229–241 ON THE APPROXIMATION TO SOLUTIONS OF OPERATOR EQUATIONS BY THE LEAST SQUARES METHOD

Myroslav L. Gorbachuk
Valentyna
I. Gorbachuk

April 2015

Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...

On the perturbation of the least squares solutions in Hilbert spaces

Ding, J.
Huang, L.J.

November 1994

AbstractLet H1 and H2 be Hilbert spaces, and let T : H1 → H2 be a bounded linear operator with close...

A uniform approach to gradient methods for linear operator equations

McCormick, S.F
Rodrigue, G.H

February 1975

AbstractLet T be a bounded linear operator from one Hilbert space to another. A class of gradient me...

A note on the filtered least squares minimal norm solution of first kind equations

Luecke, Glenn R.
Hickey, Kevin R.

May 1984

AbstractA convergence theorem for J. W. Lee and P. M. Prenter's filtered least squares method for so...

The numerical solution of Fredholm integral equations of the first kind

Hickey, Kevin Ray

January 1981

A convergence theorem for Lee and Prenter\u27s filtered leastsquares method for solving the Fredholm...

Perturbation analysis of the least squares solution in Hilbert spaces

Chen, Guoliang
Wei, Musheng
Xue, Yifeng

September 1996

AbstractLet H1, H2 be two Hilbert spaces over the same field, and let T : H1 → H2 be a bounded linea...

On the perturbation of the least squares solutions in Hilbert spaces

Ding, J.
Huang, L.J.

November 1994

AbstractLet H1 and H2 be Hilbert spaces, and let T : H1 → H2 be a bounded linear operator with close...

On moment-discretization and least-squares solutions of linear integral equations of the first kind

Nashed, M.Z

February 1976

AbstractLet K(s, t) be a continuous function on [0, 1] × [0, 1], and let K be the linear integral op...

Perturbation of the least squares problem

Wei, Musheng

November 1990

AbstractConsider the least squares solutions to Ax = b Āx = b̄, where Ā = A + δA and b̄ = b + δb a...

Some aspects of the behavior of regularized solutions as the amount of smoothing is varied

Strand, O.N.

December 1976

AbstractWe consider the operator equation of the first kind, Kf = g, where K is a compact linear ope...

Minimal distance upper bounds for the perturbation of least squares problems in Hilbert spaces

Ding, J.

April 2002

AbstractLet X and Y be Hilbert spaces, and let T : X → Y be a bounded linear operator with closed ra...

New perturbation results for equality-constrained least squares problems

Ding, Jiu
Hang, Weihua

March 1998

AbstractWe present some perturbation results for least squares problems with equality constraints. R...

On finite element methods of the least squares type

Fix, George J.
Gunzburger, Max D.
Nicolaides, R.A.

December 1979

AbstractA theoretical framework for the least squares solution of first order elliptic systems is pr...

Perturbation theory for the Eckart-Young-Mirsky theorem and the constrained total least squares problem

Wei, Musheng

September 1998

AbstractGolub et al. (Linear Algebra Appl. 88/89 (1987) 317–327), J.Demmel (SIAM J. Numer. Anal. 24 ...

Regularization with differential operators. I. General theory

Locker, John
Prenter, P.M

April 1980

AbstractThe method of regularization is used to obtain least squares solutions of the linear equatio...

Vol. 14 (2008), no. 3, pp. 229–241 ON THE APPROXIMATION TO SOLUTIONS OF OPERATOR EQUATIONS BY THE LEAST SQUARES METHOD

Myroslav L. Gorbachuk
Valentyna
I. Gorbachuk

April 2015

Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...

On the perturbation of the least squares solutions in Hilbert spaces

Ding, J.
Huang, L.J.

November 1994

AbstractLet H1 and H2 be Hilbert spaces, and let T : H1 → H2 be a bounded linear operator with close...

A uniform approach to gradient methods for linear operator equations

McCormick, S.F
Rodrigue, G.H

February 1975

AbstractLet T be a bounded linear operator from one Hilbert space to another. A class of gradient me...

A note on the filtered least squares minimal norm solution of first kind equations

Luecke, Glenn R.
Hickey, Kevin R.

May 1984

AbstractA convergence theorem for J. W. Lee and P. M. Prenter's filtered least squares method for so...

The numerical solution of Fredholm integral equations of the first kind

Hickey, Kevin Ray

January 1981

A convergence theorem for Lee and Prenter\u27s filtered leastsquares method for solving the Fredholm...

Perturbation analysis of the least squares solution in Hilbert spaces

Chen, Guoliang
Wei, Musheng
Xue, Yifeng

September 1996

AbstractLet H1, H2 be two Hilbert spaces over the same field, and let T : H1 → H2 be a bounded linea...

On the perturbation of the least squares solutions in Hilbert spaces

Ding, J.
Huang, L.J.

November 1994

AbstractLet H1 and H2 be Hilbert spaces, and let T : H1 → H2 be a bounded linear operator with close...

On moment-discretization and least-squares solutions of linear integral equations of the first kind

Nashed, M.Z

February 1976

AbstractLet K(s, t) be a continuous function on [0, 1] × [0, 1], and let K be the linear integral op...

Perturbation of the least squares problem

Wei, Musheng

November 1990

AbstractConsider the least squares solutions to Ax = b Āx = b̄, where Ā = A + δA and b̄ = b + δb a...

Some aspects of the behavior of regularized solutions as the amount of smoothing is varied

Strand, O.N.

December 1976

AbstractWe consider the operator equation of the first kind, Kf = g, where K is a compact linear ope...

Minimal distance upper bounds for the perturbation of least squares problems in Hilbert spaces

Ding, J.

April 2002

AbstractLet X and Y be Hilbert spaces, and let T : X → Y be a bounded linear operator with closed ra...

New perturbation results for equality-constrained least squares problems

Ding, Jiu
Hang, Weihua

March 1998

AbstractWe present some perturbation results for least squares problems with equality constraints. R...

On finite element methods of the least squares type

Fix, George J.
Gunzburger, Max D.
Nicolaides, R.A.

December 1979

AbstractA theoretical framework for the least squares solution of first order elliptic systems is pr...

Perturbation theory for the Eckart-Young-Mirsky theorem and the constrained total least squares problem

Wei, Musheng

September 1998

AbstractGolub et al. (Linear Algebra Appl. 88/89 (1987) 317–327), J.Demmel (SIAM J. Numer. Anal. 24 ...

Regularization with differential operators. I. General theory

Locker, John
Prenter, P.M

April 1980

AbstractThe method of regularization is used to obtain least squares solutions of the linear equatio...

Vol. 14 (2008), no. 3, pp. 229–241 ON THE APPROXIMATION TO SOLUTIONS OF OPERATOR EQUATIONS BY THE LEAST SQUARES METHOD

Myroslav L. Gorbachuk
Valentyna
I. Gorbachuk

April 2015

Dedicated to the centenary of S. I. Zuchovitsky. Abstract. We consider the equation Au = f, where A ...

On the perturbation of the least squares solutions in Hilbert spaces

Ding, J.
Huang, L.J.

November 1994

AbstractLet H1 and H2 be Hilbert spaces, and let T : H1 → H2 be a bounded linear operator with close...

A uniform approach to gradient methods for linear operator equations

McCormick, S.F
Rodrigue, G.H

February 1975

AbstractLet T be a bounded linear operator from one Hilbert space to another. A class of gradient me...

A note on the filtered least squares minimal norm solution of first kind equations

Abstract

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A note on the filtered least squares minimal norm solution of first kind equations

Abstract

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