Difference between revisions of "Locally algebraic operator"
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A [[Linear operator|linear operator]] such that for each element of the space under consideration there exists a polynomial in this operator (with scalar coefficients) annihilating this element. | A [[Linear operator|linear operator]] such that for each element of the space under consideration there exists a polynomial in this operator (with scalar coefficients) annihilating this element. | ||
| − | Let | + | Let $X$ be a [[Linear space|linear space]] over a [[Field|field]] $\mathbf{F}$. Let $L ( X )$ be the set of all linear operators with domains and ranges in $X$ and let |
| − | + | \begin{equation*} L _ { 0 } ( X ) = \{ A \in L ( X ) : \operatorname { dom } A = X \}. \end{equation*} | |
| − | Denote by | + | Denote by $\mathbf{F} [ t ]$ the algebra of all polynomials in the variable $t$ and with coefficients in $\mathbf{F}$. Usually, in applications it is assumed that the field $\mathbf{F}$ is of characteristic zero and algebraically closed (cf. also [[Algebraically closed field|Algebraically closed field]]; [[Characteristic of a field|Characteristic of a field]]). |
| − | Thus, a linear operator | + | Thus, a linear operator $T \in L _ { 0 } ( X )$ is said to be locally algebraic if for any $x \in X$ there exists a non-zero polynomial $p ( t ) \in \mathbf{F} [ t ]$ such that $p ( T ) x = 0$ (cf. [[#References|[a1]]]). If there exists a non-zero polynomial $p ( t ) \in \mathbf{F} [ t ]$ such that $p ( T ) x = 0$ for every $x \in X$, then $T$ is said to be algebraic (cf. [[Algebraic operator|Algebraic operator]]). Thus, an algebraic operator is locally algebraic, but not conversely. |
| − | A continuous locally algebraic operator acting in a complete linear [[Metric space|metric space]] | + | A continuous locally algebraic operator acting in a complete linear [[Metric space|metric space]] $X$ is algebraic (cf. [[#References|[a4]]]; for Banach spaces, see [[#References|[a1]]]). |
| − | A locally algebraic operator | + | A locally algebraic operator $T$ acting in a complete linear metric space $X$ (over the field $\mathbf{C}$ of complex numbers) and that is right invertible (cf. [[Algebraic analysis|Algebraic analysis]]) but not invertible, i.e. |
| − | + | \begin{equation*} \ker T = \{ x \in X : T x = 0 \} \neq \{ 0 \}, \end{equation*} | |
| − | is not continuous (cf. [[#References|[a3]]]). The assumption about the completeness of | + | is not continuous (cf. [[#References|[a3]]]). The assumption about the completeness of $X$ is essential. |
| − | If | + | If $T \in L _ { 0 } ( X )$ satisfies, for any $p ( t ) , q ( t ) \in \mathbf{F} [ t ]$, the conditions: |
| − | i) | + | i) $\operatorname{dim}\operatorname {ker}p(T)=\operatorname{dim}\operatorname{ker}T\cdot\operatorname{degree}p ( T ) $; |
| − | ii) | + | ii) $\operatorname { dim } \operatorname { ker }q ( T ) p ( T ) \leq \operatorname { dim } \operatorname { ker } q ( T ) + \operatorname { dim } \operatorname { ker } p ( T )$; |
| − | iii) | + | iii) $T$ is locally algebraic; then there exists an operator $A \in L _ { 0 } ( X )$ such that |
| − | + | \begin{equation*} T A - A T = I \end{equation*} | |
| − | (cf. [[#References|[a2]]], [[#References|[a5]]]). This means that | + | (cf. [[#References|[a2]]], [[#References|[a5]]]). This means that $T$ is not an [[Algebraic operator|algebraic operator]]. |
====References==== | ====References==== | ||
| − | <table>< | + | <table><tr><td valign="top">[a1]</td> <td valign="top"> I. Kaplansky, "Infinite Abelian groups" , Univ. Michigan Press (1954)</td></tr><tr><td valign="top">[a2]</td> <td valign="top"> J. Mikusiński, "Extension de l'espace linéaire avec dérivation" ''Studia Math.'' , '''16''' (1958) pp. 156–172</td></tr><tr><td valign="top">[a3]</td> <td valign="top"> D. Przeworska-Rolewicz, "Algebraic analysis" , PWN&Reidel (1988)</td></tr><tr><td valign="top">[a4]</td> <td valign="top"> D. Przeworska–Rolewicz, S. Rolewicz, "Equations in linear spaces" , PWN (1968)</td></tr><tr><td valign="top">[a5]</td> <td valign="top"> R. Sikorski, "On Mikusiński's algebraic theory of differential equations" ''Studia Math.'' , '''16''' (1958) pp. 230–236</td></tr></table> |
Latest revision as of 10:55, 2 July 2020
A linear operator such that for each element of the space under consideration there exists a polynomial in this operator (with scalar coefficients) annihilating this element.
Let $X$ be a linear space over a field $\mathbf{F}$. Let $L ( X )$ be the set of all linear operators with domains and ranges in $X$ and let
\begin{equation*} L _ { 0 } ( X ) = \{ A \in L ( X ) : \operatorname { dom } A = X \}. \end{equation*}
Denote by $\mathbf{F} [ t ]$ the algebra of all polynomials in the variable $t$ and with coefficients in $\mathbf{F}$. Usually, in applications it is assumed that the field $\mathbf{F}$ is of characteristic zero and algebraically closed (cf. also Algebraically closed field; Characteristic of a field).
Thus, a linear operator $T \in L _ { 0 } ( X )$ is said to be locally algebraic if for any $x \in X$ there exists a non-zero polynomial $p ( t ) \in \mathbf{F} [ t ]$ such that $p ( T ) x = 0$ (cf. [a1]). If there exists a non-zero polynomial $p ( t ) \in \mathbf{F} [ t ]$ such that $p ( T ) x = 0$ for every $x \in X$, then $T$ is said to be algebraic (cf. Algebraic operator). Thus, an algebraic operator is locally algebraic, but not conversely.
A continuous locally algebraic operator acting in a complete linear metric space $X$ is algebraic (cf. [a4]; for Banach spaces, see [a1]).
A locally algebraic operator $T$ acting in a complete linear metric space $X$ (over the field $\mathbf{C}$ of complex numbers) and that is right invertible (cf. Algebraic analysis) but not invertible, i.e.
\begin{equation*} \ker T = \{ x \in X : T x = 0 \} \neq \{ 0 \}, \end{equation*}
is not continuous (cf. [a3]). The assumption about the completeness of $X$ is essential.
If $T \in L _ { 0 } ( X )$ satisfies, for any $p ( t ) , q ( t ) \in \mathbf{F} [ t ]$, the conditions:
i) $\operatorname{dim}\operatorname {ker}p(T)=\operatorname{dim}\operatorname{ker}T\cdot\operatorname{degree}p ( T ) $;
ii) $\operatorname { dim } \operatorname { ker }q ( T ) p ( T ) \leq \operatorname { dim } \operatorname { ker } q ( T ) + \operatorname { dim } \operatorname { ker } p ( T )$;
iii) $T$ is locally algebraic; then there exists an operator $A \in L _ { 0 } ( X )$ such that
\begin{equation*} T A - A T = I \end{equation*}
(cf. [a2], [a5]). This means that $T$ is not an algebraic operator.
References
| [a1] | I. Kaplansky, "Infinite Abelian groups" , Univ. Michigan Press (1954) |
| [a2] | J. Mikusiński, "Extension de l'espace linéaire avec dérivation" Studia Math. , 16 (1958) pp. 156–172 |
| [a3] | D. Przeworska-Rolewicz, "Algebraic analysis" , PWN&Reidel (1988) |
| [a4] | D. Przeworska–Rolewicz, S. Rolewicz, "Equations in linear spaces" , PWN (1968) |
| [a5] | R. Sikorski, "On Mikusiński's algebraic theory of differential equations" Studia Math. , 16 (1958) pp. 230–236 |
How to Cite This Entry:
Locally algebraic operator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Locally_algebraic_operator&oldid=13689
Locally algebraic operator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Locally_algebraic_operator&oldid=13689
This article was adapted from an original article by Danuta Przeworska-Rolewicz (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article