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irreducibility test

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mmavrop
mmavrop on 14 Mar 2012
Edited: sqw on 20 Jan 2014
Hi all,
I would like to ask you, about the function irreducible.. http://www.mathworks.com/help/toolbox/mupad/stdlib/irreducible.html
I want to check if a polynomial is irreducible, but I have problem on how to declare the polynomial..I tried the examples o the abov link but matlab returns " ??? Undefined function or variable 'x'."..

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Accepted Answer

Walter Roberson
Walter Roberson on 14 Mar 2012
syms x
evalin(symengine, 'irreducible', x^2 - 2)

More Answers (3)

Stefan Wehmeier
Stefan Wehmeier on 26 Mar 2012
You have to declare it as a polynomial over GaloisField, e.g.
F = evalin(symengine, 'poly(x^2-2, Dom::GaloisField(5^7)))
feval(symengine, 'irreducible', F)
  2 Comments
mmavrop
mmavrop on 26 Mar 2012
thanks a lot!
sqw
sqw on 20 Jan 2014
Edited: sqw on 20 Jan 2014
hi I want use this function for a loop of polynomial but I cant change the polynomial with symbolic variableas.
for example i want this: syms x z=x^a(n,1)+x^a(n,2)+1 for i=1 we have z=x^19+x^12+1 %%a is a vector and change base for i=1:n i want check the z polynomial is irreducible or not?
F = evalin(symengine, 'poly(z,Dom::GaloisField(2))') F =
poly(z, [z], Dom::GaloisField(2, 1, poly(X7, [X7], IntMod(2)))) feval(symengine, 'irreducible', F)
ans =
TRUE
but this polynomial in not irreducible
the mistake of this answer come from [z] instead of [x]!!!!
please help me to solve it

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mmavrop
mmavrop on 14 Mar 2012
thank you Walter! I tried your answer and matlab returned "`proc irreducible(p) ... end`" in both cases, (x^2 - 2) and (x^2 + 2).. What am I doing wrong? I am using matlab R2009b..
  2 Comments
Walter Roberson
Walter Roberson on 14 Mar 2012
Hmmm.... Say, are you perhaps using the Maple symbolic engine? That was still possible in R2009b even though MuPAD was the default. Your ending of the procedure with "end" is a clue, in that MuPAD ends its procedures with "end_proc" but Maple ends with "end".
The internal Maple name for the procedure was irreduc so you could _try_
feval(symengine, 'irreduc', x^2 - 2)
If that doesn't work, go back to irreducible but with feval
Alexander
Alexander on 15 Mar 2012
feval did the trick for me:
>> syms x
>> feval(symengine, 'irreducible', x^2 + 2)
ans =
TRUE

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mmavrop
mmavrop on 24 Mar 2012
Thank you so much both! it works! May I ask an other question? Is there a way to find out if a polynomial over galois field is irreducible?

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