Difference between revisions of "Banach-Stone theorem"
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''Stone–Banach theorem'' | ''Stone–Banach theorem'' | ||
| − | For a compact [[Hausdorff space|Hausdorff space]] | + | For a compact [[Hausdorff space|Hausdorff space]] $ X $, let $ C(X) $ denote the [[Banach space|Banach space]] of all continuous scalar-valued functions on $ X $, equipped with the usual sup-norm: |
| + | $$ | ||
| + | \forall f \in C(X): \qquad | ||
| + | \| f \| \stackrel{\text{df}}{=} \sup(\{ |f(x)| \mid x \in X \}). | ||
| + | $$ | ||
| + | If $ \varphi $ is a surjective [[Homeomorphism|homeomorphism]] from a compact space $ Y $ onto a compact space $ X $, and if $ \chi $ is a continuous and uni-modular scalar-valued function on $ Y $, then | ||
| + | $$ | ||
| + | \forall f \in {C_{0}}(X): \qquad | ||
| + | T(f) \stackrel{\text{df}}{=} \chi \cdot (f \circ \varphi), | ||
| + | $$ | ||
| + | defines a linear isometry from $ {C_{0}}(X) $ onto $ {C_{0}}(Y) $. The Banach–Stone theorem asserts that any linear surjective isometry $ T: C(X) \to C(Y) $ is of the form above. Here, if $ X $ is not necessarily compact, then $ {C_{0}}(X) $ is the space of continuous scalar-valued functions that vanish at infinity (i.e., the continuous scalar-valued functions $ f $ such that for all $ \epsilon > 0 $, there is a compact subset $ K $ of $ X $ such that $ |f(x)| < \epsilon $ for $ x \in X \setminus K $). A uni-modular function $ \chi $ is one for which $ |\chi(y)| = 1 $ for all $ y \in Y $. | ||
| − | + | The theorem was proved in the real case for compact metric spaces by S. Banach ([[#References|[a2]]]); M.H. Stone ([[#References|[a10]]]) proved that the assumption of metrizability was superfluous. Subsequently, the theorem was extended to spaces of both real- or complex-valued functions defined on a locally compact Hausdorff space. | |
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| − | The theorem was proved in the real case for compact metric spaces by S. Banach [[#References|[a2]]]; M.H. Stone [[#References|[a10]]] proved that the assumption of metrizability was superfluous. Subsequently the theorem was extended to spaces of both real- or complex-valued functions defined on a locally compact Hausdorff space. | ||
The theorem has been extended further into several directions: | The theorem has been extended further into several directions: | ||
| − | + | # A Banach space $ E $ has the '''Banach–Stone Property''' if and only if, the Banach space $ {C_{0}}(X,E) $ of continuous $ E $-valued functions is isometric with $ {C_{0}}(Y,E) $ if and only if $ X $ and $ Y $ are homeomorphic; the class of Banach spaces with this property includes the strictly convex Banach spaces and the Banach spaces with strictly convex dual (see e.g. [[#References|[a3]]], [[#References|[a8]]]). | |
| + | # If there is an isomorphism $ T: C(X) \to C(Y) $ such that $ \| T \| \| T^{-1} \| = 1 + \epsilon < 2 $, then $ X $ and $ Y $ are homeomorphic and consequently, $ C(X) $ and $ C(Y) $ are isometric ([[#References|[a1]]], [[#References|[a4]]]). Here, $ 2 $ is the best bound ([[#References|[a5]]]). | ||
| + | # The theorem holds for several classes of sub-spaces of the spaces $ C(X) $, the most important one being the class of [[Uniform algebra|uniform algebras]]. | ||
| − | + | A joint approach to the last two extensions gave rise to the perturbation theory of uniform algebras. A Banach algebra $ B $ is an '''$ \epsilon $-perturbation''' (or '''$ \epsilon $-metric perturbation''') of a [[Banach algebra|Banach algebra]] $ A $ if and only if there is an isomorphism $ T: A \to B $ such that $ \| T \| \| T^{-1} \| < 1 + \epsilon $. In such a situation, the algebras $ A $ and $ B $ must share several important properties ([[#References|[a7]]], [[#References|[a9]]]); if the algebra $ B $ is forced to be isometrically isomorphic with $ A $, then the algebra $ A $ is called '''stable'''. Examples of stable uniform algebras include $ C(X) $, $ A(D) $ and $ {H^{\infty}}(D) $, with $ D $ the unit disc. | |
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| − | A joint approach to the last two extensions gave rise to the perturbation theory of uniform algebras. A Banach algebra | ||
Isometries of several other classes of Banach spaces have been shown to follow the same general pattern, similar to (a1); one often refers to such results also as Banach–Stone theorems (for a given class of spaces; see e.g. [[#References|[a6]]]). | Isometries of several other classes of Banach spaces have been shown to follow the same general pattern, similar to (a1); one often refers to such results also as Banach–Stone theorems (for a given class of spaces; see e.g. [[#References|[a6]]]). | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | |
| + | <table> | ||
| + | <TR><TD valign="top">[a1]</TD><TD valign="top"> | ||
| + | D. Amir, “On isomorphisms of continuous function spaces”, ''Israel J. Math.'', '''3''' (1965), pp. 205–210.</TD></TR> | ||
| + | <TR><TD valign="top">[a2]</TD><TD valign="top"> | ||
| + | S. Banach, “Théorie des opérations linéaires”, PWN (1932).</TD></TR> | ||
| + | <TR><TD valign="top">[a3]</TD><TD valign="top"> | ||
| + | E. Behrends, “$ M $-structure and the Banach–Stone theorem”, ''Lecture Notes in Mathematics'', '''736''', Springer (1979).</TD></TR> | ||
| + | <TR><TD valign="top">[a4]</TD><TD valign="top"> | ||
| + | M. Cambern, “On isomorphisms with small bound”, ''Proc. Amer. Math. Soc.'', '''18''' (1967), pp. 1062–1066.</TD></TR> | ||
| + | <TR><TD valign="top">[a5]</TD><TD valign="top"> | ||
| + | H.B. Cohen, “A bound-two isomorphism between $ C(X) $ Banach spaces”, ''Proc. Amer. Math. Soc.'', '''50''', (1975), pp. 215–217.</TD></TR> | ||
| + | <TR><TD valign="top">[a6]</TD><TD valign="top"> | ||
| + | R.J. Fleming, J.E. Jamison, “Isometries on Banach spaces: a survey”, ''Analysis, Geometry and Groups: a Riemann Legacy Volume'', Hadronic Press (1993), pp. 52–123.</TD></TR> | ||
| + | <TR><TD valign="top">[a7]</TD><TD valign="top"> | ||
| + | K. Jarosz, “Perturbations of Banach algebras”, ''Lecture Notes in Mathematics'', '''1120''', Springer (1985).</TD></TR> | ||
| + | <TR><TD valign="top">[a8]</TD><TD valign="top"> | ||
| + | K. Jarosz, “Small isomorphisms of $ C(X,E) $ spaces”, ''Pacific J. Math.'', '''138''': 2 (1989), pp. 295–315.</TD></TR> | ||
| + | <TR><TD valign="top">[a9]</TD><TD valign="top"> | ||
| + | R. Rochberg, “Deformation of uniform algebras on Riemann surfaces”, ''Pacific J. Math.'', '''121''': 1 (1986), pp. 135–181.</TD></TR> | ||
| + | <TR><TD valign="top">[a10]</TD><TD valign="top"> | ||
| + | M.H. Stone, “Applications of the theory of Boolean rings to general topology”, ''Trans. Amer. Math. Soc.'', '''41''' (1937), pp. 375–481.</TD></TR> | ||
| + | </table> | ||
Latest revision as of 17:08, 6 January 2017
Stone–Banach theorem
For a compact Hausdorff space $ X $, let $ C(X) $ denote the Banach space of all continuous scalar-valued functions on $ X $, equipped with the usual sup-norm: $$ \forall f \in C(X): \qquad \| f \| \stackrel{\text{df}}{=} \sup(\{ |f(x)| \mid x \in X \}). $$ If $ \varphi $ is a surjective homeomorphism from a compact space $ Y $ onto a compact space $ X $, and if $ \chi $ is a continuous and uni-modular scalar-valued function on $ Y $, then $$ \forall f \in {C_{0}}(X): \qquad T(f) \stackrel{\text{df}}{=} \chi \cdot (f \circ \varphi), $$ defines a linear isometry from $ {C_{0}}(X) $ onto $ {C_{0}}(Y) $. The Banach–Stone theorem asserts that any linear surjective isometry $ T: C(X) \to C(Y) $ is of the form above. Here, if $ X $ is not necessarily compact, then $ {C_{0}}(X) $ is the space of continuous scalar-valued functions that vanish at infinity (i.e., the continuous scalar-valued functions $ f $ such that for all $ \epsilon > 0 $, there is a compact subset $ K $ of $ X $ such that $ |f(x)| < \epsilon $ for $ x \in X \setminus K $). A uni-modular function $ \chi $ is one for which $ |\chi(y)| = 1 $ for all $ y \in Y $.
The theorem was proved in the real case for compact metric spaces by S. Banach ([a2]); M.H. Stone ([a10]) proved that the assumption of metrizability was superfluous. Subsequently, the theorem was extended to spaces of both real- or complex-valued functions defined on a locally compact Hausdorff space.
The theorem has been extended further into several directions:
- A Banach space $ E $ has the Banach–Stone Property if and only if, the Banach space $ {C_{0}}(X,E) $ of continuous $ E $-valued functions is isometric with $ {C_{0}}(Y,E) $ if and only if $ X $ and $ Y $ are homeomorphic; the class of Banach spaces with this property includes the strictly convex Banach spaces and the Banach spaces with strictly convex dual (see e.g. [a3], [a8]).
- If there is an isomorphism $ T: C(X) \to C(Y) $ such that $ \| T \| \| T^{-1} \| = 1 + \epsilon < 2 $, then $ X $ and $ Y $ are homeomorphic and consequently, $ C(X) $ and $ C(Y) $ are isometric ([a1], [a4]). Here, $ 2 $ is the best bound ([a5]).
- The theorem holds for several classes of sub-spaces of the spaces $ C(X) $, the most important one being the class of uniform algebras.
A joint approach to the last two extensions gave rise to the perturbation theory of uniform algebras. A Banach algebra $ B $ is an $ \epsilon $-perturbation (or $ \epsilon $-metric perturbation) of a Banach algebra $ A $ if and only if there is an isomorphism $ T: A \to B $ such that $ \| T \| \| T^{-1} \| < 1 + \epsilon $. In such a situation, the algebras $ A $ and $ B $ must share several important properties ([a7], [a9]); if the algebra $ B $ is forced to be isometrically isomorphic with $ A $, then the algebra $ A $ is called stable. Examples of stable uniform algebras include $ C(X) $, $ A(D) $ and $ {H^{\infty}}(D) $, with $ D $ the unit disc.
Isometries of several other classes of Banach spaces have been shown to follow the same general pattern, similar to (a1); one often refers to such results also as Banach–Stone theorems (for a given class of spaces; see e.g. [a6]).
References
| [a1] | D. Amir, “On isomorphisms of continuous function spaces”, Israel J. Math., 3 (1965), pp. 205–210. |
| [a2] | S. Banach, “Théorie des opérations linéaires”, PWN (1932). |
| [a3] | E. Behrends, “$ M $-structure and the Banach–Stone theorem”, Lecture Notes in Mathematics, 736, Springer (1979). |
| [a4] | M. Cambern, “On isomorphisms with small bound”, Proc. Amer. Math. Soc., 18 (1967), pp. 1062–1066. |
| [a5] | H.B. Cohen, “A bound-two isomorphism between $ C(X) $ Banach spaces”, Proc. Amer. Math. Soc., 50, (1975), pp. 215–217. |
| [a6] | R.J. Fleming, J.E. Jamison, “Isometries on Banach spaces: a survey”, Analysis, Geometry and Groups: a Riemann Legacy Volume, Hadronic Press (1993), pp. 52–123. |
| [a7] | K. Jarosz, “Perturbations of Banach algebras”, Lecture Notes in Mathematics, 1120, Springer (1985). |
| [a8] | K. Jarosz, “Small isomorphisms of $ C(X,E) $ spaces”, Pacific J. Math., 138: 2 (1989), pp. 295–315. |
| [a9] | R. Rochberg, “Deformation of uniform algebras on Riemann surfaces”, Pacific J. Math., 121: 1 (1986), pp. 135–181. |
| [a10] | M.H. Stone, “Applications of the theory of Boolean rings to general topology”, Trans. Amer. Math. Soc., 41 (1937), pp. 375–481. |
How to Cite This Entry:
Banach-Stone theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Banach-Stone_theorem&oldid=40147
Banach-Stone theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Banach-Stone_theorem&oldid=40147
This article was adapted from an original article by K. Jarosz (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article