Question related to vectorized matrix operation.
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i have two matrices A and B; A is say (Nx3) where N is rather large like 1000+... B is (nx2) where n is rather smaller of the order 10 or so.. but it does not matter it is smaller than A row size. i would like to compute
for i = 1:N
D = ( A(i,1)- B(1:n,1) )^2 + (A(i,2) - B(1:n,2)^2 )
end
for e.g. if N is 4, and n =2 then D = a [4x2] matrix...
I am able to perform this using for loops without much difficulty but would like to try using the vectorized Matrix operations instead for improving the performance and speed. Thanks in advance.
Respuesta aceptada
Stephen23
el 22 de En. de 2017
Editada: Andrei Bobrov
el 23 de En. de 2017
>> A = randi(9,4,3)
A =
4 2 9
9 4 4
5 4 8
4 2 8
>> B = randi(9,3,2)
B =
3 2
6 4
3 1
>> D = bsxfun(@minus,A(:,1),B(:,1).').^2 + bsxfun(@minus,A(:,2),B(:,2).').^2
D =
1 8 2
40 9 45
8 1 13
1 8 2
4 comentarios
Pappu Murthy
el 23 de En. de 2017
Editada: Stephen23
el 23 de En. de 2017
Andrei Bobrov
el 23 de En. de 2017
I'm corrected Stephen's answer
Stephen23
el 23 de En. de 2017
Thank you Andrei Bobrov.
Pappu Murthy
el 23 de En. de 2017
Más respuestas (1)
Andrei Bobrov
el 23 de En. de 2017
Editada: Andrei Bobrov
el 23 de En. de 2017
My variants:
For R2016b and later
>> C2 = squeeze(sum((A(:,1:2) - permute(B,[3,2,1])).^2,2))
C2 =
1 8 2
40 9 45
8 1 13
1 8 2
and with bsxfun:
>> C3 = squeeze(sum(bsxfun(@minus,A(:,1:2),permute(B,[3,2,1])).^2,2))
C3 =
1 8 2
40 9 45
8 1 13
1 8 2
1 comentario
Pappu Murthy
el 23 de En. de 2017
Editada: Pappu Murthy
el 23 de En. de 2017
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