Puzzler: Quickly tell if two absolute indices (a,b) are four connected for n x m matrix.
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function flag = isFourConnected(a,b,n,m)
%
% a,b: indices of interest a ~= b
% n,m: size of matrix of interest
%
% flag: True if indices a and b are four connected
% in a matrix of size n x m
%
%
% Your code here
Note, this code should use no toolboxes, and should be reasonably quick as this function will be called many times. Reasonably quick is up to debate as the rest of the code forms.
10 件のコメント
Fangjun Jiang
2011 年 9 月 1 日
I need clarification regarding "absolute indices" and "four connected". Can you give a numerical example?
Fangjun Jiang
2011 年 9 月 1 日
I think I figured it out now. Every element in a matrix has four connected, left, right, top, bottom. Absolute indices means linear indices or single indices.
Doug Hull
2011 年 9 月 1 日
Walter Roberson
2011 年 9 月 1 日
is a point considered to be 4 connected to itself?
Doug Hull
2011 年 9 月 1 日
the cyclist
2011 年 9 月 1 日
Which, if any, of the input arguments does the function need to be vectorizable across?
Fangjun Jiang
2011 年 9 月 2 日
How about circle-shifting neighbors? Should isFourConnected(1,4,4,5) and isFourConnected(1,17,4,5) all be true?
Andrei Bobrov
2011 年 9 月 2 日
for three-dimensional array
d = abs(a-b);
flag = d == n || d == n*m || (d == 1 && mod(min(a,b), n));
Fangjun Jiang
2011 年 9 月 2 日
@andrei, your code above returns false for both (1,4,4,5) and (1,17,4,5)
Walter Roberson
2011 年 9 月 2 日
Did anyone run timing tests on the survivors?
採用された回答
David Young
2011 年 9 月 1 日
function flag = isFourConnected(a,b,n,m)
%
% a,b: indices of interest a ~= b
% n,m: size of matrix of interest
%
% flag: True if indices a and b are four connected
% in a matrix of size n x m
%
d = abs(a-b);
flag = d == n || (d == 1 && mod(min(a,b), n));
end
3 件のコメント
Walter Roberson
2011 年 9 月 1 日
Interesting way to code the top vs bottom boundary condition.
Andrei Bobrov
2011 年 9 月 2 日
Hi David! +1
David Young
2011 年 9 月 3 日
Thanks Doug!
その他の回答 (5 件)
Fangjun Jiang
2011 年 9 月 1 日
Circle-shifting neighbors are considered connected.
function flag = isFourConnected(a,b,n,m)
%
% a,b: indices of interest a ~= b
% n,m: size of matrix of interest
%
% flag: True if indices a and b are four connected
% in a matrix of size n x m
%
%
% Your code here
[x,y]=ind2sub([n,m],[a;b]);
xdiff=abs(x(1)-x(2));
ydiff=abs(y(1)-y(2));
flag = ((xdiff==0) && (ydiff==1) || (ydiff==m-1)) || ...
((ydiff==0) && (xdiff==1) || (xdiff==n-1));
A little test script. All other entries so far didn't pass this test.
clc;
TestVector={6,7,4,5
6,10,4,5
1,4,4,5
1,17,4,5};
for k=1:size(TestVector,1)
if isFourConnected(TestVector{k,:})~=true
disp(k);beep;
end
end
Walter Roberson
2011 年 9 月 1 日
function flag = isFourConnected(a,b,n,m)
%
% a,b: indices of interest a ~= b
% n,m: size of matrix of interest
%
% flag: True if indices a and b are four connected
% in a matrix of size n x m
%
%
flag = abs(a-b)==n || (floor(a/n)==floor(b/n) && abs(a-b)==1);
3 件のコメント
Walter Roberson
2011 年 9 月 1 日
Saving a repeated calculation to a variable isn't always faster once you take the JIT into account.
That's my excuse, and I'm sticking to it :-)
Walter Roberson
2011 年 9 月 1 日
flag = abs(a-b)==n || (abs(a-b)==1 && floor(a/n)==floor(b/n));
David Young
2011 年 9 月 1 日
Neat
Oleg Komarov
2011 年 9 月 1 日
I assume a,b,m,n always numeric and integer values > 1
function flag = isFourConnected(a,b,n,m)
% a,b : indices of interest a ~= b
% m,n : size of matrix of interest
% flag: True if indices a and b are four connected
% in a matrix of size n x m
d = a-b; flag = d == n || d == -n || (d == 1 && mod(a,n) ~= 1) || (d == -1 && mod(b,n) ~= 1);
4 件のコメント
Walter Roberson
2011 年 9 月 1 日
df would be 1 for bottom of column vs top of next column
Oleg Komarov
2011 年 9 月 1 日
Argh...
Oleg Komarov
2011 年 9 月 1 日
Can't find any other valid solution to ensure bottom vs top not 4 conn except the ones already proposed.
Walter Roberson
2011 年 9 月 1 日
Tossing something together: diff(mod(sort([a,b]),n))<0
Bruno Luong
2011 年 9 月 1 日
function flag = isFourConnected(a,b,n,m)
% 10 arithmetic operations by pair
c = max(a,b);
d = min(a,b);
e = c - d;
flag = (e==1 & mod(d,n)) | (e==n & c>n);
2 件のコメント
Walter Roberson
2011 年 9 月 1 日
This might or might not be slightly faster:
c = sort([a,b]);
e = c(2)-c(1);
flag = (e==1 & mod(c(1),n)) | (e==m & c(2)>n);
Or if you prefer your original structure, then instead of max/min, you could use
c = max(a,b);
d = a + b - c;
Bruno Luong
2011 年 9 月 1 日
I believe I had one redundant test in the earlier code:
function flag = isFourConnected(a,b,n,m)
% 8 arithmetic operations by pair
c = max(a,b);
d = min(a,b);
e = c - d;
flag = (e==1 & mod(d,n)) | (e==n);
Daniel Shub
2011 年 9 月 2 日
I am not sure what to do about circle-shifting neighbors so I have two answers.
function flag = isFourConnected(a,b,n,m)
%
% a,b: indices of interest a ~= b
% n,m: size of matrix of interest
%
% flag: True if indices a and b are four connected
% in a matrix of size n x m
%
%
% Your code here
% Using ind2sub might be faster.
col = mod([a(:), b(:)]-1, n)+1;
row = ceil([a(:), b(:)]/n);
%[col, row] = ind2sub([n, m], [a(:), b(:)]);
flag = reshape(mod(abs(diff(col, 1, 2)), n-2)+mod(abs(diff(row, 1, 2)), m-2) == 1, size(a));
% if circle shifted points are not connected:
% flag = reshape(abs(diff(col, 1, 2))+abs(diff(row, 1, 2)) == 1, size(a));
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