Question link:Http://poj.org/problem? Id = 3020
Antenna placement
Time limit:1000 ms |
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Memory limit:65536 K |
Total submissions:6692 |
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Accepted:3325 |
Description
The global aerial research centre has been allotted the task of building the maximum th generation of mobile phone nets in Sweden. the most striking reason why they got the job, is their discovery of a new, highly noise resistant, antenna. it is called 4 dair, and comes in four types. each type can only transmit and receive signals in a direction aligned with a (slightly skewed) latitudinal and longitudinal grid, because of the interacting electromagnetic field of the Earth. the four types correspond to antennas operating in the directions north, west, south, and East, respectively. below is an example picture of places of interest, depicted by twelve small rings, and nine 4 Dair antennas depicted by ellipses covering them.
Question: Given a map, * represents a city, and O represents an open space. The antenna is used to cover two adjacent cities. How many antennas do I need at least? (The so-called adjacent refers to the top, bottom, and left adjacent to Four Directions)
The meaning of the question is very clear. Find the minimum path coverage of the Bipartite Graph. The difficulty is to build the graph... Good luck today. The idea of creating a graph comes from zoj1654.
PS. It covers the city, not the open space. At first, I was wrong.
Ideas: Today, zoj 1654, which is about the same as 1654, uses the block-based idea. This idea uses a single city as a block and numbers it to build graph connectivity, as for the final output result, the total number of cities minus the maximum number of matching = the number of remaining cities, that is, the maximum number of independent sets. The number of remaining cities indicates that they cannot be augmented/matched, then we need to build an antenna separately, and the matching number/2 = one antenna covers two cities
So eventually answer = city-ans + ANS/2
Zoj 1654 AC code
Accepted |
1584 k |
16 Ms |
C ++ |
If you want to understand it, open it and try again, 1a
# Include <iostream> # include <cstdio> # include <cstdlib> # include <cstring> # include <algorithm> # include <math. h> # define Init (a) memset (A, 0, sizeof (A) # define PI ACOs (-1, 0) using namespace STD; const int maxn = 60; const int maxm = 600; # define lson left, M, id <1 # define rson m + 1, right, id <1 | 1 # define min (A, B) (A> B )? B: A # define max (A, B) (A> B )? A: bint ma [maxn] [maxn]; char map [maxn] [maxn]; int G [maxm] [maxm]; int line [maxm]; bool vis [maxm]; int MV [4] [2] = {}, {-}, {}, {0,-1}; int N, m, city; int DFS (int u) {for (INT v = 1; v <= city; V ++) {If (G [u] [v] = 1 &&! Vis [v]) {vis [v] = 1; if (line [v] =-1 | DFS (line [v]) {line [v] = u; return 1 ;}} return 0 ;}int K_m () {int ans = 0; memset (line,-1, sizeof (line); For (INT I = 1; I <= city; I ++) {Init (VIS); ans + = DFS (I );} return ans;} void get_g (int I, Int J) // figure {for (INT dir = 0; Dir <4; Dir ++) {int wx = I + MV [dir] [0]; int WY = J + MV [dir] [1]; if (Map [wx] [WY] = '*') {G [ma [I] [J] [ma [wx] [WY] = 1; // build a connection between the current city and its four adjacent cities }}} Int main () {int t; scanf ("% d", & T); char a [500]; while (t --) {scanf ("% d", & N, & M); City = 0; gets (a); // if no value is added, the test data cannot be read ..... I am particularly speechless Init (MA); Init (g); For (INT I = 0; I <n; I ++) {gets (Map [I]); for (Int J = 0; j <m; j ++) {If (Map [I] [J] = '*') ma [I] [J] = ++ city; // Number of all cities }}for (INT I = 0; I <n; I ++) {for (Int J = 0; j <m; j ++) {If (Map [I] [J] = '*') {get_g (I, j ); // construct a bipartite graph }}int ans = K_m (); // printf ("cisy = % d ans = % d \ n", city, ANS ); // a match is equivalent to overwriting printf ("% d \ n", city-ans + ANS/2);} return 0 ;}