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Re: Can this be vectorized?
- Subject: Re: Can this be vectorized?
- From: "Richard G. French" <rfrench(at)wellesley.edu>
- Date: Tue, 02 Nov 1999 17:29:08 -0500
- Newsgroups: comp.lang.idl-pvwave,comp.soft-sys.matlab
- Organization: Wellesley College
- References: <slrn813n7b.jb4.davis@mygir.davis.net>
- Reply-To: rfrench(at)mediaone.net
- Xref: news.doit.wisc.edu comp.lang.idl-pvwave:17057 comp.soft-sys.matlab:57912
"John E. Davis" wrote:
>
> I am looking for either a matlab or IDL solution to this problem.
> Suppose that I have two 1-d arrays, `I' and `X', where `I' is an integer
> array and `X' is a floating point array. `I' is assumed to be sorted in
> ascending order. I would like to produce a third array `Y' that is
> formed from the elements of `X' as follows (pseudocode):
>
> len = length (X); #number of elements of X
>
> i = 0;
> j = 0;
>
> while (i < len)
> {
> last_I = I[i];
> sum = X[i];
> i = i + 1;
> while ((i < len)
> AND (I[i] == last_I))
> {
> sum = sum + X[i];
> i = i + 1;
> }
> Y[j] = sum;
> j = j + 1;
> }
>
> For example, suppose
>
> I = [ 1 2 3 3 4 4 4 5]
> X = [ a b c d e f g h]
>
> Then, Y would be 5 element array:
>
> Y = [a b (c+d) (e+f+g) h]
>
> One partially vectorized pseudocode solution would be:
>
> jj = 0
> for (i = min(I) to max(I))
> {
> J = WHERE (I == i);
> Y[jj] = sum_elements (X[J])
> jj = jj + 1
> }
>
> What is the best way to vectorize this? In reality, X consists of
> about one million elements, so I would prefer a solution that is
> memory efficient. I apologize for posting to both newsgroups, but I
> am looking for a solution in either language.
>
> Thanks,
> --John
John - I have an IDL solution that is not completely vectorize but which
at least does vectorize filling the cases in which there is only one
contributor to the sum. I have not tried it out extensively but I'd be
interested in knowing if it saves you any time on your million-point
runs:
i=[0,1,1,2,3,4,4,4,5]
x=[-3,5,2.5,7.,12.,-4.,10.,2.3,7]
; find indices in I array for which neighbors differ
; do this for upper and lower end
ishift=shift(i,1)
jshift=shift(i,-1)
li=where(i ne ishift,nli)
lj=where(i ne jshift)
result=fltarr(nli) ; save storage for final answer
; fill elements that have only one contributor
ll=where(li eq lj,nll)
if nll gt 0 then result(ll)=x[li[ll]]
; sum up elements where there are more than one
lm=where(li ne lj,nlm)
if nlm gt 0 then $
for n=0,nlm-1 do begin
k=lm[n]
result[k]=total(x[li[k]:lj[k]])
endfor
; print the results
print,i
print,x
print,result
end