How can I multiply each element of a cell array, defined as an anonymous function handle?

26 Sep 2018
1 Answer
Answer Accepted
Updated 4 Oct 2019
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1 vote

I have a cell array FS which contains a function handle at each cell. I want to multiply the output of each cell with each other (giving each function handle the SAME input). The function handles in each cell are identical except for the i value stored in them.
Define array as:
N = 5;
for i=1:N
FS{i} = @(x) x+i;
end
i can obtain my desired result by a simple loop:
x = 3;
P = FS{1}(x)
for i=2:length(FS)
P = P * FS{i}(x)
end
However, I wish to define this operation as a new function handle, performing the same action:
b = @(x) FS{1}(x) * FS{2}(x) * FS{3}(x) ... * FS{N}(x)
but this should of course be flexible for any number of elements (FS).

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 Accepted Answer

Walter Roberson
Walter Roberson on 26 Sep 2018

1 vote

b = @(x) prod(cellfun(@(F) F(x), FS))
This assumes that the output of each handle is scalar even if x is non-scalar.
If you really do mean * as in algebraic matrix multiplication, which assumes that the results of each function handle will be either a scalar or a matrix whose number of columns is the same as the number of rows of output of the next function handle (e.g., square matrices work well) then
b = @(x) fold(@mtimes, cellfun(@(F) F(x), FS), 1);

9 Comments
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Jonas Holfelt
Jonas Holfelt on 26 Sep 2018
it does need to be an algebraic matrix multiplication, since my result is not necessarily scalar. I have another more complex configuration where the output of each function handle is actually an object of an abstract class. So it is important that the format would correspond to:
b = @(x) FS{1}(x) * FS{2}(x) * FS{3}(x) ... * FS{N}(x)
Is there a way to avoid using fold? I would prefer to avoid using the symbolic toolbox. But thanks a lot !
Walter Roberson
Walter Roberson on 26 Sep 2018
This use of fold comes down to
F = @mtimes;
result = v{1};
for j = 2:numel(v)
result = F(result, v{j});
end
In other words, just program your own.
With non-scalar outputs you will need to add 'uniform', 0 to the cellfun() call.
Walter Roberson
Walter Roberson on 26 Sep 2018
Probably the best thing to do would be to write your own routine that accepted a cell array of function handles and an input array, and implemented the matrix product in a loop.
Using anonymous functions is not always the most efficient route. Indeed, it is seldom the most efficient route: tests show that anonymous functions are distinctly slower than regular functions.
Jonas Holfelt
Jonas Holfelt on 26 Sep 2018
I see. I have tried to figure another way, but the way my script is structured, it seems like the most flexible way. In this case I am trading flexibility over efficiency. Thanks for the reply
Walter Roberson
Walter Roberson on 26 Sep 2018
You can still use
b = @(x) MultFuns(FS, x)
assuming you put the work code into function MultFuns .
And other b might be anonymous functions that did the work more in-line.
There is no shame in writing a helper function to implement functionality that Mathworks does not provide in your available toolboxes.
Jonas Holfelt
Jonas Holfelt on 27 Sep 2018
Thanks. I ended up making a function like that, defined as:
function cascadedOut = cascadeCells(fcellArray,F)
cascadedOut = fcellArray{1}(F);
for i=2:length(fcellArray)
cascadedOut = cascadedOut * fcellArray{i}(F);
end
end
This worked!
Walter Roberson
Walter Roberson on 27 Sep 2018
Looks good, and is probably faster than the alternatives.
Georgios Koutsakis
Georgios Koutsakis on 4 Oct 2019
Hi, interesting approach.
Could you please share the final working version of the code?
I tried to replicate it from by end, but something doesn't seem quite right.
Thanks

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