Difference between revisions of "Annihilator"
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is the two-sided annihilator of $X$. In an associative ring (or semi-group) $R$ the left annihilator of an arbitrary set $X$ is a left ideal, and if $X$ is a left ideal of $R$, then $\mathfrak{Z}_l(X)$ is a two-sided ideal of $R$; in the non-associative case these statements are usually not true. | is the two-sided annihilator of $X$. In an associative ring (or semi-group) $R$ the left annihilator of an arbitrary set $X$ is a left ideal, and if $X$ is a left ideal of $R$, then $\mathfrak{Z}_l(X)$ is a two-sided ideal of $R$; in the non-associative case these statements are usually not true. | ||
+ | ===Modules=== | ||
+ | Let $M$ be a left module over a ring $R$, and $X$ a subset of $M$. The left annihilator of $X$ is | ||
+ | $$ | ||
+ | \mathfrak{Z}_l(X) = \{ z \in R : Xz = \{0\} \} \ . | ||
+ | $$ | ||
+ | Again, the left annihilator of an arbitrary set $X$ is a left ideal. | ||
===Linear spaces=== | ===Linear spaces=== |
Revision as of 12:54, 1 November 2014
left, of a set $X$ in $R$
The set $\mathfrak{Z}_l(X)$ of all elements $y$ in $R$ such that $yX = \{0\}$. Here $R$ is a ring or a semi-group (or, generally, a groupoid) with a zero. The right annihilator of a set $X$ in $R$ is defined in a similar manner as the set $$ \mathfrak{Z}_r(X) = \{ z \in R : Xz = \{0\} \} \ . $$
The set $$ \mathfrak{Z}(X) = \mathfrak{Z}_l(X) \cap \mathfrak{Z}_r(X) $$ is the two-sided annihilator of $X$. In an associative ring (or semi-group) $R$ the left annihilator of an arbitrary set $X$ is a left ideal, and if $X$ is a left ideal of $R$, then $\mathfrak{Z}_l(X)$ is a two-sided ideal of $R$; in the non-associative case these statements are usually not true.
Modules
Let $M$ be a left module over a ring $R$, and $X$ a subset of $M$. The left annihilator of $X$ is $$ \mathfrak{Z}_l(X) = \{ z \in R : Xz = \{0\} \} \ . $$ Again, the left annihilator of an arbitrary set $X$ is a left ideal.
Linear spaces
Let $V$ be a vector space over a field $K$ and $V^*$ the dual space of linear functionals on $V$. For a subset $X$ of $V$, the annihilator $$ X^\circ = \{ f \in V^* : f(X) = \{0\} \} \ . $$ The annihilator of a general set $X$ is a subspace of $V^*$ and if $\langle X \rangle$ is the subspace of $V$ generated by $X$, then $X^\circ = \langle X \rangle^\circ$.
Annihilator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Annihilator&oldid=34142