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Data Structure (Part III)

Data Structure (Part III). Chapter 2 – Arrays. 2.4.4 Matrix Multiplication. j. i. We have to find all the elements in column j. Scan all the elements in smArray ? Exhausted! We can compute the transpose of b . This puts all column elements in consecutive order. currRowBegin. R: 0

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Data Structure (Part III)

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  1. Data Structure (Part III) Chapter 2 – Arrays

  2. 2.4.4 Matrix Multiplication j i • We have to find all the elements in column j. • Scan all the elements in smArray? Exhausted! • We can compute the transpose of b. • This puts all column elements in consecutive order.

  3. currRowBegin R: 0 C: 0 R: 0 C: 4 R: 1 C: 1 R: 2 C: 1 R: 5 C: 0 R: 2 C: 5 R: 3 C: 2 R: 3 C: 0 15 22 -15 11 3 -6 -6 3 -15 91 28 91 15 22 11 28 R: 0 C: 0 R: 0 C: 3 R: 0 C: 5 R: 1 C: 1 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 6 C: -1 R: 5 C: 2 currColB 15 22 -15 11 3 -6 91 28 currRowA currRowIndex currColIndex R: 0 C: 0 R: 0 C: 3 R: 0 C: 5 R: 1 C: 1 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 5 C: 2 To get (0, 0) To get inner product Line 32: …bXpose.smArray[currColIndex].row != currColB Program 2.14 dummy Sum = 0 Sum = 225 d: 225 (1)

  4. currRowBegin R: 0 C: 0 R: 0 C: 4 R: 1 C: 1 R: 5 C: 0 R: 2 C: 1 R: 2 C: 5 R: 3 C: 2 R: 3 C: 0 15 22 -15 11 3 -6 -6 22 15 91 -15 11 3 28 91 28 R: 0 C: 0 R: 0 C: 3 R: 0 C: 5 R: 1 C: 1 R: 1 C: 1 R: 1 C: 2 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 5 C: 2 R: 6 C: -1 currColB currColB 15 22 -15 11 11 3 3 -6 91 28 currRowA currRowIndex currColIndex currColIndex R: 0 C: 0 R: 0 C: 3 R: 0 C: 5 R: 1 C: 1 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 5 C: 2 Line 53: while (smArray[currRowIndex].row == currRowA) Line 54: currRowIndex++; Line 51: else currColIndex++; Leave the while-loop (Line 20) Line 32: …bXpose.smArray[currColIndex].row != currColB dummy Sum = 0 Sum = -225 d: 225 -420 330 -225 (2)

  5. currRowBegin R: 0 C: 0 R: 5 C: 0 R: 3 C: 0 R: 2 C: 5 R: 2 C: 1 R: 3 C: 2 R: 1 C: 1 R: 0 C: 4 15 22 -15 11 3 -6 3 15 28 91 91 -6 11 -15 22 28 R: 1 C: 1 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 5 C: 2 R: 6 C: -1 currColB 11 3 -6 91 28 currRowA currColIndex currRowIndex R: 0 C: 0 R: 0 C: 3 R: 0 C: 5 R: 1 C: 1 R: 1 C: 2 R: 2 C: 3 R: 4 C: 0 R: 5 C: 2 Line 28: while (bXpose.smArray[currColIndex].row == currColB) Line 29: currColIndex++; Line 30: currColB = bXpose.smArray[curColIndex].row; Line 22: if (smArray[currRowIndex].row != currRowA) Line 26: currRowIndex = currBeginRow; dummy Sum = 0 Sum = 1365 d: 225 -420 330 -225 121 33 -18 1365 (3)

  6. 2.5 Representation of Arrays • Multidimensional arrays are usually implemented by one-dimensional array. • can be retrieve efficiently. • Consider an array that is declared a[u1][u2],…,[un] • The number of elements required in the 1D array is

  7. 0 1 2 3 4 a[0][0][0][0] a[0][0][0][1] a[0][0][1][0] a[0][0][1][1] a[0][1][0][0] Representation of Arrays • Example • a[2][3][2][2] • The total number of elements: • 2*3*2*2 = 24 • One of the common ways to represent an array is in row major order.

  8. Representation of Arrays • Row major order a [2] [2] [3] [2] a 0 1 0 1 0 1 0 1 2 0 1 2 0 1 2 0 1 2 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 How to find the position in the 1D array for a[i1][i2][i3][i4]?

  9. a[0] a[1] a[2] …… a[i] … a[u1-1] Array element: … α+i …… α+2 α … α+1 α+u1-1 address: Row Representation of 1D Array • Suppose a[u1] is a 1D array with length of u1 and α is the address of a[0]. • The array can be represented in sequential memory. • The address of a[i] is • α+ i

  10. Row Representation of 2D Array col 0 col 1 col 2 col u2-1 a[0][0] a[0][1] a[0][2] a[0][u2-1] • Suppose a[u1] [u2] is a 2D array with u1 rows and u2 colums. • α is the address of a[0][0]. row 0 a[1][0] a[1][1] a[1][2] a[1][u2-1] row 1 a[u1-1][0] a[u1-1][1] a[u1-1][2] a[u1-1][u2-1] row u1 a[i][j] The address of a[i][j] isα+i*u2+ j. u2 elements u2 row 0 row 1 row i row u1-1 α i*u2 elements α+ i*u2

  11. Column Representation of 2D Array col 0 col 1 col 2 col u2-1 a[0][1] a[0][2] a[0][u2-1] a[0][0] • Column major representation row 0 a[1][0] a[1][1] a[1][2] a[1][u2-1] row 1 a[u1-1][0] a[u1-1][1] a[u1-1][2] a[u1-1][u2-1] row u1 a[i][j] The address of a[i][j] isα+j*u1+ i. u1 elements u1 col 0 col 1 col j col u2-1 α j*u1 elements α+ j*u1

  12. Row Representation of 3D Array • Suppose a[u1][u2] [u3] is a 3D array. • α is the address of a[0][0]. This array can be interpreted as u1 2D arrays of dimensional u2*u3. u2 u1 u3

  13. Row Representation of 3D Array • Sequential row major representation of a 3D array. Each 2D array is represented as mentioned previously. iu1u2 elements α a(0, u2, u3) a(1, u2, u3) a(i, u2, u3) a(u1-1, u2, u3) The address of a[i][j][k] isα+i*u2u3+ j*u2+k.

  14. Formula for n-Dimensional Array • Suppose a[u1][u2] [u3],…,[un] is a n-dimensional array. • α is the address of a[0][0],…,[0]. • The address of a[i1][i2],…,[in] is:

  15. Exercise • Let A be a 2D array. Suppose the address of A(1, 1) is 644, and A(3, 3) is 676. What is the address of A(14, 14)? Assume A has m rows and n columns. Let the address of A(0, 0) is α. Therefore, α + 1*n + 1 = 644 α + 3*n + 3 = 676 Obtain α = 628, n = 15. Thus, the address of A(14, 14) is α + 14*n + 14 = 852

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