Difference between revisions of "Quasi-solution"
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A generalized solution of a certain ill-posed problem that (under sufficiently general conditions) satisfies, in contrast to a proper solution, the condition of being well-posed in the sense of Hadamard. | A generalized solution of a certain ill-posed problem that (under sufficiently general conditions) satisfies, in contrast to a proper solution, the condition of being well-posed in the sense of Hadamard. | ||
− | Let | + | Let $ X , Y $ |
+ | be metric spaces, let $ A : X \rightarrow Y $ | ||
+ | and let $ M $ | ||
+ | be a subset of $ X $. | ||
+ | A quasi-solution of the equation | ||
− | + | $$ \tag{1 } | |
+ | A x = y | ||
+ | $$ | ||
− | on the set | + | on the set $ M $ |
+ | for given $ y $ | ||
+ | in $ Y $ | ||
+ | is an element $ \overline{x} $ | ||
+ | in $ M $ | ||
+ | that minimizes the residual $ \rho ( A x , y ) $ | ||
+ | for $ x $ | ||
+ | in $ M $. | ||
+ | If equation (1) has a proper solution $ x _ {0} $ | ||
+ | on $ M $, | ||
+ | then $ x _ {0} $ | ||
+ | is also quasi-solution. | ||
− | The dependence of the set of quasi-solutions on | + | The dependence of the set of quasi-solutions on $ y $ |
+ | is conveniently represented as a superposition of two mappings: | ||
− | + | $$ | |
+ | \overline{x} = A ^ {- 1} P y , | ||
+ | $$ | ||
− | where | + | where $ A ^ {- 1} $ |
+ | is the (generally multi-valued) inverse of $ A $ | ||
+ | and $ P $ | ||
+ | is the metric projection operator in $ Y $ | ||
+ | onto the set $ N = A M $. | ||
+ | This superposition enables one to reduce the study of the properties of quasi-solutions to that of the mappings $ A ^ {- 1} $ | ||
+ | and $ P $. | ||
+ | For example, if $ N $ | ||
+ | is a [[Chebyshev set|Chebyshev set]] and $ A ^ {- 1} $ | ||
+ | is single-valued and continuous on $ N $, | ||
+ | then the problem of finding a quasi-solution is well-posed. If $ P $ | ||
+ | or $ A ^ {- 1} $ | ||
+ | is many-valued, then stability of the set $ K $ | ||
+ | can be formulated in terms of $ \beta $-continuity (continuity of set-valued functions). | ||
− | + | $ X $ | |
+ | and $ Y $ | ||
+ | are generally taken to be normed linear spaces, which enables one to obtain more complete and definitive results. Then the problem of finding quasi-solutions is well-posed if $ Y $ | ||
+ | is strictly convex, $ A $ | ||
+ | is a continuous invertible linear operator and $ M $ | ||
+ | is a convex compactum. There are a number of other combinations of conditions that ensure the well-posedness of the problem of finding quasi-solutions, in which some conditions are strengthened while others are weakened (for example, $ A $ | ||
+ | is a closed linear operator but $ Y $ | ||
+ | is a Hilbert space). | ||
− | There exists a number of methods for determining sets | + | There exists a number of methods for determining sets $ M $ |
+ | that guarantee an effective determination of quasi-solutions. One of the most widespread methods consists in the following: One considers a third space $ Z $ (all or some of the spaces $ X , Y , Z $ | ||
+ | may coincide) and a linear operator $ B : Z \rightarrow X $ | ||
+ | for which $ B ^ {- 1} $ | ||
+ | is unbounded. One takes for the set $ M = M _ {r} $ | ||
+ | the image of a ball | ||
− | + | $$ | |
+ | M _ {r} = B S _ {r} ; \ \ | ||
+ | S _ {r} = \{ {z \in Z } : {\| z \| \leq r } \} . | ||
+ | $$ | ||
In this form the problem of finding a quasi-solution is a mathematical programming problem: To minimize the functional | In this form the problem of finding a quasi-solution is a mathematical programming problem: To minimize the functional | ||
− | + | $$ | |
+ | f ( z) = \| A B z - y \| | ||
+ | $$ | ||
− | subject to | + | subject to $ \| z \| \leq r $. |
+ | For Hilbert spaces $ Y $ | ||
+ | and $ Z $ | ||
+ | one obtains a [[Quadratic programming|quadratic programming]] problem. | ||
− | In the case of well-posedness of quasi-solutions, of great importance in applications are stability estimates, in which the dependence of | + | In the case of well-posedness of quasi-solutions, of great importance in applications are stability estimates, in which the dependence of $ \| \overline{x} _ {1} - \overline{x} _ {2} \| $ |
+ | on $ \| y _ {1} - y _ {2} \| $ | ||
+ | is given. If the method for determining the set $ M $ | ||
+ | is as described above, then stability of a quasi-solution is characterized by the function | ||
− | + | $$ | |
+ | \Omega ( \tau , r ) = | ||
+ | $$ | ||
− | + | $$ | |
+ | = \ | ||
+ | \sup \{ {\| x _ {1} - x _ {2} \| } : | ||
+ | {x _ {i} = B z _ {i} , \| z _ {i} \| \leq r , | ||
+ | \| A x _ {1} - A x _ {2} \| \leq \tau , i = 1 , 2 } \} . | ||
+ | $$ | ||
The following relation holds: | The following relation holds: | ||
− | + | $$ | |
+ | \Omega ( \tau , r ) = \omega ( \tau , 2 r ) , | ||
+ | $$ | ||
− | where | + | where $ \omega ( \tau , r ) $ |
+ | is the solution of the extremal problem $ \omega ( \tau , r ) = \sup \{ {\| B z \| } : {\| z \| \leq r, \| A B z \| \leq \tau } \} $. | ||
− | For Hilbert spaces | + | For Hilbert spaces $ Z $ |
+ | and $ Y $ | ||
+ | there are expressions for $ \omega ( \tau , r ) $ | ||
+ | in closed form. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> V.K. Ivanov, "On linear problems which are not well-posed" ''Soviet Math. Dokl.'' , '''4''' : 3 (1962) pp. 981–983 ''Dokl. Akad. Nauk SSSR'' , '''145''' : 2 (1962) pp. 270–272</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> V.K. Ivanov, "On ill-posed problems" ''Mat. Sb.'' , '''61''' : 2 (1962) pp. 211–223 (In Russian)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> O.A. Liskovets, "Stability of quasi-solutions of equations with a closed operator" ''Diff. Eq.'' , '''7''' : 9 (1971) pp. 1300–1303 ''Differentsial. Uravn.'' , '''7''' : 9 (1971) pp. 1707–1709</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> V.A. Morozov, "Linear and nonlinear ill-posed problems" ''J. Soviet Math.'' , '''4''' : 6 (1975) pp. 706–755 ''Itogi Nauk. i Tekhn. Mat. Anal.'' , '''11''' (1973) pp. 129–178</TD></TR><TR><TD valign="top">[5]</TD> <TD valign="top"> A.N. Tikhonov, V.I. [V.I. Arsenin] Arsenine, "Solution of ill-posed problems" , Wiley (1977) (Translated from Russian)</TD></TR><TR><TD valign="top">[6]</TD> <TD valign="top"> V.I. Krylov, V.V. Bobkov, P.I. Monastyrnyi, "Computing methods of higher mathematics" , '''1–2''' , Minsk (1972–1975) (In Russian)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> V.K. Ivanov, "On linear problems which are not well-posed" ''Soviet Math. Dokl.'' , '''4''' : 3 (1962) pp. 981–983 ''Dokl. Akad. Nauk SSSR'' , '''145''' : 2 (1962) pp. 270–272</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> V.K. Ivanov, "On ill-posed problems" ''Mat. Sb.'' , '''61''' : 2 (1962) pp. 211–223 (In Russian)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> O.A. Liskovets, "Stability of quasi-solutions of equations with a closed operator" ''Diff. Eq.'' , '''7''' : 9 (1971) pp. 1300–1303 ''Differentsial. Uravn.'' , '''7''' : 9 (1971) pp. 1707–1709</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> V.A. Morozov, "Linear and nonlinear ill-posed problems" ''J. Soviet Math.'' , '''4''' : 6 (1975) pp. 706–755 ''Itogi Nauk. i Tekhn. Mat. Anal.'' , '''11''' (1973) pp. 129–178</TD></TR><TR><TD valign="top">[5]</TD> <TD valign="top"> A.N. Tikhonov, V.I. [V.I. Arsenin] Arsenine, "Solution of ill-posed problems" , Wiley (1977) (Translated from Russian)</TD></TR><TR><TD valign="top">[6]</TD> <TD valign="top"> V.I. Krylov, V.V. Bobkov, P.I. Monastyrnyi, "Computing methods of higher mathematics" , '''1–2''' , Minsk (1972–1975) (In Russian)</TD></TR></table> | ||
− | |||
− | |||
====Comments==== | ====Comments==== | ||
− | Frequently the operator | + | Frequently the operator $ B $ |
+ | is such that $ B ^ {- 1} $ | ||
+ | is a differential operator. On a suitable space, $ B $ | ||
+ | is then a compact operator, so that the set $ M $ | ||
+ | is a compactum. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> B. Hofmann, "Regularization for applied inverse and ill-posed problems" , Teubner (1986)</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> C.W. Groetsch, "The theory of Tikhonov regularization for Fredholm equations of the first kind" , Pitman (1984)</TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> J. Baumeister, "Stable solution of inverse problems" , Vieweg (1987)</TD></TR><TR><TD valign="top">[a4]</TD> <TD valign="top"> M.Z. Nashed (ed.) , ''Genealized inverses and applications'' , Acad. Press (1976)</TD></TR><TR><TD valign="top">[a5]</TD> <TD valign="top"> V.A. Morozov, "Methods for solving incorrectly posed problems" , Springer (1984) (Translated from Russian)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> B. Hofmann, "Regularization for applied inverse and ill-posed problems" , Teubner (1986)</TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> C.W. Groetsch, "The theory of Tikhonov regularization for Fredholm equations of the first kind" , Pitman (1984)</TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> J. Baumeister, "Stable solution of inverse problems" , Vieweg (1987)</TD></TR><TR><TD valign="top">[a4]</TD> <TD valign="top"> M.Z. Nashed (ed.) , ''Genealized inverses and applications'' , Acad. Press (1976)</TD></TR><TR><TD valign="top">[a5]</TD> <TD valign="top"> V.A. Morozov, "Methods for solving incorrectly posed problems" , Springer (1984) (Translated from Russian)</TD></TR></table> |
Latest revision as of 02:01, 21 January 2022
A generalized solution of a certain ill-posed problem that (under sufficiently general conditions) satisfies, in contrast to a proper solution, the condition of being well-posed in the sense of Hadamard.
Let $ X , Y $ be metric spaces, let $ A : X \rightarrow Y $ and let $ M $ be a subset of $ X $. A quasi-solution of the equation
$$ \tag{1 } A x = y $$
on the set $ M $ for given $ y $ in $ Y $ is an element $ \overline{x} $ in $ M $ that minimizes the residual $ \rho ( A x , y ) $ for $ x $ in $ M $. If equation (1) has a proper solution $ x _ {0} $ on $ M $, then $ x _ {0} $ is also quasi-solution.
The dependence of the set of quasi-solutions on $ y $ is conveniently represented as a superposition of two mappings:
$$ \overline{x} = A ^ {- 1} P y , $$
where $ A ^ {- 1} $ is the (generally multi-valued) inverse of $ A $ and $ P $ is the metric projection operator in $ Y $ onto the set $ N = A M $. This superposition enables one to reduce the study of the properties of quasi-solutions to that of the mappings $ A ^ {- 1} $ and $ P $. For example, if $ N $ is a Chebyshev set and $ A ^ {- 1} $ is single-valued and continuous on $ N $, then the problem of finding a quasi-solution is well-posed. If $ P $ or $ A ^ {- 1} $ is many-valued, then stability of the set $ K $ can be formulated in terms of $ \beta $-continuity (continuity of set-valued functions).
$ X $ and $ Y $ are generally taken to be normed linear spaces, which enables one to obtain more complete and definitive results. Then the problem of finding quasi-solutions is well-posed if $ Y $ is strictly convex, $ A $ is a continuous invertible linear operator and $ M $ is a convex compactum. There are a number of other combinations of conditions that ensure the well-posedness of the problem of finding quasi-solutions, in which some conditions are strengthened while others are weakened (for example, $ A $ is a closed linear operator but $ Y $ is a Hilbert space).
There exists a number of methods for determining sets $ M $ that guarantee an effective determination of quasi-solutions. One of the most widespread methods consists in the following: One considers a third space $ Z $ (all or some of the spaces $ X , Y , Z $ may coincide) and a linear operator $ B : Z \rightarrow X $ for which $ B ^ {- 1} $ is unbounded. One takes for the set $ M = M _ {r} $ the image of a ball
$$ M _ {r} = B S _ {r} ; \ \ S _ {r} = \{ {z \in Z } : {\| z \| \leq r } \} . $$
In this form the problem of finding a quasi-solution is a mathematical programming problem: To minimize the functional
$$ f ( z) = \| A B z - y \| $$
subject to $ \| z \| \leq r $. For Hilbert spaces $ Y $ and $ Z $ one obtains a quadratic programming problem.
In the case of well-posedness of quasi-solutions, of great importance in applications are stability estimates, in which the dependence of $ \| \overline{x} _ {1} - \overline{x} _ {2} \| $ on $ \| y _ {1} - y _ {2} \| $ is given. If the method for determining the set $ M $ is as described above, then stability of a quasi-solution is characterized by the function
$$ \Omega ( \tau , r ) = $$
$$ = \ \sup \{ {\| x _ {1} - x _ {2} \| } : {x _ {i} = B z _ {i} , \| z _ {i} \| \leq r , \| A x _ {1} - A x _ {2} \| \leq \tau , i = 1 , 2 } \} . $$
The following relation holds:
$$ \Omega ( \tau , r ) = \omega ( \tau , 2 r ) , $$
where $ \omega ( \tau , r ) $ is the solution of the extremal problem $ \omega ( \tau , r ) = \sup \{ {\| B z \| } : {\| z \| \leq r, \| A B z \| \leq \tau } \} $.
For Hilbert spaces $ Z $ and $ Y $ there are expressions for $ \omega ( \tau , r ) $ in closed form.
References
[1] | V.K. Ivanov, "On linear problems which are not well-posed" Soviet Math. Dokl. , 4 : 3 (1962) pp. 981–983 Dokl. Akad. Nauk SSSR , 145 : 2 (1962) pp. 270–272 |
[2] | V.K. Ivanov, "On ill-posed problems" Mat. Sb. , 61 : 2 (1962) pp. 211–223 (In Russian) |
[3] | O.A. Liskovets, "Stability of quasi-solutions of equations with a closed operator" Diff. Eq. , 7 : 9 (1971) pp. 1300–1303 Differentsial. Uravn. , 7 : 9 (1971) pp. 1707–1709 |
[4] | V.A. Morozov, "Linear and nonlinear ill-posed problems" J. Soviet Math. , 4 : 6 (1975) pp. 706–755 Itogi Nauk. i Tekhn. Mat. Anal. , 11 (1973) pp. 129–178 |
[5] | A.N. Tikhonov, V.I. [V.I. Arsenin] Arsenine, "Solution of ill-posed problems" , Wiley (1977) (Translated from Russian) |
[6] | V.I. Krylov, V.V. Bobkov, P.I. Monastyrnyi, "Computing methods of higher mathematics" , 1–2 , Minsk (1972–1975) (In Russian) |
Comments
Frequently the operator $ B $ is such that $ B ^ {- 1} $ is a differential operator. On a suitable space, $ B $ is then a compact operator, so that the set $ M $ is a compactum.
References
[a1] | B. Hofmann, "Regularization for applied inverse and ill-posed problems" , Teubner (1986) |
[a2] | C.W. Groetsch, "The theory of Tikhonov regularization for Fredholm equations of the first kind" , Pitman (1984) |
[a3] | J. Baumeister, "Stable solution of inverse problems" , Vieweg (1987) |
[a4] | M.Z. Nashed (ed.) , Genealized inverses and applications , Acad. Press (1976) |
[a5] | V.A. Morozov, "Methods for solving incorrectly posed problems" , Springer (1984) (Translated from Russian) |
Quasi-solution. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Quasi-solution&oldid=15713