From my opinion, whatever method you choose to implement it, it normally will has its own worst case.
The difference is that the performance for its worst case.
For example, I have tested the isnot2bad's method , my first implementation(oneTry) & my second implemenation(secondTry) in my PC.
The test results for worst case is:
isnot2bad's method: ~330s (2*10^5), ~74s (10^5) , ~0.8 (10^4), ~0.01(10^3)
my first implementation(oneTry):~200s(2*10^5), ~ 45s(10^5) , ~0.5s(10^4), ~0.01(10^3)
my second implemenation(secondTry): ~4s (10^6), ~ 0.4s(10^5),~0.05s(10^4),~0.007(10^3)
From the test results, we can see the worst performance time for "secondTry" is nearly linear with string length, while others are nearly square with string length.
The idea for secondTry implementation is like this:
For any string input T(T0...Tn-1, len=n), the total string's similarity value(St) is the sum of every single char's similarity value(Si) among the string S.
e.g.: St = S0 + ...+Si+...+Sn-1
Obviously, the total number of T0 in substring [T0...Ti]>= Si >=1
The exact value of Si is equal to the total number of T0 in substring [T0...Ti], which continues matching to Ti.
For example: T="aabaab", then T2='b', only T0('a') can continue to T2, while T1('a') can't continue to T2. Therefore, S2=1
Therefore, we need to keep track wich T0 is continued (if yes, keep it in the Array, if not, remove it from the Array). Then, it's easy to calculate every Ti's similarity.
Meanwhile, in order to improve the performance, we don't need to check every conitnuing T0. Acutally, for some T0, they can be combiled together.
Because they're belong to the repeat pattern.(it could be long pattern, or short pattern).
For example:
ababababab... : T0,T2,T4,T6... can be combied together as whole one.
aaaaaaaaaa... : T0,T1,T2,T3... can be combied together as whole one.
aaaabaaaabaaaab...:
T0,T5,T10,T15... can be combied together as whole one.
T1,T2,T3 can be combied together as whole one.
T6,T7,T8 can be combied together as whole one.
...
The detailed implementation code is shown as below.
Hope someone can post their best implementation & test results for this topic.
Thanks.
public static List<ANode> anodes = null;
public static List<ANode> tnodes = null;
public static void checkANodes(CharSequence input, int num) {
tnodes = new Vector<ANode>();
for(int i=anodes.size()-1; i>=0; i--) {
ANode anode = anodes.get(i);
if(input.charAt(num) == input.charAt(num-anode.pos)) {
tnodes.add(anode);
}else {
if(tnodes.size() > 0) {
// ok to do the changes
ANode after = tnodes.get(tnodes.size()-1);
tnodes.remove(after);
if(after.c > 1) {
tnodes.add(new ANode(after.pos + after.shift, after.shift ,after.c-1));
tnodes.add(new ANode(after.pos, after.pos-anode.pos + anode.shift,1));
}else {
tnodes.add(new ANode(after.pos, after.pos-anode.pos + anode.shift,1));
}
}
}
}
anodes.clear();
for(int i=tnodes.size() - 1; i >= 0; i--) {
anodes.add(tnodes.get(i));
}
}
public static int secondTry(CharSequence input) {
anodes = new Vector<ANode>();
int start = 0;
for (int i = 1; i < input.length(); i++) {
if (input.charAt(i) == input.charAt(0)) {
start = i;
break;
}
}
int count = 0;
int base = 0;
for (int i = start; i < input.length(); i++) {
checkANodes(input, i);
if(input.charAt(0) == input.charAt(i)) {
if(anodes.size() == 0) {
anodes.add(new ANode(i, i, 1));
}else {
ANode last = anodes.get(anodes.size()-1);
int shift = i - last.pos;
int mod = shift % last.shift;
if(mod == 0) {
last.c++;
}else {
anodes.add(new ANode(i, mod, 1));
}
}
}
base = 0;
for(ANode anode : anodes) {
base = base + anode.c;
}
count = count + base;
}
count = count + input.length();
return count;
}
public class ANode {
public int pos = 0;
public int c = 1;
public int shift = 0;
public ANode(int pos, int shift, int c) {
this.pos = pos;
this.shift = shift;
this.c = c;
}
}