proof of homomorphic image of a $\mathrm{\Sigma }$-structure is a $\mathrm{\Sigma }$-structure

We need to show that $\mathrm{im}(f)$ is closed under functions. For every constant symbol $c$ of $\mathrm{\Sigma }$, $c^{𝔅}=f(c^{𝔄})$. Hence $c^{𝔅}\in \mathrm{im}(f)$. Also, if $b_1,\mathrm{\dots },b_n\in \mathrm{im}(f)$ and $F$ is an $n$-ary function symbol of $\mathrm{\Sigma }$, then for some $a_1,\mathrm{\dots },a_n\in 𝔄$ we have

$$F^{𝔅}(b_1,\mathrm{\dots },b_n)=F^{𝔅}(f(a_1),\mathrm{\dots },f(a_n))=f(F^{𝔄}(a_1,\mathrm{\dots },a_n)).$$

Hence $F^{𝔅}(b_1,\mathrm{\dots },b_n)\in \mathrm{im}(f)$.

Title	proof of homomorphic image of a $\mathrm{\Sigma }$-structure is a $\mathrm{\Sigma }$-structure
Canonical name	ProofOfHomomorphicImageOfASigmastructureIsASigmastructure
Date of creation	2013-03-22 13:46:47
Last modified on	2013-03-22 13:46:47
Owner	almann (2526)
Last modified by	almann (2526)
Numerical id	4
Author	almann (2526)
Entry type	Proof
Classification	msc 03C07