POJ 1860 Currency Exchange (最短路)

时间:2023-03-08 15:54:13

Currency Exchange

Time Limit : 2000/1000ms (Java/Other)   Memory Limit : 60000/30000K (Java/Other)
Total Submission(s) : 4   Accepted Submission(s) : 2
Problem Description
Several currency exchange points are working in our city. Let us suppose that each point specializes in two particular currencies and performs exchange operations only with these currencies. There can be several points specializing in the same pair of currencies. Each point has its own exchange rates, exchange rate of A to B is the quantity of B you get for 1A. Also each exchange point has some commission, the sum you have to pay for your exchange operation. Commission is always collected in source currency.
For
example, if you want to exchange 100 US Dollars into Russian Rubles at the
exchange point, where the exchange rate is 29.75, and the commission is 0.39 you
will get (100 - 0.39) * 29.75 = 2963.3975RUR.
You surely know that there are
N different currencies you can deal with in our city. Let us assign unique
integer number from 1 to N to each currency. Then each exchange point can be
described with 6 numbers: integer A and B - numbers of currencies it exchanges,
and real RAB, CAB, RBA and CBA -
exchange rates and commissions when exchanging A to B and B to A respectively.

Nick has some money in currency S and wonders if he can somehow, after some
exchange operations, increase his capital. Of course, he wants to have his money
in currency S in the end. Help him to answer this difficult question. Nick must
always have non-negative sum of money while making his operations.
Input
The first line of the input contains four numbers: N -
the number of currencies, M - the number of exchange points, S - the number of
currency Nick has and V - the quantity of currency units he has. The following M
lines contain 6 numbers each - the description of the corresponding exchange
point - in specified above order. Numbers are separated by one or more spaces.
1<=S<=N<=100, 1<=M<=100, V is real number,
0<=V<=10<sup>3</sup>. <br>For each point exchange rates
and commissions are real, given with at most two digits after the decimal point,
10<sup>-2</sup><=rate<=10<sup>2</sup>,
0<=commission<=10<sup>2</sup>. <br>Let us call some
sequence of the exchange operations simple if no exchange point is used more
than once in this sequence. You may assume that ratio of the numeric values of
the sums at the end and at the beginning of any simple sequence of the exchange
operations will be less than 10<sup>4</sup>. <br>
Output
If Nick can increase his wealth, output YES, in other
case output NO to the output file.
Sample Input
3 2 1 20.0
1 2 1.00 1.00 1.00 1.00
2 3 1.10 1.00 1.10 1.00
Sample Output
YES

题目大意:有多种汇币,汇币之间可以交换,这需要手续费,当你用100A币交换B币时,A到B的汇率是29.75,手续费是0.39,那么你可以得到(100 - 0.39) *      29.75 = 2963.3975 B币。问s币的金额经过交换最终得到的s币金额数能否增加

     货币的交换是可以重复多次的,所以我们需要找出是否存在正权回路,且最后得到的s金额是增加的

     怎么找正权回路呢?(正权回路:在这一回路上,顶点的权值能不断增加即能一直进行松弛)

解题思路:单源最短路径算法,因为题目可能存在负边,所以用Bellman Ford算法,

     原始Bellman Ford可以用来求负环,这题需要改进一下用来求正环

     本题是“求最大路径”,之所以被归类为“求最小路径”是因为本题题恰恰与bellman-Ford算法的松弛条件相反,

     求的是能无限松弛的最大正权路径,但是依然能够利用bellman-Ford的思想去解题。

     因此初始化dis(S)=V   而源点到其他点的距离(权值)初始化为无穷小(0),当s到其他某点的距离能不断变大时,

     说明存在最大路径;如果可以一直变大,说明存在正环。判断是否存在环路,用Bellman-Ford和spfa都可以。

AC代码:

 #include <stdio.h>
#include <string.h>
double dis[];
int n,m,s,ans;
double v;
struct data
{
int x,y;
double r,c;
}num[];
void add(int a,int b,double c,double d)
{
num[ans].x = a;
num[ans].y = b;
num[ans].r = c;
num[ans].c = d;
ans ++;
}
bool Bellman_ford()
{
int i,j;
for (i = ; i <= n; i ++) //此处与Bellman-Ford的处理相反,初始化为源点到各点距离0,到自身的值为原值
dis[i] = ;
dis[s] = v;
bool flag;
for (i = ; i < n; i ++)
{
flag = false; //优化
for (j = ; j < ans; j ++)
if (dis[num[j].y] < (dis[num[j].x]-num[j].c)*num[j].r) //注意是小于号
{
dis[num[j].y] = (dis[num[j].x]-num[j].c)*num[j].r;
flag = true;
}
if (!flag) //如果没有更新,说明不存在正环
return false;
}
for (j = ; j < ans; j ++) //正环能够无限松弛
if (dis[num[j].y] < (dis[num[j].x]-num[j].c)*num[j].r)
return true; //有正环
return false;
}
int main ()
{
int i,j;
int a,b;
double r1,c1,r2,c2;
while (~scanf("%d%d%d%lf",&n,&m,&s,&v))
{
ans = ;
for (i = ; i < m; i ++)
{
scanf("%d%d%lf%lf%lf%lf",&a,&b,&r1,&c1,&r2,&c2);
add(a,b,r1,c1);
add(b,a,r2,c2);
}
if (Bellman_ford())
printf("YES\n");
else
printf("NO\n");
}
return ;
}

SPFA算法:

 #include<stdio.h>
#include<string.h>
#include<queue>
using namespace std;
const int N = ;
int n, m, s;
double dis[N], v, rate[N][N], cost[N][N]; bool spfa(int start)
{
bool inq[];
memset(inq, , sizeof(inq));
memset(dis, , sizeof(dis));
dis[start] = v;
queue<int> Q;
Q.push(start);
inq[start] = true;
while(!Q.empty())
{
int x = Q.front();
Q.pop();
inq[x] = false;
for(int i = ; i <= n; i++)
{
if(dis[i] < (dis[x] - cost[x][i]) * rate[x][i])
{
dis[i] = (dis[x] - cost[x][i]) * rate[x][i];
if(dis[start] > v)
return true;
if(!inq[i])
{
Q.push(i);
inq[i] = true;
}
}
}
}
return false;
} int main()
{
int i, j;
while(~scanf("%d%d%d%lf",&n,&m,&s,&v))
{
int a, b;
double rab, rba, cab, cba;
for(i = ; i <= n; i++)
for(j = ; j <= n; j++)
{
if(i == j)
rate[i][j] = ;
else
rate[i][j] = ;
cost[i][j] = ;
}
for(i = ; i < m; i++)
{
scanf("%d%d%lf%lf%lf%lf",&a,&b,&rab,&cab,&rba,&cba);
rate[a][b] = rab;
rate[b][a] = rba;
cost[a][b] = cab;
cost[b][a] = cba;
}
if(spfa(s))
printf("YES\n");
else
printf("NO\n");
}
return ;
}