ho to implement Sets in matlab

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yogi yaspranika
yogi yaspranika el 1 de Sept. de 2017
Comentada: Steven Lord el 29 de Oct. de 2022
hey everybody,, how to use Matlab in the set. problem: A = {1,2}, A ^ 2 = {(1,1), (1,2), (2,2) (2,1)};
how to find A ^ 100 by using Matlab?
  2 comentarios
John BG
John BG el 1 de Sept. de 2017
In this question the operation A^2 means
% find all combinations with repetition.
Since A is defined containing 2 digits only, A^100 is the same as asking
% find all combinations with repetition of 100 bits
100 bits are 30 digits in binary.
John BG <mailto:jgb2012@sky.com jgb2012@sky.com>
Walter Roberson
Walter Roberson el 2 de Sept. de 2017
Slight rephrasing there: Numbers of 100 binary digits require just over 30 decimal digits.

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Walter Roberson
Walter Roberson el 1 de Sept. de 2017
P = 100;
A = uint8([1, 2]); %if your stored values exceed 255 then change the uint8 to suit
lenA = length(A);
if lenA <= intmax('uint8')
sstype = 'uint8';
elseif lenA <= intmax('uint16')
sstype = 'uint16';
elseif lenA <= intmax('uint64')
sstype = 'uint64';
else
error('A is too large to be able to subscript into. How did you even manage to create it??');
end
num_AP = lenA^P;
try
AP = zeros(num_AP, P, class(A));
catch
whoA = whos('A');
bytes_per_entry = whoA.bytes ./ lenA;
A_bytes_required = num_AP * P * bytes_per_entry;
error('You need to install more memory; you need at least %g bytes of memory', A_bytes_required);
end
T = zeros(1, P, sstype);
for J = 1 : num_AP
AP(J,:) = A(T+1);
for K = P : -1 : 1
if T(K) ~= lenA - 1
T(K) = T(K) + 1;
break;
else
T(K) = 0;
end
end
end
On my system, the maximum that can be constructed is for P = 28, which needs about 6.7 gigabytes.
As far as I know, there are no implementations of the x64 architecture that have more than 48 memory pins. In the case where A is a matrix with only 2 elements, that would give a maximum of P = 42, because 2^43 * 43 entries * 1 byte/entry > 2^48 bytes. However, I wrote the code assuming that you have access to a classified computer with memory capacities exceeding 2*10^9 times as much information stored on Earth as of 2013. (Don't tell me if I am wrong -- I am not authorized to know.)
The code was designed to reduce the memory requirements, not for efficiency.
  2 comentarios
yogi yaspranika
yogi yaspranika el 2 de Sept. de 2017
Editada: yogi yaspranika el 2 de Sept. de 2017
thank's you for answer, sorry I mean the use of not matrices, but for the set if
A^2 = (1,1) (1,2) (2,2) (2,1)
A^3 = (1,1,1)(1,1,2)(1,2,1)(1,2,2)(2,1,1)(2,1,2)(2,2,1)(2,2,2,)
Walter Roberson
Walter Roberson el 2 de Sept. de 2017
MATLAB does not have a set data structure. It has array data structures and it has cell array data structures. In my code, each row of AP is one of the members of A^P, where A^P is understood to be ordered P-tuples.
If you were using sets then the only solutions would be:
A^0 = {} %the empty set
A^1 = {}, {1}, {2}
A^2 = {}, {1}, {2}, {1, 2}
A^(numel(A)+1) and higher are identical to A^(numel(A)) because, for example, {1, 2, 1} as a set is the same as {1, 2} and {2, 1}: by definition sets are unordered and have no duplicates.

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Jan
Jan el 1 de Sept. de 2017
Editada: Jan el 1 de Sept. de 2017
How many elements will this set have? Do you want to store 2^100 * 2 elements? A double needs 8 byte and Matlab uses about 100 bytes overhead for each vector. Then you need about:
1267650600228229401496703205376 * (2 * 8 + 100) Byte
147e15 PetaByte. This will let the solar system explode due to the required energy consumption.
So please tell us, which problem you actually want to solve. It is very easy to calculate a specific element and there cannot be any use in storing such a huge array.
  2 comentarios
José-Luis
José-Luis el 1 de Sept. de 2017
Editada: José-Luis el 1 de Sept. de 2017
+1 Come on, it's not even a googolplex.
John D'Errico
John D'Errico el 1 de Sept. de 2017
"how to find A^100 by using Matlab?"
Answer: you don't. You find a better (i.e., doable) way to solve the problem.

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Mahi
Mahi el 29 de Oct. de 2022
If X and Y are two sets such that n ( X ) = 17, n ( Y ) = 23 and n ( X ∪ Y ) = 38,
find n ( X ∩ Y ).
  1 comentario
Steven Lord
Steven Lord el 29 de Oct. de 2022
You shouldn't need to use MATLAB to solve this problem. Draw a picture.

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