下面的代码是C ++中的A *算法。在阅读此代码时,我看到以下两行,但没有得到它:
dir_map[xdx][ydy]=(i+dir/2)%dir;
例如。在// generate moves (child nodes) in all possible directions下的for循环中。这条线做什么?
这是完整的代码:
// Astar.cpp
// http://en.wikipedia.org/wiki/A*
// Compiler: Dev-C++ 4.9.9.2
// FB - 201012256
#include <iostream>
#include <iomanip>
#include <queue>
#include <string>
#include <math.h>
#include <ctime>
using namespace std;
const int n=60; // horizontal size of the map
const int m=60; // vertical size size of the map
static int map[n][m];
static int closed_nodes_map[n][m]; // map of closed (tried-out) nodes
static int open_nodes_map[n][m]; // map of open (not-yet-tried) nodes
static int dir_map[n][m]; // map of directions
const int dir=8; // number of possible directions to go at any position
// if dir==4
//static int dx[dir]={1, 0, -1, 0};
//static int dy[dir]={0, 1, 0, -1};
// if dir==8
static int dx[dir]={1, 1, 0, -1, -1, -1, 0, 1};
static int dy[dir]={0, 1, 1, 1, 0, -1, -1, -1};
class node
{
// current position
int xPos;
int yPos;
// total distance already travelled to reach the node
int level;
// priority=level+remaining distance estimate
int priority; // smaller: higher priority
public:
node(int xp, int yp, int d, int p)
{xPos=xp; yPos=yp; level=d; priority=p;}
int getxPos() const {return xPos;}
int getyPos() const {return yPos;}
int getLevel() const {return level;}
int getPriority() const {return priority;}
void updatePriority(const int & xDest, const int & yDest)
{
priority=level+estimate(xDest, yDest)*10; //A*
}
// give better priority to going strait instead of diagonally
void nextLevel(const int & i) // i: direction
{
level+=(dir==8?(i%2==0?10:14):10);
}
// Estimation function for the remaining distance to the goal.
const int & estimate(const int & xDest, const int & yDest) const
{
static int xd, yd, d;
xd=xDest-xPos;
yd=yDest-yPos;
// Euclidian Distance
d=static_cast<int>(sqrt(xd*xd+yd*yd));
// Manhattan distance
//d=abs(xd)+abs(yd);
// Chebyshev distance
//d=max(abs(xd), abs(yd));
return(d);
}
};
// Determine priority (in the priority queue)
bool operator<(const node & a, const node & b)
{
return a.getPriority() > b.getPriority();
}
// A-star algorithm.
// The route returned is a string of direction digits.
string pathFind( const int & xStart, const int & yStart,
const int & xFinish, const int & yFinish )
{
static priority_queue<node> pq[2]; // list of open (not-yet-tried) nodes
static int pqi; // pq index
static node* n0;
static node* m0;
static int i, j, x, y, xdx, ydy;
static char c;
pqi=0;
// reset the node maps
for(y=0;y<m;y++)
{
for(x=0;x<n;x++)
{
closed_nodes_map[x][y]=0;
open_nodes_map[x][y]=0;
}
}
// create the start node and push into list of open nodes
n0=new node(xStart, yStart, 0, 0);
n0->updatePriority(xFinish, yFinish);
pq[pqi].push(*n0);
open_nodes_map[x][y]=n0->getPriority(); // mark it on the open nodes map
// A* search
while(!pq[pqi].empty())
{
// get the current node w/ the highest priority
// from the list of open nodes
n0=new node( pq[pqi].top().getxPos(), pq[pqi].top().getyPos(),
pq[pqi].top().getLevel(), pq[pqi].top().getPriority());
x=n0->getxPos(); y=n0->getyPos();
pq[pqi].pop(); // remove the node from the open list
open_nodes_map[x][y]=0;
// mark it on the closed nodes map
closed_nodes_map[x][y]=1;
// quit searching when the goal state is reached
//if((*n0).estimate(xFinish, yFinish) == 0)
if(x==xFinish && y==yFinish)
{
// generate the path from finish to start
// by following the directions
string path="";
while(!(x==xStart && y==yStart))
{
j=dir_map[x][y];
c='0'+(j+dir/2)%dir;
path=c+path;
x+=dx[j];
y+=dy[j];
}
// garbage collection
delete n0;
// empty the leftover nodes
while(!pq[pqi].empty()) pq[pqi].pop();
return path;
}
// generate moves (child nodes) in all possible directions
for(i=0;i<dir;i++)
{
xdx=x+dx[i]; ydy=y+dy[i];
if(!(xdx<0 || xdx>n-1 || ydy<0 || ydy>m-1 || map[xdx][ydy]==1
|| closed_nodes_map[xdx][ydy]==1))
{
// generate a child node
m0=new node( xdx, ydy, n0->getLevel(),
n0->getPriority());
m0->nextLevel(i);
m0->updatePriority(xFinish, yFinish);
// if it is not in the open list then add into that
if(open_nodes_map[xdx][ydy]==0)
{
open_nodes_map[xdx][ydy]=m0->getPriority();
pq[pqi].push(*m0);
// mark its parent node direction
dir_map[xdx][ydy]=(i+dir/2)%dir;
}
else if(open_nodes_map[xdx][ydy]>m0->getPriority())
{
// update the priority info
open_nodes_map[xdx][ydy]=m0->getPriority();
// update the parent direction info
dir_map[xdx][ydy]=(i+dir/2)%dir;
// replace the node
// by emptying one pq to the other one
// except the node to be replaced will be ignored
// and the new node will be pushed in instead
while(!(pq[pqi].top().getxPos()==xdx &&
pq[pqi].top().getyPos()==ydy))
{
pq[1-pqi].push(pq[pqi].top());
pq[pqi].pop();
}
pq[pqi].pop(); // remove the wanted node
// empty the larger size pq to the smaller one
if(pq[pqi].size()>pq[1-pqi].size()) pqi=1-pqi;
while(!pq[pqi].empty())
{
pq[1-pqi].push(pq[pqi].top());
pq[pqi].pop();
}
pqi=1-pqi;
pq[pqi].push(*m0); // add the better node instead
}
else delete m0; // garbage collection
}
}
delete n0; // garbage collection
}
return ""; // no route found
}
int main()
{
srand(time(NULL));
// create empty map
for(int y=0;y<m;y++)
{
for(int x=0;x<n;x++) map[x][y]=0;
}
// fillout the map matrix with a '+' pattern
for(int x=n/8;x<n*7/8;x++)
{
map[x][m/2]=1;
}
for(int y=m/8;y<m*7/8;y++)
{
map[n/2][y]=1;
}
// randomly select start and finish locations
int xA, yA, xB, yB;
switch(rand()%8)
{
case 0: xA=0;yA=0;xB=n-1;yB=m-1; break;
case 1: xA=0;yA=m-1;xB=n-1;yB=0; break;
case 2: xA=n/2-1;yA=m/2-1;xB=n/2+1;yB=m/2+1; break;
case 3: xA=n/2-1;yA=m/2+1;xB=n/2+1;yB=m/2-1; break;
case 4: xA=n/2-1;yA=0;xB=n/2+1;yB=m-1; break;
case 5: xA=n/2+1;yA=m-1;xB=n/2-1;yB=0; break;
case 6: xA=0;yA=m/2-1;xB=n-1;yB=m/2+1; break;
case 7: xA=n-1;yA=m/2+1;xB=0;yB=m/2-1; break;
}
cout<<"Map Size (X,Y): "<<n<<","<<m<<endl;
cout<<"Start: "<<xA<<","<<yA<<endl;
cout<<"Finish: "<<xB<<","<<yB<<endl;
// get the route
clock_t start = clock();
string route=pathFind(xA, yA, xB, yB);
if(route=="") cout<<"An empty route generated!"<<endl;
clock_t end = clock();
double time_elapsed = double(end - start);
cout<<"Time to calculate the route (ms): "<<time_elapsed<<endl;
cout<<"Route:"<<endl;
cout<<route<<endl<<endl;
// follow the route on the map and display it
if(route.length()>0)
{
int j; char c;
int x=xA;
int y=yA;
map[x][y]=2;
for(int i=0;i<route.length();i++)
{
c =route.at(i);
j=atoi(&c);
x=x+dx[j];
y=y+dy[j];
map[x][y]=3;
}
map[x][y]=4;
// display the map with the route
for(int y=0;y<m;y++)
{
for(int x=0;x<n;x++)
if(map[x][y]==0)
cout<<".";
else if(map[x][y]==1)
cout<<"O"; //obstacle
else if(map[x][y]==2)
cout<<"S"; //start
else if(map[x][y]==3)
cout<<"R"; //route
else if(map[x][y]==4)
cout<<"F"; //finish
cout<<endl;
}
}
getchar(); // wait for a (Enter) keypress
return(0);
}
这是第一个包含相关行的代码段:
// if it is not in the open list then add into that
if(open_nodes_map[xdx][ydy]==0)
{
open_nodes_map[xdx][ydy]=m0->getPriority();
pq[pqi].push(*m0);
// mark its parent node direction
dir_map[xdx][ydy]=(i+dir/2)%dir; // ????
}
这是第二个片段:
else if(open_nodes_map[xdx][ydy]>m0->getPriority())
{
// update the priority info
open_nodes_map[xdx][ydy]=m0->getPriority();
// update the parent direction info
dir_map[xdx][ydy]=(i+dir/2)%dir; // ?????
(i + dir/2) % dir
在算法的上下文中,这计算了与i相反的方向。注:我们得到了代码顶部附近的for循环和0 ≤ i < dir中的const int dir=8;。
目标是计算父节点的方向,因此我们希望从i找到相反的方向。
通常,方向(在笛卡尔网格上)被列举为8个值:北,东北,东,东南,南,西南,西和西北。对此的可视化如下所示。
7 0 1
\ | /
6– • –2
/ | \
5 4 3
将dir/2 = 8/2 = 4添加到i将在上面绘制的圆圈中间旋转i。这给了我们与i相反的方向,因为我们正在中途旋转(一半意味着除以2)。例如,如果我们想要从东北(1)计算相反的方向,我们加4得到5(即西南)。
回想一下,只有8个有效的枚举。由于i + dir/2可能导致大于或等于8的值,我们需要将模数乘以8以映射到有效的枚举,因此% dir。 (我提到或等于,因为我们将枚举从0索引到7.)因此8应映射到0,9应映射到1,依此类推。例如,如果我们想要找到西方(6)的相反方向,我们先前添加4。这给了我们10个方向。但是这个方向不是公认的枚举!所以我们需要将模数乘以4,10%4,得到2(即东)。
因此,作为代码状态中的注释,(i+dir/2)%dir有效地计算父节点方向,即算法先前遍历的方向。
其余部分相当简单。 dir_map[xdx][ydy] =将计算出的方向分配给笛卡尔坐标(xdx, ydy),将其存储在dir_map中以供将来参考/查询。 (xdx和ydy是x和y的递增/递减值。上面几行,你会发现xdx=x+dx[i]; ydy=y+dy[i];。)
注:该算法似乎将东方视为0,将东南视为1,将南视为2,依此类推。这并不妨碍相反方向的计算,因为抽象和数学的普遍性使这一点无效。