Stack in Sata Structure
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Transcript of Stack in Sata Structure
Stacks
• Stack: what is it?• ADT• Applications• Implementation(s)
ABSTRACT DATA TYPE A list could be described by the type of information that it holds and by the
operations that can be performed on the list. In this sense the list is an example of an ABSTRACT DATA TYPE. It is possible to think about a list without knowing the details of how it is implemented. An ABSTRACT DATA TYPE (ADT) has a set of rules (behaviour) and attributes imposed upon it that reflect a real world object.
Eg. A waiting queue at a bank or cinema has some clearly defined rules: • The queue contains customers. • Customers join the rear of the queue. • Customers leave from the front of the queue. • Customers leave the queue in the order in which they joined it. • The queue can be empty.
It is quite sensible to talk about the abstract properties of a queue without concerning ourselves about the implementation of a computer model for the queue.
LINEAR DATA STRUCTURES
All data structures introduced thus far are special subclasses of linear lists. There are two ways of storing data structures in the computer’s memory. The first of these storage-allocation methods, which takes advantage of the one-dimensional property of the computer’s memory, is called sequential allocation.
LINEAR DATA STRUCTURES
The second allocation method, which is based on the storage of the address or location of each element in the list, is known as linked allocation. Both methods of allocation are discussed in detail in this section.
Several subclasses of linear lists can be defined. The most important of these subclasses are called stacks and queues.
LINEAR DATA STRUCTURES (STACK)
One of the most important subclasses of linear lists is the family of stack structure. In this section we first introduce the concepts associated with this subclass of linear structures. Next, several important operations, such as insertion and deletion, for the stack structure are given. In particular, we describe the implementation of these operations for a stack that is represented by a vector.
Stack Abstract Data Type (ADT)• A stack is a special case of a list. • Rather than being allowed to insert a new item into the list at
any place, additions to a stack are restricted to one end identified as the top of the stack.
• Deletions from the stack are also restricted to the top of the stack.
• Usually, only the item at the top of the stack is accessible to someone using the stack ADT.
• A stack is often referred to as a FILO (First In Last Out) list. The stack only allows addition and removal from of the top element so the order of removal is the opposite to that of addition.
What is a stack?• Stores a set of elements in a particular order• Stack principle: LAST IN FIRST OUT• = LIFO• It means: the last element inserted is the first one
to be removed• Example
• Which is the first element to pick up?
Stack
Last In First Out
BA
DCBA
CBA
DCBA
EDCBAtop
top
top
toptop
A
Stack
Stack Applications
• Real life– Pile of books– Plate trays
• More applications related to computer science– Program execution stack (read more from your
text)– Evaluating expressions
Application
• Word processors, editors, etc: – Can implement undo operations
• At runtime:– Runtime system uses a stack to keep track of
function calls and returns, which variables are currently accessible, etc(activation records)
Applications of Stack• Reversing the string
– push each character on to a stack as it is read.
– When the line is finished, we then pop characters off the stack, and they will come off in the reverse order.
Stack Operations
Stack Create an empty stack
~Stack Destroy an existing stack
isEmpty Determine whether the stack is empty
isFull Determine whether the stack is full
push Add an item to the top of the stack
pop Remove the item most recently added
Peek/top Retrieve the item most recently added
Clear Clears the contents of stack
Stack Implementation• Static Implementation
(Using arrays)• Dynamic Implementation
(Using dynamic lists)
Stack Implementation Using Arrays
• For the static implementation of stack an array will be used.
• This array will hold the stack elements.• The top of a stack is represented by an integer
type variable which contains the index of an array containing top element of a stack.
Stack Implementation Using Arrays
4
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0
Empty stack StackSize = 5top = -1
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top
Push 7
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top
Push 8 Push 9
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topPush 4
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top
Push 5
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54top
top = StackSize – 1,Stack is full,We can’t push more elements.
Stack using an Array
top
2571 2 5 7 1
0 1 32 4
top = 3
Stack Implementation Using Arrays
push(element){
if (top == StackSize – 1)cout<<“stack is full”;
elseStack[++top] = element;
}
Stack Implementation Using Arrays
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Empty stack top = -1We can’t pop mpre elements
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Pop
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top
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54top
top = StackSize – 1,Stack is full,We can’t push more elements.
PopPop Pop Pop
Stack Implementation Using Arrays
pop(){
if (top == –1)cout<<“stack is empty”;
elsereturn Stack[top--];
}
Stack Implementation Using Arrays
topElement() //returns the top element of stack //without removing it.
{if (top == –1)
cout<<“stack is empty”;else
return Stack[top];}
Stack Implementation Using Arrays
isEmpty() //checks stack is empty or not{
if (top == –1)return true
elsereturn false
}
Stack Implementation Using Arrays
template <class Element_Type>class Stack{
private:/* This variable is used to indicate stack is full or not*/unsigned int Full_Stack;/* This variable is used to indicate top of the stack */int Top_of_Stack;/* This pointer points to the array which behaves as stack, the space for this array is allocated dynamically */Element_Type *Stack_Array
Continue on next slide…
Stack Implementation Using Arrays
//This constructor creates a stack.Stack(unsigned int Max_Size)
{Full_Stack = Max_Size;Top_of_Stack = -1;Stack_Array = new Element_Type[Max_Size];
}/* This Destructor frees the dynamically allocated
space to the array */ ~Stack(){
delete Stack_Array;}
Continue on next slide…
Stack Implementation Using Arrays
/*This function Return TRUE if the stack is full, FALSE otherwise.*/bool Is_Full(){ if (Top_of_Stack == Full_Stack-1)returns True;elsereturns False;}
/*This function Return TRUE if the stack is empty, FALSE otherwise.*/bool Is_Empty(){ if(Top_of_Stack == -1)returns True;elsereturns False;}
Continue on next slide…
Stack Implementation Using Arrays
// If stack is not full then push an element x in itvoid Push(Element_Type x){ if(is_Full())
cout<<“stack is full”;else
Stack_Array[++Top_of_Stack] = x;}//if Stack is not empty then pop an element form itElement_Type pop(){ if(is_Empty())
cout<<“stack is empty”;else
return Stack_Array[Top_of_Stack--];}
Continue on next slide…
Stack Implementation Using Arrays
// This function makes the stack empty void Make_Empty(){ Top_of_Stack = -1;}/* This function returns the top element of stack */Element_Type Top(){if(is_Empty())cout<<“stack is emepty”;elsereturn Stack_Array[Top_of_Stack];}
};
Stack Using Linked List
• We can avoid the size limitation of a stack implemented with an array by using a linked list to hold the stack elements.
• As with array, however, we need to decide where to insert elements in the list and where to delete them so that push and pop will run the fastest.
Stack Using Linked List
• For a singly-linked list, insert at start or end takes constant time using the head and current pointers respectively.
• Removing an element at the start is constant time but removal at the end required traversing the list to the node one before the last.
• Make sense to place stack elements at the start of the list because insert and removal are constant time.
Stack Using Linked List
• No need for the current pointer; head is enough.
top
2571
1 7 5 2
head
Stack Operation: Listint pop(){ int x = head->get(); Node* p = head; head = head->getNext(); delete p; return x;}
top
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head
Stack Operation: Listvoid push(int x){ Node* newNode = new Node(); newNode->set(x); newNode->setNext(head); head = newNode;}
top
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9
7 5 2
head
push(9)
9
newNode
Stack Operation: Listint top(){ return head->get();} int IsEmpty(){ return ( head == NULL );}
• All four operations take constant time.
Stack: Array or List• Since both implementations support stack
operations in constant time, any reason to choose one over the other?
• Allocating and deallocating memory for list nodes does take more time than preallocated array.
• List uses only as much memory as required by the nodes; array requires allocation ahead of time.
• List pointers (head, next) require extra memory.• Array has an upper limit; List is limited by
dynamic memory allocation.
Use of Stack• Example of use: prefix, infix, postfix
expressions.• Consider the expression A+B: we think of
applying the operator “+” to the operands A and B.
• “+” is termed a binary operator: it takes two operands.
• Writing the sum as A+B is called the infix form of the expression.
Prefix, Infix, Postfix
• Two other ways of writing the expression are
+ A B prefixA B + postfix
• The prefixes “pre” and “post” refer to the position of the operator with respect to the two operands.
Prefix, Infix, Postfix
• Consider the infix expressionA + B * C
• We “know” that multiplication is done before addition.
• The expression is interpreted as A + ( B * C )
• Multiplication has precedence over addition.
Prefix, Infix, Postfix
• Conversion to postfix
A + ( B * C ) infix form
Prefix, Infix, Postfix
• Conversion to postfix
A + ( B * C ) infix formA + ( B C * ) convert multiplication
Prefix, Infix, Postfix
• Conversion to postfix
A + ( B * C ) infix formA + ( B C * ) convert multiplicationA ( B C * ) + convert addition
Prefix, Infix, Postfix
• Conversion to postfix
A + ( B * C ) infix formA + ( B C * ) convert multiplicationA ( B C * ) + convert additionA B C * + postfix form
Prefix, Infix, Postfix
• Conversion to postfix
(A + B ) * C infix form
Prefix, Infix, Postfix
• Conversion to postfix
(A + B ) * C infix form( A B + ) * C convert addition
Prefix, Infix, Postfix
• Conversion to postfix
(A + B ) * C infix form( A B + ) * C convert addition( A B + ) C * convert multiplication
Prefix, Infix, Postfix
• Conversion to postfix
(A + B ) * C infix form( A B + ) * C convert addition( A B + ) C * convert multiplicationA B + C * postfix form
Precedence of Operators
• The five binary operators are: addition, subtraction, multiplication, division and exponentiation.
• The order of precedence is (highest to lowest)
• Exponentiation • Multiplication/division *, /• Addition/subtraction +, -
Precedence of Operators
• For operators of same precedence, the left-to-right rule applies:
A+B+C means (A+B)+C.
• For exponentiation, the right-to-left rule applies
A B C means A ( B C )
Infix to Postfix
Infix PostfixA + B A B +12 + 60 – 23 12 60 + 23 –(A + B)*(C – D ) A B + C D – *A B * C – D + E/F A B C*D – E
F/+