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DATA STRUCTURE & ALGORITHMS CHAPTER 3: STACKS. 2 Objectives In this chapter, you will: Learn about stacks Examine various stack operations Discover stack.

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Presentation on theme: "DATA STRUCTURE & ALGORITHMS CHAPTER 3: STACKS. 2 Objectives In this chapter, you will: Learn about stacks Examine various stack operations Discover stack."— Presentation transcript:

1 DATA STRUCTURE & ALGORITHMS CHAPTER 3: STACKS

2 2 Objectives In this chapter, you will: Learn about stacks Examine various stack operations Discover stack applications

3 3 Stacks Stack: list of homogenous elements –Addition and deletion occur only at one end, called the top of the stack Example: in a cafeteria, the second tray can be removed only if first tray has been removed –Last in first out (LIFO) data structure Operations: –Push: to add an element onto the stack –Pop: to remove an element from the stack

4 4 Stacks (continued)

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6 6 Stack Operations In the abstract class stackADT : –initializeStack –isEmptyStack –isFullStack –push –top –pop

7 Stack Application Stack applications classified into 4 broad categories: Reversing data – e.g. reverse a list & convert decimal to binary. –Eg. 26 = 110102 Parsing data – e.g. translate a source program to machine language. Postponing data usage – e.g. evaluation, transformation. Backtracking – e.g. computer gaming, decision analysis, expert systems.

8 8 Implementation of Stacks as Arrays First element can go in first array position, the second in the second position, etc. The top of the stack is the index of the last element added to the stack Stack elements are stored in an array Stack element is accessed only through top To keep track of the top position, use a variable called stackTop

9 9 Implementation of Stacks as Arrays Because stack is homogeneous –You can use an array to implement a stack Can dynamically allocate array –Enables user to specify size of the array The class stackType implements the functions of the abstract class stackADT

10 10 Implementation of Stacks as Arrays C++ arrays begin with the index 0 –Must distinguish between: The value of stackTop The array position indicated by stackTop If stackTop is 0, the stack is empty If stackTop is nonzero, the stack is not empty –The top element is given by stackTop - 1

11 11 Implementation of Stacks as Arrays

12 12 Initialize Stack

13 Empty Stack If stackTop is 0, the stack is empty

14 14 Full Stack The stack is full if stackTop is equal to maxStackSize

15 15 Push Store the newItem in the array component indicated by stackTop Increment stackTop Must avoid an overflow

16 16 Push

17 17 Return the Top Element

18 18 Pop Simply decrement stackTop by 1 Must check for underflow condition

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20 Stacks Example Example Suppose the following 6 elements are pushed, in order, onto an empty stacks. A, B, C, D, E, F We write the stack: STACK: A, B, C, D, E, F

21 Pseudocode for Array of Stacks Procedure 3.1 PUSH(STACK, TOP, MAXSTK, ITEM) This procedure pushes an ITEM onto a stack. 1. [Stack already filled ?] If TOP = MAXSTK, then: Print:OVERFLOW, and Return. 2. Set TOP := TOP + 1. [Increses TOP by 1] 3. Set STACK[TOP] :=ITEM. [Inserts ITEM in new TOP position. 4. Return.

22 Pseudocode for Array of Stacks Procedure 3.2 POP(STACK, TOP, ITEM) This procedures deletes the top element of STACK and assigns it to the variable ITEM. 1. [Stacks has an item to be removed?] If TOP = 0, the Print: UNDERFLOW, and RETURN. 2. Set ITEM := STACK[TOP].[Assigns TOP elements to ITEM.] 3. Set TOP := TOP – 1.[ Decreases TOP by 1] 4. Return.

23 Stack Exercise Exercise 1: Consider the following stack of characters, where STACK is allocated N = 8 memory cells : STACK : A,C,D, F, K, _, _, _ ( For notational convenience, we use “_” to denote an empty memory cell). Describe the stack as the following operations take place : (a)POP (STACK, ITEM )(e) POP (STACK, ITEM) (b)POP (STACK,ITEM) (f) PUSH(STACK, R) (c)PUSH (STACK, L)(g) PUSH(STACK, S) (d) PUSH (STACK, P)(h) POP(STACK, ITEM)

24 Stack Exercise Exercise 2: Consider the following stack, where STACK is allocated N = 6 memory cells : STACK : A, D, E, F, G, _______. (a) PUSH(STACK, K) (b) POP(STACK, ITEM ) (c) PUSH(STACK, L) (d) PUSH(STACK,S) (e) POP(STACK, ITEM) (f) PUSH(STACK, M)

25 25 Copy Stack

26 26 Stack Header File Place definitions of class and functions (stack operations) together in a file

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29 29 Linked Implementation of Stacks Array only allows fixed number of elements If number of elements to be pushed exceeds array size –Program may terminate Linked lists can dynamically organize data In a linked representation, stackTop is pointer to top element in stack

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31 31 Default Constructor Initializes the stack to an empty state when a stack object is declared –Sets stackTop to NULL

32 32 Empty Stack and Full Stack In the linked implementation of stacks, the function isFullStack does not apply –Logically, the stack is never full

33 33 Initialize Stack

34 34 Push The newElement is added at the beginning of the linked list pointed to by stackTop

35 35 Push (continued)

36 36 Push (continued)

37 37 Push (continued)

38 38 Push (continued) We do not need to check whether the stack is full before we push an element onto the stack

39 C++ Programming: Program Design Including Data Structures, Fourth Edition 39 Return the Top Element

40 40. Pop Node pointed to by stackTop is removed

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42 C++ Programming: Program Design Including Data Structures, Fourth Edition 42 Pop (continued)

43 43 Copy Stack

44 44 Copy Stack Notice that this function is similar to the definition of copyList for linked lists

45 45 Application of Stacks: Postfix Expressions Calculator Infix notation: usual notation for writing arithmetic expressions –The operator is written between the operands –Example: a + b –The operators have precedence Parentheses can be used to override precedence

46 46 Application of Stacks: Postfix Expressions Calculator Prefix (Polish) notation: the operators are written before the operands –Introduced by the Polish mathematician Jan Lukasiewicz Early 1920s –The parentheses can be omitted –Example: + a b

47 47 Application of Stacks: Postfix Expressions Calculator Reverse Polish notation: the operators follow the operands (postfix operators) –Proposed by the Australian philosopher and early computer scientist Charles L. Hamblin Late 1950's –Advantage: the operators appear in the order required for computation –Example: a + b * c In a postfix expression: a b c * +

48 48 Application of Stacks: Postfix Expressions Calculator

49 49 Application of Stacks: Postfix Expressions Calculator Postfix notation has important applications in computer science –Many compilers first translate arithmetic expressions into postfix notation and then translate this expression into machine code Evaluation algorithm: –Scan expression from left to right –When an operator is found, back up to get the operands, perform the operation, and continue

50 50 Application of Stacks: Postfix Expressions Calculator Example: 6 3 + 2 * = –Read first symbol 6 is a number  push it onto the stack –Read next symbol 3 is a number  push it onto the stack

51 51 Application of Stacks: Postfix Expressions Calculator Example: 6 3 + 2 * = –Read next symbol + is an operator (two operands)  pop stack twice, perform operation, put result back onto stack

52 52 Example: 6 3 + 2 * = –Read next symbol 2 is a number  push it onto the stack Application of Stacks: Postfix Expressions Calculator

53 53 Example: 6 3 + 2 * = –Read next symbol * is an operator  pop stack twice, perform operation, put result back onto stack Application of Stacks: Postfix Expressions Calculator

54 54 Example: 6 3 + 2 * = –Read next symbol = is an operator  indicates end of expression Print the result (pop stack first) Application of Stacks: Postfix Expressions Calculator

55 55 Application of Stacks: Postfix Expressions Calculator Symbols can be numbers or anything else: –+, -, *, and / are operators Pop stack twice and evaluate expression If stack has less than two elements  error –If symbol is =, the expression ends Pop and print answer from stack If stack has more than one element  error –If symbol is anything else Expression contains an illegal operator

56 56 Application of Stacks: Postfix Expressions Calculator Examples: 7 6 + 3 ; 6 - = ; is an illegal operator 14 + 2 3 * = Does not have enough operands for + 14 2 3 + = Error: stack will have two elements when we encounter equal ( = ) sign

57 57 Application of Stacks: Postfix Expressions Calculator We assume that the postfix expressions are in the following form: #6 #3 + #2 * = –If symbol scanned is #, next input is a number –If the symbol scanned is not #, then it is: An operator (may be illegal) or An equal sign (end of expression) We assume expressions contain only +, -, *, and / operators

58 58 Conclusions Stack: items are added/deleted from one end –Last In First Out (LIFO) data structure –Operations: push, pop, initialize, destroy, check for empty/full stack –Can be implemented as array or linked list –Middle elements should not be accessed Postfix notation: operators are written after the operands (no parentheses needed)

59 59 References C++ Programming: Program Design Including Data Structures, Fourth Edition


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