/// <summary> /// Find the difference in 2 arrays of integers. /// </summary> /// <param name="ArrayA">A-version of the numbers (usualy the old one)</param> /// <param name="ArrayB">B-version of the numbers (usualy the new one)</param> /// <returns>Returns a array of Items that describe the differences.</returns> public static Item[] DiffInt(int[] ArrayA, int[] ArrayB) { // The A-Version of the data (original data) to be compared. DiffData DataA = new DiffData(ArrayA); // The B-Version of the data (modified data) to be compared. DiffData DataB = new DiffData(ArrayB); LCS(DataA, 0, DataA.Length, DataB, 0, DataB.Length); return CreateDiffs(DataA, DataB); }
/// <summary>Scan the tables of which lines are inserted and deleted, /// producing an edit script in forward order. /// </summary> /// dynamic array private static Item[] CreateDiffs(DiffData DataA, DiffData DataB) { ArrayList a = new ArrayList(); Item aItem; Item[] result; int StartA, StartB; int LineA, LineB; LineA = 0; LineB = 0; while(LineA < DataA.Length || LineB < DataB.Length) { if((LineA < DataA.Length) && (!DataA.modified[LineA]) && (LineB < DataB.Length) && (!DataB.modified[LineB])) { // equal lines LineA++; LineB++; } else { // maybe deleted and/or inserted lines StartA = LineA; StartB = LineB; while(LineA < DataA.Length && (LineB >= DataB.Length || DataA.modified[LineA])) // while (LineA < DataA.Length && DataA.modified[LineA]) LineA++; while(LineB < DataB.Length && (LineA >= DataA.Length || DataB.modified[LineB])) // while (LineB < DataB.Length && DataB.modified[LineB]) LineB++; if((StartA < LineA) || (StartB < LineB)) { // store a new difference-item aItem = new Item(); aItem.StartA = StartA; aItem.StartB = StartB; aItem.deletedA = LineA - StartA; aItem.insertedB = LineB - StartB; a.Add(aItem); } // if } // if } // while result = new Item[a.Count]; a.CopyTo(result); return (result); }
/// <summary> /// Find the difference in 2 text documents, comparing by textlines. /// The algorithm itself is comparing 2 arrays of numbers so when comparing 2 text documents /// each line is converted into a (hash) number. This hash-value is computed by storing all /// textlines into a common hashtable so i can find dublicates in there, and generating a /// new number each time a new textline is inserted. /// </summary> /// <param name="TextA">A-version of the text (usualy the old one)</param> /// <param name="TextB">B-version of the text (usualy the new one)</param> /// <param name="trimSpace">When set to true, all leading and trailing whitespace characters are stripped out before the comparation is done.</param> /// <param name="ignoreSpace">When set to true, all whitespace characters are converted to a single space character before the comparation is done.</param> /// <param name="ignoreCase">When set to true, all characters are converted to their lowercase equivivalence before the comparation is done.</param> /// <returns>Returns a array of Items that describe the differences.</returns> public static Item[] DiffText(string TextA, string TextB, bool trimSpace, bool ignoreSpace, bool ignoreCase) { // prepare the input-text and convert to comparable numbers. Hashtable h = new Hashtable(TextA.Length + TextB.Length); // The A-Version of the data (original data) to be compared. DiffData DataA = new DiffData(DiffCodes(TextA, h, trimSpace, ignoreSpace, ignoreCase)); // The B-Version of the data (modified data) to be compared. DiffData DataB = new DiffData(DiffCodes(TextB, h, trimSpace, ignoreSpace, ignoreCase)); h = null; // free up hashtable memory (maybe) LCS(DataA, 0, DataA.Length, DataB, 0, DataB.Length); return CreateDiffs(DataA, DataB); }
} // SMS /// <summary> /// This is the divide-and-conquer implementation of the longes common-subsequence (LCS) /// algorithm. /// The published algorithm passes recursively parts of the A and B sequences. /// To avoid copying these arrays the lower and upper bounds are passed while the sequences stay constant. /// </summary> /// <param name="DataA">sequence A</param> /// <param name="LowerA">lower bound of the actual range in DataA</param> /// <param name="UpperA">upper bound of the actual range in DataA (exclusive)</param> /// <param name="DataB">sequence B</param> /// <param name="LowerB">lower bound of the actual range in DataB</param> /// <param name="UpperB">upper bound of the actual range in DataB (exclusive)</param> private static void LCS(DiffData DataA, int LowerA, int UpperA, DiffData DataB, int LowerB, int UpperB) { // Debug.Write(2, "LCS", String.Format("Analyse the box: A[{0}-{1}] to B[{2}-{3}]", LowerA, UpperA, LowerB, UpperB)); // Fast walkthrough equal lines at the start while (LowerA < UpperA && LowerB < UpperB && DataA.data[LowerA] == DataB.data[LowerB]) { LowerA++; LowerB++; } // Fast walkthrough equal lines at the end while (LowerA < UpperA && LowerB < UpperB && DataA.data[UpperA - 1] == DataB.data[UpperB - 1]) { --UpperA; --UpperB; } if (LowerA == UpperA) { // mark as inserted lines. while (LowerB < UpperB) { DataB.modified[LowerB++] = true; } } else if (LowerB == UpperB) { // mark as deleted lines. while (LowerA < UpperA) { DataA.modified[LowerA++] = true; } } else { // Find the middle snakea and length of an optimal path for A and B SMSRD smsrd = SMS(DataA, LowerA, UpperA, DataB, LowerB, UpperB); // Debug.Write(2, "MiddleSnakeData", String.Format("{0},{1}", smsrd.x, smsrd.y)); // The path is from LowerX to (x,y) and (x,y) ot UpperX LCS(DataA, LowerA, smsrd.x, DataB, LowerB, smsrd.y); LCS(DataA, smsrd.x, UpperA, DataB, smsrd.y, UpperB); // 2002.09.20: no need for 2 points } } // LCS()
} // DiffCodes /// <summary> /// This is the algorithm to find the Shortest Middle Snake (SMS). /// </summary> /// <param name="DataA">sequence A</param> /// <param name="LowerA">lower bound of the actual range in DataA</param> /// <param name="UpperA">upper bound of the actual range in DataA (exclusive)</param> /// <param name="DataB">sequence B</param> /// <param name="LowerB">lower bound of the actual range in DataB</param> /// <param name="UpperB">upper bound of the actual range in DataB (exclusive)</param> /// <returns>a MiddleSnakeData record containing x,y and u,v</returns> private static SMSRD SMS(DiffData DataA, int LowerA, int UpperA, DiffData DataB, int LowerB, int UpperB) { SMSRD ret; int MAX = DataA.Length + DataB.Length + 1; int DownK = LowerA - LowerB; // the k-line to start the forward search int UpK = UpperA - UpperB; // the k-line to start the reverse search int Delta = (UpperA - LowerA) - (UpperB - LowerB); bool oddDelta = (Delta & 1) != 0; // vector for the (0,0) to (x,y) search int[] DownVector = new int[2 * MAX + 2]; // vector for the (u,v) to (N,M) search int[] UpVector = new int[2 * MAX + 2]; // The vectors in the publication accepts negative indexes. the vectors implemented here are 0-based // and are access using a specific offset: UpOffset UpVector and DownOffset for DownVektor int DownOffset = MAX - DownK; int UpOffset = MAX - UpK; int MaxD = ((UpperA - LowerA + UpperB - LowerB) / 2) + 1; // Debug.Write(2, "SMS", String.Format("Search the box: A[{0}-{1}] to B[{2}-{3}]", LowerA, UpperA, LowerB, UpperB)); // init vectors DownVector[DownOffset + DownK + 1] = LowerA; UpVector[UpOffset + UpK - 1] = UpperA; for (int D = 0; D <= MaxD; D++) { // Extend the forward path. for (int k = DownK - D; k <= DownK + D; k += 2) { // Debug.Write(0, "SMS", "extend forward path " + k.ToString()); // find the only or better starting point int x, y; if (k == DownK - D) { x = DownVector[DownOffset + k + 1]; // down } else { x = DownVector[DownOffset + k - 1] + 1; // a step to the right if ((k < DownK + D) && (DownVector[DownOffset + k + 1] >= x)) { x = DownVector[DownOffset + k + 1]; // down } } y = x - k; // find the end of the furthest reaching forward D-path in diagonal k. while ((x < UpperA) && (y < UpperB) && (DataA.data[x] == DataB.data[y])) { x++; y++; } DownVector[DownOffset + k] = x; // overlap ? if (oddDelta && (UpK - D < k) && (k < UpK + D)) { if (UpVector[UpOffset + k] <= DownVector[DownOffset + k]) { ret.x = DownVector[DownOffset + k]; ret.y = DownVector[DownOffset + k] - k; // ret.u = UpVector[UpOffset + k]; // 2002.09.20: no need for 2 points // ret.v = UpVector[UpOffset + k] - k; return(ret); } // if } // if } // for k // Extend the reverse path. for (int k = UpK - D; k <= UpK + D; k += 2) { // Debug.Write(0, "SMS", "extend reverse path " + k.ToString()); // find the only or better starting point int x, y; if (k == UpK + D) { x = UpVector[UpOffset + k - 1]; // up } else { x = UpVector[UpOffset + k + 1] - 1; // left if ((k > UpK - D) && (UpVector[UpOffset + k - 1] < x)) { x = UpVector[UpOffset + k - 1]; // up } } // if y = x - k; while ((x > LowerA) && (y > LowerB) && (DataA.data[x - 1] == DataB.data[y - 1])) { x--; y--; // diagonal } UpVector[UpOffset + k] = x; // overlap ? if (!oddDelta && (DownK - D <= k) && (k <= DownK + D)) { if (UpVector[UpOffset + k] <= DownVector[DownOffset + k]) { ret.x = DownVector[DownOffset + k]; ret.y = DownVector[DownOffset + k] - k; // ret.u = UpVector[UpOffset + k]; // 2002.09.20: no need for 2 points // ret.v = UpVector[UpOffset + k] - k; return(ret); } // if } // if } // for k } // for D throw new ApplicationException("the algorithm should never come here."); } // SMS
/// <summary> /// This is the algorithm to find the Shortest Middle Snake (SMS). /// </summary> /// <param name="DataA">sequence A</param> /// <param name="LowerA">lower bound of the actual range in DataA</param> /// <param name="UpperA">upper bound of the actual range in DataA (exclusive)</param> /// <param name="DataB">sequence B</param> /// <param name="LowerB">lower bound of the actual range in DataB</param> /// <param name="UpperB">upper bound of the actual range in DataB (exclusive)</param> /// <returns>a MiddleSnakeData record containing x,y and u,v</returns> private static SMSRD SMS(DiffData DataA, int LowerA, int UpperA, DiffData DataB, int LowerB, int UpperB) { SMSRD ret; int MAX = DataA.Length + DataB.Length + 1; int DownK = LowerA - LowerB; // the k-line to start the forward search int UpK = UpperA - UpperB; // the k-line to start the reverse search int Delta = (UpperA - LowerA) - (UpperB - LowerB); bool oddDelta = (Delta & 1) != 0; // vector for the (0,0) to (x,y) search int[] DownVector = new int[2 * MAX + 2]; // vector for the (u,v) to (N,M) search int[] UpVector = new int[2 * MAX + 2]; // The vectors in the publication accepts negative indexes. the vectors implemented here are 0-based // and are access using a specific offset: UpOffset UpVector and DownOffset for DownVektor int DownOffset = MAX - DownK; int UpOffset = MAX - UpK; int MaxD = ((UpperA - LowerA + UpperB - LowerB) / 2) + 1; // Debug.Write(2, "SMS", String.Format("Search the box: A[{0}-{1}] to B[{2}-{3}]", LowerA, UpperA, LowerB, UpperB)); // init vectors DownVector[DownOffset + DownK + 1] = LowerA; UpVector[UpOffset + UpK - 1] = UpperA; for(int D = 0; D <= MaxD; D++) { // Extend the forward path. for(int k = DownK - D; k <= DownK + D; k += 2) { // Debug.Write(0, "SMS", "extend forward path " + k.ToString()); // find the only or better starting point int x, y; if(k == DownK - D) { x = DownVector[DownOffset + k + 1]; // down } else { x = DownVector[DownOffset + k - 1] + 1; // a step to the right if((k < DownK + D) && (DownVector[DownOffset + k + 1] >= x)) x = DownVector[DownOffset + k + 1]; // down } y = x - k; // find the end of the furthest reaching forward D-path in diagonal k. while((x < UpperA) && (y < UpperB) && (DataA.data[x] == DataB.data[y])) { x++; y++; } DownVector[DownOffset + k] = x; // overlap ? if(oddDelta && (UpK - D < k) && (k < UpK + D)) { if(UpVector[UpOffset + k] <= DownVector[DownOffset + k]) { ret.x = DownVector[DownOffset + k]; ret.y = DownVector[DownOffset + k] - k; // ret.u = UpVector[UpOffset + k]; // 2002.09.20: no need for 2 points // ret.v = UpVector[UpOffset + k] - k; return (ret); } // if } // if } // for k // Extend the reverse path. for(int k = UpK - D; k <= UpK + D; k += 2) { // Debug.Write(0, "SMS", "extend reverse path " + k.ToString()); // find the only or better starting point int x, y; if(k == UpK + D) { x = UpVector[UpOffset + k - 1]; // up } else { x = UpVector[UpOffset + k + 1] - 1; // left if((k > UpK - D) && (UpVector[UpOffset + k - 1] < x)) x = UpVector[UpOffset + k - 1]; // up } // if y = x - k; while((x > LowerA) && (y > LowerB) && (DataA.data[x - 1] == DataB.data[y - 1])) { x--; y--; // diagonal } UpVector[UpOffset + k] = x; // overlap ? if(!oddDelta && (DownK - D <= k) && (k <= DownK + D)) { if(UpVector[UpOffset + k] <= DownVector[DownOffset + k]) { ret.x = DownVector[DownOffset + k]; ret.y = DownVector[DownOffset + k] - k; // ret.u = UpVector[UpOffset + k]; // 2002.09.20: no need for 2 points // ret.v = UpVector[UpOffset + k] - k; return (ret); } // if } // if } // for k } // for D throw new ApplicationException("the algorithm should never come here."); }
/// <summary> /// This is the divide-and-conquer implementation of the longes common-subsequence (LCS) /// algorithm. /// The published algorithm passes recursively parts of the A and B sequences. /// To avoid copying these arrays the lower and upper bounds are passed while the sequences stay constant. /// </summary> /// <param name="DataA">sequence A</param> /// <param name="LowerA">lower bound of the actual range in DataA</param> /// <param name="UpperA">upper bound of the actual range in DataA (exclusive)</param> /// <param name="DataB">sequence B</param> /// <param name="LowerB">lower bound of the actual range in DataB</param> /// <param name="UpperB">upper bound of the actual range in DataB (exclusive)</param> private static void LCS(DiffData DataA, int LowerA, int UpperA, DiffData DataB, int LowerB, int UpperB) { // Debug.Write(2, "LCS", String.Format("Analyse the box: A[{0}-{1}] to B[{2}-{3}]", LowerA, UpperA, LowerB, UpperB)); // Fast walkthrough equal lines at the start while(LowerA < UpperA && LowerB < UpperB && DataA.data[LowerA] == DataB.data[LowerB]) { LowerA++; LowerB++; } // Fast walkthrough equal lines at the end while(LowerA < UpperA && LowerB < UpperB && DataA.data[UpperA - 1] == DataB.data[UpperB - 1]) { --UpperA; --UpperB; } if(LowerA == UpperA) { // mark as inserted lines. while(LowerB < UpperB) DataB.modified[LowerB++] = true; } else if(LowerB == UpperB) { // mark as deleted lines. while(LowerA < UpperA) DataA.modified[LowerA++] = true; } else { // Find the middle snakea and length of an optimal path for A and B SMSRD smsrd = SMS(DataA, LowerA, UpperA, DataB, LowerB, UpperB); // Debug.Write(2, "MiddleSnakeData", String.Format("{0},{1}", smsrd.x, smsrd.y)); // The path is from LowerX to (x,y) and (x,y) ot UpperX LCS(DataA, LowerA, smsrd.x, DataB, LowerB, smsrd.y); LCS(DataA, smsrd.x, UpperA, DataB, smsrd.y, UpperB); // 2002.09.20: no need for 2 points } }