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Daniel
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irreducible elements in a ideal of $R[x_1,x_2]$
@J.C. Ottem I have a question, how can I put in the coefficients the conditions of being irreducible?
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irreducible elements in a ideal of $R[x_1,x_2]$
@Will Sawin Your polynomials has other roots right? ( Not just the finite points, What can I do to find a polynomial that only has that finite points and it´s also irreducible)?
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irreducible elements in a ideal of $R[x_1,x_2]$
Ah and I forgot something, not only must cancel on this points, and be irreducible, also has only that roots , and no more!
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irreducible elements in a ideal of $R[x_1,x_2]$
But do you mean dimension as a vector space? remember that here the "scalars" can also be polynomials
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irreducible elements in a ideal of $R[x_1,x_2]$
I don´t understand your answer, and your link is deleted.
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irreducible elements in a ideal of $R[x_1,x_2]$
But how can I prove that it´s irreducible?
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irreducible elements in a ideal of $R[x_1,x_2]$