# Resizing Columns Algorithm

I have a set of columns of varying widths and I need an algorithm to re-size them for some value y which is greater than the sum of all their widths.

I would like the algorithm to prioritize equalizing the widths. So if I have a value that's absolutely huge the columns will end up with more or less the same width. If there isn't enough room for that I want the smaller cells to be given preference.

Any whiz bang ideas? I'd prefer something as simple as:

``````getNewWidths(NewWidth, ColumnWidths[]) returns NewColumnWidths[]
``````
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Pseudocode:

``````w = NewWidth
n = ColumnWidths.count
sort(ColumnWidths, ascending)
while n > 1 and ColumnWidths[n-1] > (w/n):
w = w - ColumnWidths[n-1]
n = n - 1
for i = 0 to n-1:
ColumnWidths[i] = w / n
``````

You'll need to add some code to redistribute any roundoffs from the w/n calculation, but I think this will do it.

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Thanks. Works very well. –  Spencer Ruport Dec 21 '09 at 2:33

Mark Ransom's answer gives the right algorithm, but in case you're having trouble figuring out what's going on there, here's an actual implementation in Python:

``````def getNewWidths(newWidth, columnWidths):
# First, find out how many columns we can equalize
# without shrinking any columns.
w = newWidth
n = len(columnWidths)
sortedWidths = sorted(columnWidths)   # A sorted copy of the array.
while sortedWidths[n - 1] * n > w:
w -= sortedWidths[n - 1]
n -= 1

# We can equalize the n narrowest columns. What is their new width?
minWidth = w // n    # integer division
sparePixels = w % n  # integer remainder: w == minWidth*n + sparePixels

# Now produce the new array of column widths.
for i in range(len(cw)):
if cw[i] <= minWidth:
cw[i] = minWidth
if sparePixels > 0:
cw[i] += 1
sparePixels -= 1
return cw
``````
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I would decompose that in two steps, first decide on how much of equalizing you want (between 0 and 1) and only second adapt it to the new total width.

For example as in

``````def get_new_widths new_total, widths
max = widths.max
f = how_much_equalizing(new_total) # return value between 0.0 and 1.0
widths = widths.collect{|w| w*(1-f)+max*f}
sum = widths.inject(0){|a,b|a+b}
return widths.collect{|w| w/sum*new_total}
end

def how_much_equalizing new_total
return [1.0, (new_total / 2000.0)].min
end
``````
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