How to design or create or generate a bijective ring map?
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1$\begingroup$ I don't get the question. $\endgroup$– Martin BrandenburgCommented Sep 5, 2010 at 9:49
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$\begingroup$ What's the actual question? $\endgroup$– Robin ChapmanCommented Sep 5, 2010 at 10:36
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$\begingroup$ We can validate ring map whether bijective or not, but inversely thinking where does these ring map come from? How to generate them is the actual question $\endgroup$– Simple carlCommented Sep 5, 2010 at 11:12
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In generality (this is tagged "commutative algebra", so let's talk commutative rings) I wonder if there is more than taking generators of each side and writing the images as polynomials in the generators of the other side. This is a candidate for a bijection of rings, but so far isn't a homomorphism (you need to check the relations hold). In other words express each ring as a quotient of a polynomial ring, set up homomorphisms from the polynomial rings, and then show the kernels are what they should be.
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$\begingroup$ It's great. Could you show an example in code of singular or macaulay. $\endgroup$ Commented Sep 5, 2010 at 10:18