Infinite loop

This article is about the programming term. For the street on which Apple Inc.'s campus is located, see Infinite Loop (street).

An infinite loop is a sequence of instructions in a computer program which loops endlessly, either due to the loop having no terminating condition, having one that can never be met, or one that causes the loop to start over. In older operating systems with cooperative multitasking, infinite loops normally caused the entire system to become unresponsive. With the now-prevalent preemptive multitasking model, infinite loops usually cause the program to consume all available processor time, but can usually be terminated by the user. Busy-wait loops are also sometimes misleadingly called "infinite loops". One possible cause of a computer "freezing" is an infinite loop; others include deadlock and access violations.

Looping

Looping is repeating a set of instructions until a specific condition is met. An infinite loop occurs when the condition will never be met, due to some inherent characteristic of the loop. There are a few situations when this is desired behavior. For example, the games on cartridge-based game consoles typically have no exit condition in their main loop, as there is no operating system for the program to exit to; the loop runs until console is powered off. Most often, the term is used for those situations when this is not the intended result; that is, when this is a bug. Such errors are most common among novice programmers, but can be made by experienced programmers as well, and their causes can be quite subtle.

Here is one example of an infinite loop in pseudocode:

REPEAT
x := 1;
x := x + 1;
UNTIL x > 5

This creates a situation where x will never be greater than 5, since at the start of the loop code x is given the value of 1, thus, the loop will always end in 2 and the loop will never break. This could be fixed by moving the SET x to 1 instruction outside the REPEAT loop.

A simple example of an infinite loop is instructing a computer to keep on adding 0 to 1 until 2 is reached. This will never happen.

One common cause, for example, is that the programmer intends to iterate over a collection of items such as a linked list, executing the loop code once for each item. Improperly formed links can create a reference loop in the list, causing the code to continue forever because the program never reaches the end of the list.

A simple example in BASIC:

Here the loop is quite obvious, as the last line unconditionally sends execution back to the first. Unexpected behavior in evaluating the terminating condition can also cause this problem. Here is an example (in C):

float x = 0.1;
while (x != 1.1) {
  printf("x = %f\n", x);
  x = x + 0.1;
}

On some systems, this loop will execute ten times as expected, but on other systems it will never terminate. The problem is that the loop terminating condition (x != 1.1) tests for exact equality of two floating point values, and the way floating point values are represented in many computers will make this test fail, because they cannot represent the value 1.1 exactly.

Because of the likelihood of tests for equality or not-equality failing unexpectedly, it is safer to use greater-than or less-than tests when dealing with floating-point values. For example, instead of testing whether x equals 1.1, one might test whether (x <= 1.0), or (x < 1.1), either of which would be certain to exit after a finite number of iterations. Another way to fix this particular example would be to use an integer as a loop index, counting the number of iterations that have been performed.

A similar problem occurs frequently in numerical analysis: in order to compute a certain result, an iteration is intended to be carried out until the error is smaller than a chosen tolerance. However, because of rounding errors during the iteration, the specified tolerance can never be reached, resulting in an infinite loop.

The simplest example (in C):

while(1) {
  printf("Infinite Loop\n");
}

This is a loop that will print "Infinite Loop" without halting.

While most infinite loops can be found by close inspection of the code, there is no general method to determine whether a given program will ever halt or will run forever; this is the undecidability of the halting problem.

Multi-party loops

Although infinite loops in a single program are usually easy to predict, a loop caused by several entities interacting is much harder to foresee. Consider a server that always replies with an error message if it does not understand the request. Apparently, there is no possibility for an infinite loop in the server, but if there are two such servers (A and B), and A receives a message of unknown type from B, then A replies with an error message to B, B does not understand the error message and replies to A with its own error message, A does not understand the error message from B and sends yet another error message, and so on ad infinitum. One common example of such situation is an e-mail loop.

Pseudo-infinite loops

A pseudo-infinite loop is a loop that appears infinite but is really just a very long loop.

Impossible termination condition

An example for loop in C:

unsigned int i;
for (i = 1; i > 0; i++) {
  /* loop code */
}

It appears that this will go on indefinitely, but in fact the value of i will eventually reach the maximum value storable in an unsigned int and adding 1 to that number will wrap-around to 0, breaking the loop. The actual limit of i depends on the details of the system and compiler used. With arbitrary-precision arithmetic, this loop would continue until the computer's memory could no longer contain i. If i was a signed integer, rather than an unsigned integer, overflow would be undefined. In this case, the loop could be optimized into an infinite loop.

A similar example in X86 assembly language:

loop:
  ; Code to loop here
  jmp loop

A third example is in MS DOS

Infinite recursion

Infinite recursion, a special case of an infinite loop that is caused by recursion. The most trivial example of this is the term Ω in the lambda calculus, shown below in Scheme:

(define Ω
  (let ([ω (lambda (f) (f f))])
    (ω ω)))

Ω is an infinite recursion, and therefore has no normal form. When using structural recursion, infinite recursions are usually caused by a missing base case or by a faulty inductive step. An example of such a faulty structural recursion:

(define (sum-from-1-to n)
  (+ n (sum-from-1-to (sub1 n))))

The function sum-from-1-to will run out of stack space, as the recursion never stops — it is infinite. To correct the problem, a base case is added.

(define (sum-from-1-to' n)
  (cond
    [(= n 1) 1]
    [else (+ n (sum-from-1-to' (sub1 n)))]))

This revised function will only run out of stack space if n is less than 1 or n is too large; error checking would remove the first case. For information on recursive functions which never run out of stack space, see tail recursion.

See also: Recursion, for an alternate explanation of infinite recursion.

while ( true ) loop

A while ( true ) loop looks infinite at first glance, but there may be a way to escape the loop through a break statement or return statement, e.g.:

while ( true ) {
    if ( $foo->bar () ){
        return;
    }
}

Alderson loop

An Alderson loop is a slang or jargon term for a special version of an infinite loop where there is an exit condition available, but inaccessible in the current implementation of the code, typically due to programmer error. These are most common and visible while debugging user interface code. An example would be if there is a menu stating, “Select 1-3 or 9 to quit” and 9 is not allowed by the function that takes the selection from the user. It is generally considered a common type of software bug. The term allegedly received its name from a programmer who had coded a modal message box in Microsoft Access without either an OK or Cancel button, thereby disabling the entire program whenever the box came up.^[1]

Tight loops

A tight loop is a loop with few instructions in the body that's executed many times (they are prime candidates for optimization). Infinite loops are often tight, but a tight loop may not infinite.

See also

• Cycle detection
• Deadlock
• Goto (command)
• Recursion

References