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I came across some weird behaviour when using GroebnerBasis. In m1 below, I used a Greek letter as my variable and in m2, I used a Latin letter. Both of them have no rules associated with them. Why do I get vastly different answers depending on what variable I choose?


enter image description here

Copyable code:

g = Module[{x}, 
    x /. Solve[
      z - x (1 - b - 
           b x ( (a (3 - 2 a (1 + x)))/(1 - 3 a x + 2 a^2 x^2))) == 0,
m1 = First@GroebnerBasis[\[Kappa] - g, z]
m2 = First@GroebnerBasis[k - g, z]


As pointed out by belisarius, my usage of GroebnerBasis is not entirely correct as it requires a polynomial input, whereas mine is not. This error, introduced by a copy-pasta, went unnoticed until now, as I was getting the answer that I expected when I followed through with the rest of my code using m1 from above. However, I'm not fully convinced that it is an unreasonable usage. Consider the example below:

x = (-b+Sqrt[b^2-4 a c])/2a;
p = First@GroebnerBasis[k - x,{a,b,c}]; (*get relation or cover for Riemann surface*)
q = First@GroebnerBasis[{D[p,k] == 0, p == 0},{a,b,c},k,
    MonomialOrder -> EliminationOrder]; 

Solve[q==0, b] (*get condition on b for double root or branch point*) 

{{b -> -2 Sqrt[a] Sqrt[c]}, {b -> 2 Sqrt[a] Sqrt[c]}}

which is correct. So my interpretation is that it is OK to use GroebnerBasis in such cases, but I'm not all too familiar with the deep theory behind it, so I could be completely wrong here.

P.S. I heard that if you mention GroebnerBasis three times in your post, Daniel Lichtblau will answer your question :)

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@yoda Sorry, deleted my previous comment. Are the solutions you get from Solve[ ] polynomials? –  belisarius Jun 1 '11 at 5:17
@yoda I thought that GroebnerBasis works only for polys ... –  belisarius Jun 1 '11 at 5:23
@yoda I have no idea, but I think you should edit your question with this info about usage –  belisarius Jun 1 '11 at 5:38
@yoda Let's wait for Daniel ... :) –  belisarius Jun 1 '11 at 6:10
I think there was a bug behind the crash with on ordering. Will be fixed. Not sure what will happen then (hang or new result). Difference between results, in absence of crash, probably due to internal variable ordering differences. If both results are correct, that is. Traveling right now, might get time to look more carefully next week. –  Daniel Lichtblau Jun 4 '11 at 15:46

2 Answers 2

up vote 4 down vote accepted

The bug that was shown by these examples will be fixed in version 9. Offhand I do not know how to evade it in versions 8 and prior. If I recall correctly it was caused by an intermediate numeric overflow in some code that was checking whether a symbolic polynomial coefficient might be zero.

For some purposes it might be suitable to specify more variables and possibly a non-default term order. Also clearing denominators can be helpful at least in cases where that is a valid thing to do. That said, I do not know if these tactics would help in this example.

I'll look some more at this code but probably not in the near future.

Daniel Lichtblau

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Thanks Daniel. This particular example doesn't matter, as I chose an example for which I knew the answer. –  r.m. Jun 23 '11 at 14:10

This may be related to the fact that Mathematica does not try all variable orders in functions like Simplify. Here is an example:

ClearAll[a, b, c]
expr = (c^4 b^2)/(c^4 b^2 + a^4 b^2 + c^2 a^2 (1 - 2 b^2));
Simplify[expr /. {a -> b, b -> a}]
   (b^2 c^4)/(a^4 b^2 + a^2 (1 - 2 b^2) c^2 + b^2 c^4)
   (a^2 c^4)/(b^2 c^2 + a^2 (b^2 - c^2)^2)

Adam Strzebonski explained that:

...one can try FullSimplify with all possible orderings of chosen variables. Of course, this multiplies the computation time by Factorial[Length[variables]]...

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+1 Can you post a link to Adam's explanation? –  belisarius Jun 1 '11 at 13:11
@belisarius link added –  Mr.Wizard Jun 1 '11 at 14:28
Thanks a lot –  belisarius Jun 1 '11 at 14:32
W it might be related to this –  r.m. Jun 2 '11 at 14:21
@yoda I don't think so; I've got the fix for that in my init.m and I still get this behavior. –  Mr.Wizard Jun 2 '11 at 18:30

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