last day (15 days later) » 

Feeds
Feeds
03:06
2
Q: Find a maximum rectangular area given an array of points

ealeonLet's say I have an array of objects called Point. Point object has x and y values. To make it more difficult, let's say there are no initial boundaries which means the rectangular area we want to find are bounded by Point objects. So, there are at least 4 Point objects. so if the ar...

algorithm
quasiverse
quasiverse
Max area? Infinite?
ealeon
ealeon
max area that are bounded by Point objects. With Point(0,0), Point(100,0) Point(0,100) and Point(100,100), i said its 100*100 so its not infinite...
quasiverse
quasiverse
... what do you mean by bounded? Suppose you have (0,0), (0,100), (100,0), (100,100), (50,50), What's the max rectangle?
ealeon
ealeon
then the area is 50*50. if you have the same area which is the maximum, you still return it
quasiverse
quasiverse
For your case can't you have a rectangle with y values of 1, 99 and then infinite on the x axis?
ealeon
ealeon
03:06
I said thats why you have at least 4 Point objects which does bound an area. No Point can have value of infinite.
Hello
quasiverse
quasiverse
What exactly do you mean by "bound"
ealeon
ealeon
if a Point has x and y
quasiverse
quasiverse
My interpretation was that the rectangle cannot contain any of the points
ealeon
ealeon
imagine that it stretches
if i have a Point(0,100)
Ian Mallett
Ian Mallett
does it need to be axis-aligned?
ealeon
ealeon
03:08
imaigine it shoots a boundary off of it
quasiverse
quasiverse
? Shoots a boundary off? As in each of the 4 directions?
ealeon
ealeon
yes!
No it doesnt have to be axis-aligned
quasiverse
quasiverse
So really instead of N points, you have N*2 (not necessarily unique) lines?
ealeon
ealeon
yes
Ian Mallett
Ian Mallett
@ealeon: the simplest (and reasonably fast) thing I can think of is to make a convex hull, and compute the area of that. If you really need a rectangular bounding volume, you can use the caliper's method on the result.
ealeon
ealeon
03:10
so just think about it as a grid. and if a Point is on certain x and y-coordinates. the coloum and the row att hat x and y is bounded/line
ok let me look at calpier's method
Ian Mallett
Ian Mallett
It's pretty simple: just walk a bounding volume around the n points and see which has the smallest area--that's the optimal bounding rect.
where one edge is the bounding rect is part of the convex hull
ealeon
ealeon
ah okay. this would work!

last day (15 days later) »