extracting subsequences of binary string

20 Aug. 2013
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Aktualisiert 19 Okt. 2013
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as would be the code for the following string have the next subsequences ?
STRING
1(1), 0(2), 1(3), 1(4), 0(5), 0(6), 1(7), 0(8), 0(9), 1(10), 1(11), 1(12), 1(13), 0(14), 0(15), 0(16), 1(17), 1(18), 1(19), 0(20)
SUBSEQUENCES
01: 1(01), 0(02), 1(03), 1(04) -> [1,0,1,1],
02: 1(01), 1(03), 0(05), 1(07) -> [1,1,0,1],
03: 1(01), 1(04), 1(07), 1(10) -> [1,1,1,1],
04: 1(01), 0(05), 0(09), 1(13) -> [1,0,0,1],
05: 1(01), 0(06), 1(11), 0(16) -> [1,0,1,0],
06: 1(01), 1(07), 1(13), 1(19) -> [1,1,1,1],
07: 0(02), 1(03), 1(04), 0(05) -> [0,1,1,0],
08: 0(02), 1(04), 0(06), 0(08) -> [0,1,0,0],
09: 0(02), 0(05), 0(08), 1(11) -> [0,0,0,1],
10: 0(02), 0(06), 1(10), 0(14) -> [0,0,1,0],
11: 0(02), 1(07), 1(12), 1(17) -> [0,1,1,1],
12: 0(02), 0(08), 0(14), 0(20) -> [0,0,0,0],
13: 1(03), 1(04), 0(05), 0(06) -> [1,1,0,0],
14: 1(03), 0(05), 1(07), 0(09) -> [1,0,1,0],
15: 1(03), 0(06), 0(09), 1(12) -> [1,0,0,1],
16: 1(03), 1(07), 1(11), 0(15) -> [1,1,1,0],
17: 1(03), 0(08), 1(13), 1(18) -> [1,0,1,1],
18: 1(04), 0(05), 0(06), 1(07) -> [1,0,0,1],
19: 1(04), 0(06), 0(08), 1(10) -> [1,0,0,1],
20: 1(04), 1(07), 1(10), 1(13) -> [1,1,1,1],
21: 1(04), 0(08), 1(12), 0(16) -> [1,0,1,0],
22: 1(04), 0(09), 0(14), 1(19) -> [1,0,0,1],
23: 0(05), 0(06), 1(07), 0(08) -> [0,0,1,0],
24: 0(05), 1(07), 0(09), 1(11) -> [0,1,0,1],
25: 0(05), 0(08), 1(11), 0(14) -> [0,0,1,0],
26: 0(05), 0(09), 1(13), 1(17) -> [0,0,1,1],
27: 0(05), 1(10), 0(15), 0(20) -> [0,1,0,0],
28: 0(06), 1(07), 0(08), 0(09) -> [0,1,0,0],
29: 0(06), 0(08), 1(10), 1(12) -> [0,0,1,1],
30: 0(06), 0(09), 1(12), 0(15) -> [0,0,1,0],
31: 0(06), 1(10), 0(14), 1(18) -> [0,1,0,1],
32: 1(07), 0(08), 0(09), 1(10) -> [1,0,0,1],
33: 1(07), 0(09), 1(11), 1(13) -> [1,0,1,1],
34: 1(07), 1(10), 1(13), 0(16) -> [1,1,1,0],
35: 1(07), 1(11), 0(15), 1(19) -> [1,1,0,1],
36: 0(08), 0(09), 1(10), 1(11) -> [0,0,1,1],
37: 0(08), 1(10), 1(12), 0(14) -> [0,1,1,0],
38: 0(08), 1(11), 0(14), 1(17) -> [0,1,0,1],
39: 0(08), 1(12), 0(16), 0(20) -> [0,1,0,0],
40: 0(09), 1(10), 1(11), 1(12) -> [0,1,1,1],
41: 0(09), 1(11), 1(13), 0(15) -> [0,1,1,0],
42: 0(09), 1(12), 0(15), 1(18) -> [0,1,0,1],
43: 1(10), 1(11), 1(12), 1(13) -> [1,1,1,1],
44: 1(10), 1(12), 0(14), 0(16) -> [1,1,0,0],
45: 1(10), 1(13), 0(16), 1(19) -> [1,1,0,1],
46: 1(11), 1(12), 1(13), 0(14) -> [1,1,1,0],
47: 1(11), 1(13), 0(15), 1(17) -> [1,1,0,1],
48: 1(11), 0(14), 1(17), 0(20) -> [1,0,1,0],
49: 1(12), 1(13), 0(14), 0(15) -> [1,1,0,0],
50: 1(12), 0(14), 0(16), 1(18) -> [1,0,0,1],
51: 1(13), 0(14), 0(15), 0(16) -> [1,0,0,0],
52: 1(13), 0(15), 1(17), 1(19) -> [1,0,1,1],
53: 0(14), 0(15), 0(16), 1(17) -> [0,0,0,1],
54: 0(14), 0(16), 1(18), 0(20) -> [0,0,1,0],
55: 0(15), 0(16), 1(17), 1(18) -> [0,0,1,1],
56: 0(16), 1(17), 1(18), 1(19) -> [0,1,1,1],
57: 1(17), 1(18), 1(19), 0(20) -> [1,1,1,0],

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 Akzeptierte Antwort

Andrei Bobrov
Andrei Bobrov am 21 Aug. 2013
Bearbeitet: Andrei Bobrov am 21 Aug. 2013

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N = 20;
n = 4;
A = hankel(1:N-n+1,N-n+1:N);
k = 0:n-1;
idx = [];
for ii = 1:size(A,1)
p = A(ii,:);
while p(end,end) + k(end) <= N
p = [p;p(end,:)+k];
end
idx=[idx;p];
end
or
N = 20;
n = 4;
A = hankel(1:N-n+1,N-n+1:N);
k = 0:n-1;
c = ceil((N - A(:,end) + 1)/k(end));
i2 = cumsum(c);
i1 = i2 - c + 1;
idx = zeros(i2(end),n);
for jj = 1:N-n+1
idx(i1(jj):i2(jj),:) = bsxfun(@plus,A(jj,:),(0:c(jj)-1)'*k);
end
ADD
s = [1, 0, 1, 1, 0, 0, 1, 0, 0, 1, 1, 1, 1, 0, 0, 0, 1, 1, 1, 0];
[j1,j2,j2] = unique(s(idx),'rows')
out = [j1, histc(j2,1:max(j2))/i2(end)]; % This row corrected

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FRANCISCO
FRANCISCO am 21 Aug. 2013
thank you very much, that command should now be used to calculate the number of times to repeat each subsequence? is to calculate the probability by dividing the number of occurrences of that subsequence by the total number of subsequences. But I'm not sure which command used to count the number of occurrences of each subsequence
Andrei Bobrov
Andrei Bobrov am 21 Aug. 2013
see ADD part in my answer
FRANCISCO
FRANCISCO am 21 Aug. 2013
I get the following error:
Error using horzcat CAT arguments dimensions are not consistent.
Do not find me subsequences. j2 be the number of occurrences of each subsequence?
Andrei Bobrov
Andrei Bobrov am 21 Aug. 2013
Op! My typo. Corrected.
FRANCISCO
FRANCISCO am 21 Aug. 2013
N = 20;
n = 4;
A = hankel(1:N-n+1,N-n+1:N);
k = 0:n-1;
idx = [];
for ii = 1:size(A,1) p = A(ii,:); while p(end,end) + k(end) <= N
p = [p;p(end,:)+k];
end
idx=[idx;p];
end
s = [1, 0, 1, 1, 0, 0, 1, 0, 0, 1, 1, 1, 1, 0, 0, 0, 1, 1, 1, 0];
[j1,j2,j2] = unique(s(idx),'rows')
out = [j1, histc(j2,1:max(i2))];
This makes me:
Undefined function or variable 'i2'.
and interpret the outputs? are the number of occurrences of each subsequence?
many thanks
Andrei Bobrov
Andrei Bobrov am 21 Aug. 2013
I corrected.
FRANCISCO
FRANCISCO am 21 Aug. 2013
sorry, I have not understood the code. This it does is calculate the number of times to repeat each subsequence?. It calculates the sub but if calculated occurrences each subsequence?. it?
Andrei Bobrov
Andrei Bobrov am 21 Aug. 2013
Again correct last row in my code.

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Weitere Antworten (2)

Roger Stafford
Roger Stafford am 20 Aug. 2013
Bearbeitet: Roger Stafford am 21 Aug. 2013

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n = 20;
d = 4;
c = zeros(sum([1,floor((d:n-1)/(d-1))]),d); % Allocate space for c
j = 0;
for k = 1:n-d+1
r = 1;
while k+r*(d-1) <= n
j = j+1;
c(j,:) = k:r:k+r*(d-1);
r = r+1;
end
end
The c array will be a 57 x 4 matrix of subsequence indices taken from 1:20.
c =
1 2 3 4
1 3 5 7
1 4 7 10
.....
17 18 19 20
If you replace the line "c(j,:) = k:r:k+r*(d-1);" by
c(j,:) = s(k:r:k+r*(d-1));
where s is your string, this will generate the subsequence of binary strings you are (apparently) asking for.

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Roger Stafford
Roger Stafford am 21 Aug. 2013
I have modified the above code so as to allocate the proper size for the c array.
FRANCISCO
FRANCISCO am 21 Aug. 2013
thank you very much, that command should now be used to calculate the number of times to repeat each subsequence? is to calculate the probability by dividing the number of occurrences of that subsequence by the total number of subsequences. But I'm not sure which command used to count the number of occurrences of each subsequence
FRANCISCO
FRANCISCO am 19 Okt. 2013
One question, as I can do with structure for you automatically calculate subsequences of length 4-20? ie, d = 4:20 but applying for so I said why not have the same dimension:
if true
% code
for d=4:20
c(d)=zeros(sum([1,floor((d:n-1)/(d-1))]),d);
j=0;
for k=1:n-d+1
r=1;
while k+r*(d-1)<=n
j=j+1;
c(j,:)=s(k:r:k+r*(d-1));% s es la cadena binaria / me da las subsecuencias
r=r+1;
end
end
end
end

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Roger Stafford
Roger Stafford am 22 Aug. 2013
Bearbeitet: Roger Stafford am 22 Aug. 2013

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Here is a slightly shorter version:
n = 20;
d = 4;
f2 = cumsum([0,floor((n-1:-1:d-1)/(d-1))]);
f1 = f2(1:end-1)+1;
f2 = f2(2:end);
c = repmat(0:d-1,f2(end),1);
for k = 1:length(f1)
c(f1(k),:) = c(f1(k),:) + k;
c(f1(k):f2(k),:) = cumsum(c(f1(k):f2(k),:),1);
end

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