Árvore indexada binária: atualização de intervalo e consultas de intervalo
Dado um array arr[0..N-1]. As seguintes operações precisam ser executadas.
- atualizar (l r val) : Adicione 'val' a todos os elementos da matriz de [l r].
- getRangeSum(l r) : Encontre a soma de todos os elementos na matriz de [l r].
Inicialmente, todos os elementos do array são 0. As consultas podem estar em qualquer ordem, ou seja, pode haver muitas atualizações antes da soma do intervalo.
Exemplo:
Entrada: N = 5 // {0 0 0 0 0}
Consultas: atualização: l = 0 r = 4 val = 2
atualização: l = 3 r = 4 val = 3
getRangeSum: l = 2 r = 4Saída: A soma dos elementos do intervalo [2 4] é 12
Explicação: A matriz após a primeira atualização torna-se {2 2 2 2 2}
A matriz após a segunda atualização torna-se {2 2 2 5 5}
Abordagem ingênua: Para resolver o problema siga a ideia abaixo:
No postagem anterior discutimos soluções de atualização de intervalo e consulta de pontos usando BIT.
rangeUpdate(l r val): Adicionamos 'val' ao elemento no índice 'l'. Subtraímos 'val' do elemento no índice 'r+1'.
getElement(index) [ou getSum()]: Retornamos a soma dos elementos de 0 ao índice que pode ser obtido rapidamente usando BIT.
Podemos calcular rangeSum() usando consultas getSum().
rangeSum(l r) = getSum(r) - getSum(l-1)Uma solução simples é usar as soluções discutidas no postagem anterior . A consulta de atualização de intervalo é a mesma. A consulta de soma de intervalo pode ser obtida fazendo uma consulta get para todos os elementos do intervalo.
Abordagem eficiente: Para resolver o problema siga a ideia abaixo:
Obtemos a soma do intervalo usando somas de prefixos. Como garantir que a atualização seja feita de forma que a soma do prefixo possa ser feita rapidamente? Considere uma situação em que a soma do prefixo [0 k] (onde 0 <= k < n) is needed after range update on the range [l r]. Three cases arise as k can possibly lie in 3 regions.
- Caso 1 : 0 < k < l
- A consulta de atualização não afetará a consulta de soma.
- Caso 2 : eu <= k <= r
- Considere um exemplo: Adicione 2 ao intervalo [2 4] e a matriz resultante seria: 0 0 2 2 2
Se k = 3 A soma de [0 k] = 4Como obter esse resultado?
Basta adicionar o val de l o índice para k o índice. A soma é incrementada em 'val*(k) - val*(l-1)' após a consulta de atualização.
- Caso 3 : k > r
- Para este caso, precisamos adicionar 'val' de l o índice para r o índice. A soma é incrementada em 'val*r – val*(l-1)' devido a uma consulta de atualização.
Observações:
Caso 1: é simples, pois a soma permaneceria a mesma de antes da atualização.
Caso 2: A soma foi incrementada em val*k - val*(l-1). Podemos encontrar 'val', é semelhante a encontrar o i o elemento em atualização de intervalo e artigo de consulta de ponto . Portanto, mantemos um BIT para atualização de intervalo e consultas de pontos. Este BIT será útil para encontrar o valor em k o índice. Agora val * k é calculado como lidar com o termo extra val*(l-1)?
Para lidar com esse termo extra mantemos outro BIT (BIT2). Atualize val * (l-1) em l o index então, quando a consulta getSum for executada no BIT2, o resultado será val*(l-1).
Caso 3: A soma no caso 3 foi incrementada por 'val*r - val *(l-1)' o valor deste termo pode ser obtido usando BIT2. Em vez de adicionar, subtraímos 'val*(l-1) - val*r', pois podemos obter esse valor do BIT2 adicionando val*(l-1) como fizemos no caso 2 e subtraindo val*r em cada operação de atualização.
Consulta de atualização
Atualização(BITree1 l val)
Atualizar(BITree1 r+1 -val)
AtualizarBIT2(BITree2 l val*(l-1))
AtualizarBIT2(BITree2 r+1 -val*r)Soma do intervalo
getSum(BITTree1k) *k) - getSum(BITTree2k)
Siga as etapas abaixo para resolver o problema:
- Crie as duas árvores de índice binário usando a função fornecida constructBITree()
- Para encontrar a soma em um determinado intervalo, chame a função rangeSum() com parâmetros como o intervalo fornecido e árvores binárias indexadas
- Chame uma função sum que retornará uma soma no intervalo [0 X]
- Retornar soma(R) - soma(L-1)
- Dentro desta função chame a função getSum() que retornará a soma do array de [0 X]
- Retornar getSum(Árvore1 x) * x - getSum(árvore2 x)
- Dentro da função getSum() crie uma soma inteira igual a zero e aumente o índice em 1
- Enquanto o índice for maior que zero, aumente a soma por Árvore[índice]
- Diminua o índice em (index & (-index)) para mover o índice para o nó pai na árvore
- Soma de retorno
- Imprima a soma no intervalo fornecido
Abaixo está a implementação da abordagem acima:
C++ // C++ program to demonstrate Range Update // and Range Queries using BIT #include using namespace std ; // Returns sum of arr[0..index]. This function assumes // that the array is preprocessed and partial sums of // array elements are stored in BITree[] int getSum ( int BITree [] int index ) { int sum = 0 ; // Initialize result // index in BITree[] is 1 more than the index in arr[] index = index + 1 ; // Traverse ancestors of BITree[index] while ( index > 0 ) { // Add current element of BITree to sum sum += BITree [ index ]; // Move index to parent node in getSum View index -= index & ( - index ); } return sum ; } // Updates a node in Binary Index Tree (BITree) at given // index in BITree. The given value 'val' is added to // BITree[i] and all of its ancestors in tree. void updateBIT ( int BITree [] int n int index int val ) { // index in BITree[] is 1 more than the index in arr[] index = index + 1 ; // Traverse all ancestors and add 'val' while ( index <= n ) { // Add 'val' to current node of BI Tree BITree [ index ] += val ; // Update index to that of parent in update View index += index & ( - index ); } } // Returns the sum of array from [0 x] int sum ( int x int BITTree1 [] int BITTree2 []) { return ( getSum ( BITTree1 x ) * x ) - getSum ( BITTree2 x ); } void updateRange ( int BITTree1 [] int BITTree2 [] int n int val int l int r ) { // Update Both the Binary Index Trees // As discussed in the article // Update BIT1 updateBIT ( BITTree1 n l val ); updateBIT ( BITTree1 n r + 1 - val ); // Update BIT2 updateBIT ( BITTree2 n l val * ( l - 1 )); updateBIT ( BITTree2 n r + 1 - val * r ); } int rangeSum ( int l int r int BITTree1 [] int BITTree2 []) { // Find sum from [0r] then subtract sum // from [0l-1] in order to find sum from // [lr] return sum ( r BITTree1 BITTree2 ) - sum ( l - 1 BITTree1 BITTree2 ); } int * constructBITree ( int n ) { // Create and initialize BITree[] as 0 int * BITree = new int [ n + 1 ]; for ( int i = 1 ; i <= n ; i ++ ) BITree [ i ] = 0 ; return BITree ; } // Driver code int main () { int n = 5 ; // Construct two BIT int * BITTree1 * BITTree2 ; // BIT1 to get element at any index // in the array BITTree1 = constructBITree ( n ); // BIT 2 maintains the extra term // which needs to be subtracted BITTree2 = constructBITree ( n ); // Add 5 to all the elements from [04] int l = 0 r = 4 val = 5 ; updateRange ( BITTree1 BITTree2 n val l r ); // Add 10 to all the elements from [24] l = 2 r = 4 val = 10 ; updateRange ( BITTree1 BITTree2 n val l r ); // Find sum of all the elements from // [14] l = 1 r = 4 ; cout < < 'Sum of elements from [' < < l < < '' < < r < < '] is ' ; cout < < rangeSum ( l r BITTree1 BITTree2 ) < < ' n ' ; return 0 ; }
Java // Java program to demonstrate Range Update // and Range Queries using BIT import java.util.* ; class GFG { // Returns sum of arr[0..index]. This function assumes // that the array is preprocessed and partial sums of // array elements are stored in BITree[] static int getSum ( int BITree [] int index ) { int sum = 0 ; // Initialize result // index in BITree[] is 1 more than the index in // arr[] index = index + 1 ; // Traverse ancestors of BITree[index] while ( index > 0 ) { // Add current element of BITree to sum sum += BITree [ index ] ; // Move index to parent node in getSum View index -= index & ( - index ); } return sum ; } // Updates a node in Binary Index Tree (BITree) at given // index in BITree. The given value 'val' is added to // BITree[i] and all of its ancestors in tree. static void updateBIT ( int BITree [] int n int index int val ) { // index in BITree[] is 1 more than the index in // arr[] index = index + 1 ; // Traverse all ancestors and add 'val' while ( index <= n ) { // Add 'val' to current node of BI Tree BITree [ index ] += val ; // Update index to that of parent in update View index += index & ( - index ); } } // Returns the sum of array from [0 x] static int sum ( int x int BITTree1 [] int BITTree2 [] ) { return ( getSum ( BITTree1 x ) * x ) - getSum ( BITTree2 x ); } static void updateRange ( int BITTree1 [] int BITTree2 [] int n int val int l int r ) { // Update Both the Binary Index Trees // As discussed in the article // Update BIT1 updateBIT ( BITTree1 n l val ); updateBIT ( BITTree1 n r + 1 - val ); // Update BIT2 updateBIT ( BITTree2 n l val * ( l - 1 )); updateBIT ( BITTree2 n r + 1 - val * r ); } static int rangeSum ( int l int r int BITTree1 [] int BITTree2 [] ) { // Find sum from [0r] then subtract sum // from [0l-1] in order to find sum from // [lr] return sum ( r BITTree1 BITTree2 ) - sum ( l - 1 BITTree1 BITTree2 ); } static int [] constructBITree ( int n ) { // Create and initialize BITree[] as 0 int [] BITree = new int [ n + 1 ] ; for ( int i = 1 ; i <= n ; i ++ ) BITree [ i ] = 0 ; return BITree ; } // Driver Program to test above function public static void main ( String [] args ) { int n = 5 ; // Contwo BIT int [] BITTree1 ; int [] BITTree2 ; // BIT1 to get element at any index // in the array BITTree1 = constructBITree ( n ); // BIT 2 maintains the extra term // which needs to be subtracted BITTree2 = constructBITree ( n ); // Add 5 to all the elements from [04] int l = 0 r = 4 val = 5 ; updateRange ( BITTree1 BITTree2 n val l r ); // Add 10 to all the elements from [24] l = 2 ; r = 4 ; val = 10 ; updateRange ( BITTree1 BITTree2 n val l r ); // Find sum of all the elements from // [14] l = 1 ; r = 4 ; System . out . print ( 'Sum of elements from [' + l + '' + r + '] is ' ); System . out . print ( rangeSum ( l r BITTree1 BITTree2 ) + 'n' ); } } // This code is contributed by 29AjayKumar
Python3 # Python3 program to demonstrate Range Update # and Range Queries using BIT # Returns sum of arr[0..index]. This function assumes # that the array is preprocessed and partial sums of # array elements are stored in BITree[] def getSum ( BITree : list index : int ) -> int : summ = 0 # Initialize result # index in BITree[] is 1 more than the index in arr[] index = index + 1 # Traverse ancestors of BITree[index] while index > 0 : # Add current element of BITree to sum summ += BITree [ index ] # Move index to parent node in getSum View index -= index & ( - index ) return summ # Updates a node in Binary Index Tree (BITree) at given # index in BITree. The given value 'val' is added to # BITree[i] and all of its ancestors in tree. def updateBit ( BITTree : list n : int index : int val : int ) -> None : # index in BITree[] is 1 more than the index in arr[] index = index + 1 # Traverse all ancestors and add 'val' while index <= n : # Add 'val' to current node of BI Tree BITTree [ index ] += val # Update index to that of parent in update View index += index & ( - index ) # Returns the sum of array from [0 x] def summation ( x : int BITTree1 : list BITTree2 : list ) -> int : return ( getSum ( BITTree1 x ) * x ) - getSum ( BITTree2 x ) def updateRange ( BITTree1 : list BITTree2 : list n : int val : int l : int r : int ) -> None : # Update Both the Binary Index Trees # As discussed in the article # Update BIT1 updateBit ( BITTree1 n l val ) updateBit ( BITTree1 n r + 1 - val ) # Update BIT2 updateBit ( BITTree2 n l val * ( l - 1 )) updateBit ( BITTree2 n r + 1 - val * r ) def rangeSum ( l : int r : int BITTree1 : list BITTree2 : list ) -> int : # Find sum from [0r] then subtract sum # from [0l-1] in order to find sum from # [lr] return summation ( r BITTree1 BITTree2 ) - summation ( l - 1 BITTree1 BITTree2 ) # Driver Code if __name__ == '__main__' : n = 5 # BIT1 to get element at any index # in the array BITTree1 = [ 0 ] * ( n + 1 ) # BIT 2 maintains the extra term # which needs to be subtracted BITTree2 = [ 0 ] * ( n + 1 ) # Add 5 to all the elements from [04] l = 0 r = 4 val = 5 updateRange ( BITTree1 BITTree2 n val l r ) # Add 10 to all the elements from [24] l = 2 r = 4 val = 10 updateRange ( BITTree1 BITTree2 n val l r ) # Find sum of all the elements from # [14] l = 1 r = 4 print ( 'Sum of elements from [ %d %d ] is %d ' % ( l r rangeSum ( l r BITTree1 BITTree2 ))) # This code is contributed by # sanjeev2552
C# // C# program to demonstrate Range Update // and Range Queries using BIT using System ; class GFG { // Returns sum of arr[0..index]. This function assumes // that the array is preprocessed and partial sums of // array elements are stored in BITree[] static int getSum ( int [] BITree int index ) { int sum = 0 ; // Initialize result // index in BITree[] is 1 more than // the index in []arr index = index + 1 ; // Traverse ancestors of BITree[index] while ( index > 0 ) { // Add current element of BITree to sum sum += BITree [ index ]; // Move index to parent node in getSum View index -= index & ( - index ); } return sum ; } // Updates a node in Binary Index Tree (BITree) at given // index in BITree. The given value 'val' is added to // BITree[i] and all of its ancestors in tree. static void updateBIT ( int [] BITree int n int index int val ) { // index in BITree[] is 1 more than // the index in []arr index = index + 1 ; // Traverse all ancestors and add 'val' while ( index <= n ) { // Add 'val' to current node of BI Tree BITree [ index ] += val ; // Update index to that of // parent in update View index += index & ( - index ); } } // Returns the sum of array from [0 x] static int sum ( int x int [] BITTree1 int [] BITTree2 ) { return ( getSum ( BITTree1 x ) * x ) - getSum ( BITTree2 x ); } static void updateRange ( int [] BITTree1 int [] BITTree2 int n int val int l int r ) { // Update Both the Binary Index Trees // As discussed in the article // Update BIT1 updateBIT ( BITTree1 n l val ); updateBIT ( BITTree1 n r + 1 - val ); // Update BIT2 updateBIT ( BITTree2 n l val * ( l - 1 )); updateBIT ( BITTree2 n r + 1 - val * r ); } static int rangeSum ( int l int r int [] BITTree1 int [] BITTree2 ) { // Find sum from [0r] then subtract sum // from [0l-1] in order to find sum from // [lr] return sum ( r BITTree1 BITTree2 ) - sum ( l - 1 BITTree1 BITTree2 ); } static int [] constructBITree ( int n ) { // Create and initialize BITree[] as 0 int [] BITree = new int [ n + 1 ]; for ( int i = 1 ; i <= n ; i ++ ) BITree [ i ] = 0 ; return BITree ; } // Driver Code public static void Main ( String [] args ) { int n = 5 ; // Contwo BIT int [] BITTree1 ; int [] BITTree2 ; // BIT1 to get element at any index // in the array BITTree1 = constructBITree ( n ); // BIT 2 maintains the extra term // which needs to be subtracted BITTree2 = constructBITree ( n ); // Add 5 to all the elements from [04] int l = 0 r = 4 val = 5 ; updateRange ( BITTree1 BITTree2 n val l r ); // Add 10 to all the elements from [24] l = 2 ; r = 4 ; val = 10 ; updateRange ( BITTree1 BITTree2 n val l r ); // Find sum of all the elements from // [14] l = 1 ; r = 4 ; Console . Write ( 'Sum of elements from [' + l + '' + r + '] is ' ); Console . Write ( rangeSum ( l r BITTree1 BITTree2 ) + 'n' ); } } // This code is contributed by 29AjayKumar
JavaScript < script > // JavaScript program to demonstrate Range Update // and Range Queries using BIT // Returns sum of arr[0..index]. This function assumes // that the array is preprocessed and partial sums of // array elements are stored in BITree[] function getSum ( BITree index ) { let sum = 0 ; // Initialize result // index in BITree[] is 1 more than the index in arr[] index = index + 1 ; // Traverse ancestors of BITree[index] while ( index > 0 ) { // Add current element of BITree to sum sum += BITree [ index ]; // Move index to parent node in getSum View index -= index & ( - index ); } return sum ; } // Updates a node in Binary Index Tree (BITree) at given // index in BITree. The given value 'val' is added to // BITree[i] and all of its ancestors in tree. function updateBIT ( BITree n index val ) { // index in BITree[] is 1 more than the index in arr[] index = index + 1 ; // Traverse all ancestors and add 'val' while ( index <= n ) { // Add 'val' to current node of BI Tree BITree [ index ] += val ; // Update index to that of parent in update View index += index & ( - index ); } } // Returns the sum of array from [0 x] function sum ( x BITTree1 BITTree2 ) { return ( getSum ( BITTree1 x ) * x ) - getSum ( BITTree2 x ); } function updateRange ( BITTree1 BITTree2 n val l r ) { // Update Both the Binary Index Trees // As discussed in the article // Update BIT1 updateBIT ( BITTree1 n l val ); updateBIT ( BITTree1 n r + 1 - val ); // Update BIT2 updateBIT ( BITTree2 n l val * ( l - 1 )); updateBIT ( BITTree2 n r + 1 - val * r ); } function rangeSum ( l r BITTree1 BITTree2 ) { // Find sum from [0r] then subtract sum // from [0l-1] in order to find sum from // [lr] return sum ( r BITTree1 BITTree2 ) - sum ( l - 1 BITTree1 BITTree2 ); } function constructBITree ( n ) { // Create and initialize BITree[] as 0 let BITree = new Array ( n + 1 ); for ( let i = 1 ; i <= n ; i ++ ) BITree [ i ] = 0 ; return BITree ; } // Driver Program to test above function let n = 5 ; // Contwo BIT let BITTree1 ; let BITTree2 ; // BIT1 to get element at any index // in the array BITTree1 = constructBITree ( n ); // BIT 2 maintains the extra term // which needs to be subtracted BITTree2 = constructBITree ( n ); // Add 5 to all the elements from [04] let l = 0 r = 4 val = 5 ; updateRange ( BITTree1 BITTree2 n val l r ); // Add 10 to all the elements from [24] l = 2 ; r = 4 ; val = 10 ; updateRange ( BITTree1 BITTree2 n val l r ); // Find sum of all the elements from // [14] l = 1 ; r = 4 ; document . write ( 'Sum of elements from [' + l + '' + r + '] is ' ); document . write ( rangeSum ( l r BITTree1 BITTree2 ) + '
' ); // This code is contributed by rag2127 < /script>
Saída
Sum of elements from [14] is 50
Complexidade de tempo : O(q * log(N)) onde q é o número de consultas.
Espaço Auxiliar: SOBRE)
