In Haskell, if I wanted to get a 10 element list which only contained the number 5, I could do something like this:
take 10 $ repeat 5
Output:
[5,5,5,5,5,5,5,5,5,5]
Is there anything like this in Matlab?
In Haskell, if I wanted to get a 10 element list which only contained the number 5, I could do something like this:
take 10 $ repeat 5
Output:
[5,5,5,5,5,5,5,5,5,5]
Is there anything like this in Matlab?
It is easy to assign repeated values to an array:
x(1:10) = 5;
If you want to generate the array of elements inline in a statement try something like this:
ones(1,10) * 5
or with repmat
repmat(5, 1, 10)
x(1:10)
also works for a character, and repmat(..)
also works for a string. For example: repmat('ab', 1, 10)
gives abababababababababab
.
– Evgeni Sergeev
May 1 '13 at 7:06
The ones method is much faster than using repmat:
>> tic; for i = 1:1e6, x=5*ones(10,1); end; toc
Elapsed time is 3.426347 seconds.
>> tic; for i = 1:1e6, y=repmat(5,10,1); end; toc
Elapsed time is 20.603680 seconds.
And, in my opinion, makes for much more readable code.
Given a predefined m-by-n
matrix size and the target value val
, in your example:
m = 1;
n = 10;
val = 5;
there are currently 7
different approaches that come to my mind:
1) Using the repmat function (0.094066 seconds)
A = repmat(val,m,n)
2) Indexing on the undefined matrix with assignment (0.091561 seconds)
A(1:m,1:n) = val
3) Indexing on the target value using the ones function (0.151357 seconds)
A = val(ones(m,n))
4) Default initialization with full assignment (0.104292 seconds)
A = zeros(m,n);
A(:) = val
5) Using the ones function with multiplication (0.069601 seconds)
A = ones(m,n) * val
6) Using the zeros function with addition (0.057883 seconds)
A = zeros(m,n) + val
7) Using the repelem function (0.168396 seconds)
A = repelem(val,m,n)
After the description of each approach, between parentheses, its corresponding benchmark performed under Matlab 2017a
and with 100000
iterations. The winner is the 6th
approach, and this doesn't surprise me.
The explaination is simple: allocation generally produces zero-filled slots of memory... hence no other operations are performed except the addition of val
to every member of the matrix, and on the top of that, input arguments sanitization is very short.
The same cannot be said for the 5th
approach, which is the second fastest one because, despite the input arguments sanitization process being basically the same, on memory side three operations are being performed instead of two:
1
val
As mentioned in other answers you can use:
>> tic; x=5*ones(10,1); toc
Elapsed time is 0.000415 seconds.
An even faster method is:
>> tic; x=5; x=x(ones(10,1)); toc
Elapsed time is 0.000257 seconds.
timeit
(which is more robust than tic
/toc
) and an example with much more than 10 elements, this can be shown to be false. The first method is quicker, a test as quick as yours is unlikely to be accurate - for instance simply re-running your example a few times gives different conclusions. Try: m1 = @() 5*ones(1e7,1); x = 5; m2 = @() x(ones(1e7,1));
To set up anonymous functions which run your tests, then time using timeit(m1)
and timeit(m2)
. I get that m2
is ~3x slower. Yes, this is a valid method to create a single-valued array, but it is not a faster method.
– Wolfie
Dec 4 '17 at 17:43