I have a question about linear codes.
Let's say we have two (n,k)
linear codes C1
and C2
with parity check matrix H1
and H2
. Is the intersection of C1
and C2
still a linear code? If so, what is its parity check matrix H3
given H1
and H2
? C3
is the intersection of C1
and C2
means H1c3=0
and H2c3=0
for all c3\in C3
.
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5This question appears to be off-topic because it is 100% about math.– Toon KrijtheFeb 28, 2014 at 21:50
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no, it is not off topic since it is related to linear code, Hamming code and error detection– 4pie0Feb 28, 2014 at 22:05
1 Answer
Yes. It is also a linear code.
A linear code of length n
and rank k
is a linear subspace C
with dimension k
of the vector space V.
Given subspaces U and W of a vector space V, then their intersection U ∩ W := {v ∈ V : v is an element of both U and W} is also a subspace of V.
To obtain H dimension this statement may be used:
Let (G,+G,∘)K be a K-vector space. Let M and N be finite-dimensional subspaces of G.
Then M+N and M∩N are finite-dimensional, and:
dim(M+N) + dim(M∩N) = dim(M) + dim(N)
so:
dim(M+N) + dim(M∩N) = k1 + k2
where dim(M∩N) is new k of the intersection.
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A subspace of V does not mean it is a linear code, right? For example, linear combinations of points in this subspace might not be in this subspace. Feb 28, 2014 at 22:05
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linear combination of points in subspace always belong to this subspace– 4pie0Feb 28, 2014 at 22:08
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I see, that makes sense. I guess you meant a linear subspace, not subspace. Do you have any idea how to find H3 based on H1 and H2? Feb 28, 2014 at 22:13
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H3 should have more rows than H1 and H2, since its null space is a linear subspace of null spaces of H1 and H2. The remaining question is, how can we find H3 based on H1 and H2. Feb 28, 2014 at 22:22