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We know that if $μ(n)=0$ then the integer n has at least one factor with multiplicity.

Now how can we determine if in the decomposition of a rational (m/n)>1 to prime factors, we have a power less than (-1)? For example

m=2*3*5*7*11;

n=2^2*3^3*5;

m/n=2^(-1)*3^(-2)*7*11

f(m/n)=0 (*for example*)

Is there any function similar to Moebius function μ in Mathematica which does this job for me? I think I can write the code, but I need a defined function in Mathematica?

thanks

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1 Answer 1

I think I found it, It should be

f[x_]:=If[SquareFreeQ[x]==True,1,0]
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If you just want a 0/1 answer, you could just do Boole@SquareFreeQ@x instead of the If –  r.m. Feb 24 '13 at 17:12

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