Pot z minimalnimi stroški z dovoljenimi premiki levo, desno, spodaj in navzgor
Preizkusite na GfG Practice 
Izhod
Glede na 2D mrežo velikosti n*n kjer vsaka celica predstavlja stroške prehoda skozi to celico, naloga je najti minimalni stroški premakniti iz zgoraj levo celica do spodaj desno celica. Iz dane celice se lahko preselimo 4 smeri : levo desno gor dol.
Opomba: Predpostavlja se, da negativni stroškovni cikli v vhodni matriki ne obstajajo.
primer:
Vnos: mreža = {{9 4 9 9}
{6 7 6 4}
{8 3 3 7}
{7 4 9 10}}
Izhod: 43
Pojasnilo: Pot najmanjše cene je 9 + 4 + 7 + 3 + 3 + 7 + 10.
Pristop:
Ideja je uporaba Dijkstrajev algoritem da poiščete pot z minimalnimi stroški skozi mrežo. Ta pristop obravnava mrežo kot graf, kjer je vsaka celica vozlišče, algoritem pa dinamično raziskuje stroškovno najučinkovitejšo pot do spodnje desne celice tako, da vedno najprej razširi poti z najcenejšimi stroški.
Pristop korak za korakom:
- Uporabite najmanjšo kopico, da vedno najprej obdelate pot z najcenejšimi stroški in vanjo potisnete zgornjo levo celico.
- Inicializirajte matriko stroškov z najvišjimi vrednostmi, tako da nastavite stroške začetne celice na njeno mrežno vrednost.
- Za vsako celico preverite vse 4 sosednje celice
- Če je najdena pot z nižjimi stroški, posodobite stroške celice in jo potisnite v kopico.
- Vrnite najnižjo ceno, da dosežete spodnjo desno celico.
Spodaj je izvedba zgornjega pristopa:
C++ // C++ program to find minimum Cost Path with // Left Right Bottom and Up moves allowed #include using namespace std ; // Function to check if cell is valid. bool isValidCell ( int i int j int n ) { return i >= 0 && i < n && j >= 0 && j < n ; } int minimumCostPath ( vector < vector < int >> & grid ) { int n = grid . size (); // Min heap to implement dijkstra priority_queue < vector < int > vector < vector < int >> greater < vector < int >>> pq ; // 2d grid to store minimum cost // to reach every cell. vector < vector < int >> cost ( n vector < int > ( n INT_MAX )); cost [ 0 ][ 0 ] = grid [ 0 ][ 0 ]; // Direction vector to move in 4 directions vector < vector < int >> dir = {{ -1 0 } { 1 0 } { 0 -1 } { 0 1 }}; pq . push ({ grid [ 0 ][ 0 ] 0 0 }); while ( ! pq . empty ()) { vector < int > top = pq . top (); pq . pop (); int c = top [ 0 ] i = top [ 1 ] j = top [ 2 ]; // Check for all 4 neighbouring cells. for ( auto d : dir ) { int x = i + d [ 0 ]; int y = j + d [ 1 ]; // If cell is valid and cost to reach this cell // from current cell is less if ( isValidCell ( x y n ) && cost [ i ][ j ] + grid [ x ][ y ] < cost [ x ][ y ]) { // Update cost to reach this cell. cost [ x ][ y ] = cost [ i ][ j ] + grid [ x ][ y ]; // Push the cell into heap. pq . push ({ cost [ x ][ y ] x y }); } } } // Return minimum cost to // reach bottom right cell. return cost [ n -1 ][ n -1 ]; } int main () { vector < vector < int >> grid = {{ 9 4 9 9 }{ 6 7 6 4 }{ 8 3 3 7 }{ 7 4 9 10 }}; cout < < minimumCostPath ( grid ) < < endl ; return 0 ; }
Java // Java program to find minimum Cost Path with // Left Right Bottom and Up moves allowed import java.util.PriorityQueue ; import java.util.Arrays ; class GfG { // Function to check if cell is valid. static boolean isValidCell ( int i int j int n ) { return i >= 0 && i < n && j >= 0 && j < n ; } static int minimumCostPath ( int [][] grid ) { int n = grid . length ; // Min heap to implement Dijkstra PriorityQueue < int []> pq = new PriorityQueue <> (( a b ) -> Integer . compare ( a [ 0 ] b [ 0 ] )); // 2D grid to store minimum cost // to reach every cell. int [][] cost = new int [ n ][ n ] ; for ( int [] row : cost ) { Arrays . fill ( row Integer . MAX_VALUE ); } cost [ 0 ][ 0 ] = grid [ 0 ][ 0 ] ; // Direction vector to move in 4 directions int [][] dir = {{ - 1 0 } { 1 0 } { 0 - 1 } { 0 1 }}; pq . offer ( new int [] { grid [ 0 ][ 0 ] 0 0 }); while ( ! pq . isEmpty ()) { int [] top = pq . poll (); int c = top [ 0 ] i = top [ 1 ] j = top [ 2 ] ; // Check for all 4 neighbouring cells. for ( int [] d : dir ) { int x = i + d [ 0 ] ; int y = j + d [ 1 ] ; // If cell is valid and cost to reach this cell // from current cell is less if ( isValidCell ( x y n ) && cost [ i ][ j ] + grid [ x ][ y ] < cost [ x ][ y ] ) { // Update cost to reach this cell. cost [ x ][ y ] = cost [ i ][ j ] + grid [ x ][ y ] ; // Push the cell into heap. pq . offer ( new int [] { cost [ x ][ y ] x y }); } } } // Return minimum cost to // reach bottom right cell. return cost [ n - 1 ][ n - 1 ] ; } public static void main ( String [] args ) { int [][] grid = { { 9 4 9 9 } { 6 7 6 4 } { 8 3 3 7 } { 7 4 9 10 } }; System . out . println ( minimumCostPath ( grid )); } }
Python # Python program to find minimum Cost Path with # Left Right Bottom and Up moves allowed import heapq # Function to check if cell is valid. def isValidCell ( i j n ): return i >= 0 and i < n and j >= 0 and j < n def minimumCostPath ( grid ): n = len ( grid ) # Min heap to implement Dijkstra pq = [] # 2D grid to store minimum cost # to reach every cell. cost = [[ float ( 'inf' )] * n for _ in range ( n )] cost [ 0 ][ 0 ] = grid [ 0 ][ 0 ] # Direction vector to move in 4 directions dir = [[ - 1 0 ] [ 1 0 ] [ 0 - 1 ] [ 0 1 ]] heapq . heappush ( pq [ grid [ 0 ][ 0 ] 0 0 ]) while pq : c i j = heapq . heappop ( pq ) # Check for all 4 neighbouring cells. for d in dir : x y = i + d [ 0 ] j + d [ 1 ] # If cell is valid and cost to reach this cell # from current cell is less if isValidCell ( x y n ) and cost [ i ][ j ] + grid [ x ][ y ] < cost [ x ][ y ]: # Update cost to reach this cell. cost [ x ][ y ] = cost [ i ][ j ] + grid [ x ][ y ] # Push the cell into heap. heapq . heappush ( pq [ cost [ x ][ y ] x y ]) # Return minimum cost to # reach bottom right cell. return cost [ n - 1 ][ n - 1 ] if __name__ == '__main__' : grid = [ [ 9 4 9 9 ] [ 6 7 6 4 ] [ 8 3 3 7 ] [ 7 4 9 10 ] ] print ( minimumCostPath ( grid ))
C# // C# program to find minimum Cost Path with // Left Right Bottom and Up moves allowed using System ; using System.Collections.Generic ; class GfG { // Function to check if cell is valid. static bool isValidCell ( int i int j int n ) { return i >= 0 && i < n && j >= 0 && j < n ; } static int minimumCostPath ( int [][] grid ) { int n = grid . Length ; // Min heap to implement Dijkstra var pq = new SortedSet < ( int cost int x int y ) > (); // 2D grid to store minimum cost // to reach every cell. int [][] cost = new int [ n ][]; for ( int i = 0 ; i < n ; i ++ ) { cost [ i ] = new int [ n ]; Array . Fill ( cost [ i ] int . MaxValue ); } cost [ 0 ][ 0 ] = grid [ 0 ][ 0 ]; // Direction vector to move in 4 directions int [][] dir = { new int [] { - 1 0 } new int [] { 1 0 } new int [] { 0 - 1 } new int [] { 0 1 } }; pq . Add (( grid [ 0 ][ 0 ] 0 0 )); while ( pq . Count > 0 ) { var top = pq . Min ; pq . Remove ( top ); int i = top . x j = top . y ; // Check for all 4 neighbouring cells. foreach ( var d in dir ) { int x = i + d [ 0 ]; int y = j + d [ 1 ]; // If cell is valid and cost to reach this cell // from current cell is less if ( isValidCell ( x y n ) && cost [ i ][ j ] + grid [ x ][ y ] < cost [ x ][ y ]) { // Update cost to reach this cell. cost [ x ][ y ] = cost [ i ][ j ] + grid [ x ][ y ]; // Push the cell into heap. pq . Add (( cost [ x ][ y ] x y )); } } } // Return minimum cost to // reach bottom right cell. return cost [ n - 1 ][ n - 1 ]; } static void Main ( string [] args ) { int [][] grid = new int [][] { new int [] { 9 4 9 9 } new int [] { 6 7 6 4 } new int [] { 8 3 3 7 } new int [] { 7 4 9 10 } }; Console . WriteLine ( minimumCostPath ( grid )); } }
JavaScript // JavaScript program to find minimum Cost Path with // Left Right Bottom and Up moves allowed function comparator ( a b ) { if ( a [ 0 ] > b [ 0 ]) return - 1 ; if ( a [ 0 ] < b [ 0 ]) return 1 ; return 0 ; } class PriorityQueue { constructor ( compare ) { this . heap = []; this . compare = compare ; } enqueue ( value ) { this . heap . push ( value ); this . bubbleUp (); } bubbleUp () { let index = this . heap . length - 1 ; while ( index > 0 ) { let element = this . heap [ index ] parentIndex = Math . floor (( index - 1 ) / 2 ) parent = this . heap [ parentIndex ]; if ( this . compare ( element parent ) < 0 ) break ; this . heap [ index ] = parent ; this . heap [ parentIndex ] = element ; index = parentIndex ; } } dequeue () { let max = this . heap [ 0 ]; let end = this . heap . pop (); if ( this . heap . length > 0 ) { this . heap [ 0 ] = end ; this . sinkDown ( 0 ); } return max ; } sinkDown ( index ) { let left = 2 * index + 1 right = 2 * index + 2 largest = index ; if ( left < this . heap . length && this . compare ( this . heap [ left ] this . heap [ largest ]) > 0 ) { largest = left ; } if ( right < this . heap . length && this . compare ( this . heap [ right ] this . heap [ largest ]) > 0 ) { largest = right ; } if ( largest !== index ) { [ this . heap [ largest ] this . heap [ index ]] = [ this . heap [ index ] this . heap [ largest ] ]; this . sinkDown ( largest ); } } isEmpty () { return this . heap . length === 0 ; } } // Function to check if cell is valid. function isValidCell ( i j n ) { return i >= 0 && i < n && j >= 0 && j < n ; } function minimumCostPath ( grid ) { let n = grid . length ; // Min heap to implement Dijkstra const pq = new PriorityQueue ( comparator ) // 2D grid to store minimum cost // to reach every cell. let cost = Array . from ({ length : n } () => Array ( n ). fill ( Infinity )); cost [ 0 ][ 0 ] = grid [ 0 ][ 0 ]; // Direction vector to move in 4 directions let dir = [[ - 1 0 ] [ 1 0 ] [ 0 - 1 ] [ 0 1 ]]; pq . enqueue ([ grid [ 0 ][ 0 ] 0 0 ]); while ( ! pq . isEmpty ()) { let [ c i j ] = pq . dequeue (); // Check for all 4 neighbouring cells. for ( let d of dir ) { let x = i + d [ 0 ]; let y = j + d [ 1 ]; // If cell is valid and cost to reach this cell // from current cell is less if ( isValidCell ( x y n ) && cost [ i ][ j ] + grid [ x ][ y ] < cost [ x ][ y ]) { // Update cost to reach this cell. cost [ x ][ y ] = cost [ i ][ j ] + grid [ x ][ y ]; // Push the cell into heap. pq . enqueue ([ cost [ x ][ y ] x y ]); } } } // Return minimum cost to // reach bottom right cell. return cost [ n - 1 ][ n - 1 ]; } let grid = [ [ 9 4 9 9 ] [ 6 7 6 4 ] [ 8 3 3 7 ] [ 7 4 9 10 ] ]; console . log ( minimumCostPath ( grid ));
Izhod
43
Časovna zapletenost: O(n^2 log(n^2))
Pomožni prostor: O(n^2 log(n^2))
Zakaj dinamičnega programiranja ni mogoče uporabiti?
Dinamično programiranje tukaj odpove, ker omogočanje gibanja v vseh štirih smereh ustvarja cikle, v katerih je mogoče ponovno obiskati celice, kar krši predpostavko o optimalni podstrukturi. To pomeni, da cena za dosego celice iz dane celice ni fiksna, ampak je odvisna od celotne poti.
Sorodni članki:
Pot minimalnih stroškov
Ustvari kviz
