20071207, 14:29  #1 
Dec 2007
3 Posts 
On the basis of finite fields
I need solve this question:
We know that a finite filed F_(2^2n) can be seen as the 2ndimension linear space on F_2.If a is a primitive element in F_(2^2n), apparently,ord(a)=(2^2n)1. And we choose an appropriate integer k, the set{1,a,a^2,...,a^(n1);a^k,a^(k+1),a^(k+2),...,a^(k+n1)} would be a basis of F_(2^2n) on F_2. My question is:If the integer k is choosen from 1 to ( (2^2n)1 ),how many bases can we get? I did a test,and guess the answer is 2^(2n1). But how can it prove? 
20071207, 14:48  #2 
"Nancy"
Aug 2002
Alexandria
2,467 Posts 
Moved to Math.
Alex 
20071207, 15:17  #3  
"Bob Silverman"
Nov 2003
North of Boston
2×3×31×41 Posts 
Quote:
Huh? The question makes no sense to me. Any basis for GF(2^k) will be a set of elements of size k. GF(2^k) forms (as you said) a vector space of degree k over its ground field. Therefore any basis set has size k. Are you perhaps asking for how many different normal bases exist? i.e. the number of primitive elements? 

20071207, 15:32  #4 
"Nancy"
Aug 2002
Alexandria
100110100011_{2} Posts 
The way I read it, he wants half of the base vectors to be 1, a, a^2, a^3, ... and the other half a^k, a^(k+1), a^(k+2), ... for a suitably chosen k. The question is how many distinct, proper bases you get if you let k vary.
Alex Last fiddled with by akruppa on 20071207 at 15:34 Reason: typo 
20071208, 04:44  #5  
Dec 2007
3 Posts 
Quote:
Who can help me solve that question? 

20071211, 06:08  #6  
Feb 2005
404_{8} Posts 
Quote:
Lemma. The number of pairs of relatively prime polynomials (f,g) over GF(2) both of degree at most d equals 2^(2d+1)  1. Now to prove your result let us notice that any linear combination of the set {1,a,a^2,...,a^(n1);a^k,a^(k+1),a^(k+2),...,a^(k+n1)} can be written as f(a) + a^k*g(a) where f(x), g(x) are some polynomials of degree at most n1 with coefficients from GF(2). Therefore, the elements of this set are linearly dependent over GF(2) if and only if a^k = f(a)/g(a) for some polynomials f(x), g(x) as above. Since a^k goes over all nonzero elements of GF(2^(2n)) as k goes from 0 to 2^(2n)2, the number of k that deliver a basis {1,a,a^2,...,a^(n1);a^k,a^(k+1),a^(k+2),...,a^(k+n1)} equals 2^(2n)1 minus the number of elements of GF(2^(2n)) representable as f(a)/g(a) for some polynomials f(x), g(x) as above. Note that if a nonzero element of GF(2^(2n)) is representable as f(a)/g(a) then f(x) and g(x) can be chosen relatively prime. Moreover, if f(a)/g(a) = u(a)/v(a) where f(x),g(x),u(x),v(x) are polynomials of degree at most n then a is a root of f(x)*v(x)g(x)*u(x) that can be true only if f(x)*v(x)g(x)*u(x) is the zero polynomial, i.e., f(x)*v(x)=g(x)*u(x). If in addition gcd(f(x),g(x))=1 and gcd(u(x),v(x))=1 then with necessity we have f(x)=u(x) and g(x)=v(x). Therefore, the number of elements of GF(2^(2n)) equals to the number of pairs of relatively prime polynomials f(x),g(x) with degree at most n1. According to Lemma, this number is 2^(2(n1)+1)1=2^(2n1)1. Finally, we have that the number of different bases of the form {1,a,a^2,...,a^(n1);a^k,a^(k+1),a^(k+2),...,a^(k+n1)} equals 2^(2n)1  (2^(2n1)1) = 2^(2n1). Last fiddled with by maxal on 20071211 at 06:13 

20071213, 04:21  #7  
Dec 2007
3 Posts 
Quote:
"maxal",thank you! Your method is very beautiful,I am full of gratitude for your help! 

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