# Range update and querying in a 2D matrix

I don't have a scenario, but here goes the problem. This is one is just driving me crazy. There is a nxn boolean matrix initially all elements are 0, n <= 10^6 and given as input. Next there will be up to 10^5 queries. Each query can be either set all elements of column c to 0 or 1, or set all elements of row r to 0 or 1. There can be another type of query, printing the total number of 1's in column c or row r.

I have no idea how to solve this and any help would be appreciated. Obviously a O(n) solution per query is not feasible.

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What needs to be solved here? –  Oli Charlesworth Feb 4 '13 at 21:03
Calculating the total number of 1's in a row or column after possible modification of the matrix –  user2040997 Feb 4 '13 at 21:06
I fail to see why O(n) per query is not feasible. Each of those queries seems like an O(n) operation to me. Is there something I'm missing here? –  femtoRgon Feb 4 '13 at 21:08
My friend gave me this problem. He says there is a much elegant and efficient solution. n <= 10^6 and total numbers of queries is up to 10^5. 10^11 loops will take a long time that's why it is not feasible. –  user2040997 Feb 4 '13 at 21:11
Ah, you mean that you need to do better than that. I read it that you did not believe it was feasible to obtain an O(n) per query result. –  femtoRgon Feb 4 '13 at 21:21

The idea of using a number to order the modifications is taken from Dukeling's post.

We will need 2 maps and 4 binary indexed tree (BIT, a.k.a. Fenwick Tree): 1 map and 2 BITs for rows, and 1 map and 2 BITs for columns. Let us call them `m_row`, `f_row[0]`, and `f_row[1]`; `m_col`, `f_col[0]` and `f_col[1]` respectively.

Map may be implemented with array, or tree like structure, or hashing. The 2 maps are used to store the last modification to a row/column. Since there can be at most 105 modification, you may use that fact to save space from simple array implementation.

BIT has 2 operations:

• `adjust(value, delta_freq)`, which adjusts the frequency of the `value` by `delta_freq` amount.
• `rsq(from_value, to_value)`, (rsq stands for range sum query) which finds the sum of the all the frequencies from `from_value` to `to_value` inclusive.

Let us declare global variable: `version`

Let us define `numRow` to be the number of rows in the 2D boolean matrix, and `numCol` to be the number of columns in the 2D boolean matrix.

The BITs should have size of at least MAX_QUERY + 1, since it is used to count the number of changes to the rows and columns, which can be as many as the number of queries.

Initialization:

``````version = 1
# Map should return <0, 0> for rows or cols not yet
# directly updated by query
m_row = m_col = empty map
f_row[0] = f_row[1] = f_col[0] = f_col[1] = empty BIT
``````

Update algorithm:

``````update(isRow, value, idx):
if (isRow):
# Since setting a row/column to a new value will reset
# everything done to it, we need to erase earlier
# modification to it.
# For example, turn on/off on a row a few times, then
# query some column
<prevValue, prevVersion> = m_row.get(idx)
if ( prevVersion > 0 ):

m_row.map( idx, <value, version> )
else:
<prevValue, prevVersion> = m_col.get(idx)
if ( prevVersion > 0 ):

m_col.map( idx, <value, version> )

version = version + 1
``````

Count algorithm:

``````count(isRow, idx):
if (isRow):
# If this is row, we want to find number of reverse modifications
# done by updating the columns
<value, row_version> = m_row.get(idx)
count = f_col[1 - value].rsq(row_version + 1, version)
else:
# If this is column, we want to find number of reverse modifications
# done by updating the rows
<value, col_version> = m_col.get(idx)
count = f_row[1 - value].rsq(col_version + 1, version)

if (isRow):
if (value == 1):
return numRow - count
else:
return count
else:
if (value == 1):
return numCol - count
else:
return count
``````

The complexity is logarithmic in worst case for both update and count.

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What are the methods rsq, add and adjust ? Could you add a brief detail about them –  Wayne Rooney Feb 5 '13 at 11:17
@WayneRooney: Thanks for the comment. There shouldn't be `add`. –  nhahtdh Feb 5 '13 at 12:34
Also what is numRow and numCol?? Is rsq the cumulative sum method ? –  Wayne Rooney Feb 5 '13 at 13:03
@WayneRooney: They should be clear enough? –  nhahtdh Feb 5 '13 at 13:04

Take version just to mean a value that gets auto-incremented for each update.

Store the last version and last update value at each row and column.

Store a list of (versions and counts of zeros and counts of ones) for the rows. The same for the columns. So that's only 2 lists for the entire grid.

When a row is updated, we set its version to the current version and insert into the list for rows the version and `if (oldRowValue == 0) zeroCount = oldZeroCount else zeroCount = oldZeroCount + 1` (so it's not the number of zero's, rather the number of times a value was updated with a zero). Same for oneCount. Same for columns.

If you do a print for a row, we get the row's version and last value, we do a binary search for that version in the column list (first value greater than). Then:

``````if (rowValue == 1)
target = n*rowValue
- (latestColZeroCount - colZeroCount)
+ (latestColOneCount - colOneCount)
else
target = (latestColOneCount - colOneCount)
``````

Not too sure whether the above will work.

That's O(1) for update, O(log k) for print, where k is the number of updates.

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In the problem it is clearly mentioned that the author does not want an O(n) per query solution. –  Wayne Rooney Feb 4 '13 at 21:22
thanks, but isn't it still O(n) to calculate the number of 1's in a row/column? May be this can be solved with a O(logn) or O(log^2 n) with a segment tree or fenwick tree like data structure. –  user2040997 Feb 4 '13 at 21:26
Ok just for clarification. Let's assume the worst case scenario. Say 50% of the queries are updates and 50% are asking to calculate the total number of 1's. –  user2040997 Feb 4 '13 at 21:28
Major edit, should be better now. –  Dukeling Feb 4 '13 at 21:46
I think the list/set should be sorted by value, then version. So if the current row/col is 0, we can binary search for value 1 with newer version. –  nhahtdh Feb 4 '13 at 22:08
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