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2.4.5 Radical membership
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2.4 Applications
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2.4.3 Gaussian algorithm
2.4.4 Kernel of a ring homomorphism
Lemma 2..15
Let
be an affine ring homomorphism
given by
,
.
Then
is generated by
in
.
Remark 2..16
For
use lemma
2.7
.
S
INGULAR
example:
ring r=...; ideal null; ideal F=...; preimage(r,F,null);
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be an affine ring homomorphism
![\begin{displaymath}\Phi : R=K[x_1,\ldots , x_m]/I\longrightarrow
K[y_1,\ldots , y_n]/(g_1,\ldots , g_s)\end{displaymath}](img85.gif){kind=small}
![$f_i=\Phi (x_i)\in K[y_1,\ldots , y_n]/(g_1,\ldots , g_s)\;$](img86.gif){kind=small}
,
.
is generated by
![\begin{displaymath}(g_1(\underline{y} ),\ldots , g_s(\underline{y} )\,,\:(x_1-f_...
...
)),\ldots , (x_m-f_m(\underline{y} )))\cap K[x_1,\ldots ,x_m] \end{displaymath}](img89.gif){kind=small}
![$K[x_1,\ldots , x_m]/I$](img90.gif){kind=small}
.
use lemma 2.7.