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Programs must not allow mathematical operations to exceed the integer ranges provided by their primitive integer data types. According to The Java Language Specification (JLS), §4.2.2, "Integer Operations" [JLS 2015]:

The built-in integer operators do not indicate overflow or underflow in any way. Integer operators can throw a NullPointerException if unboxing conversion of a null reference is required. Other than that, the only integer operators that can throw an exception are the integer divide operator / and the integer remainder operator %, which throw an ArithmeticException if the right-hand operand is zero, and the increment and decrement operators ++ and -- which can throw an OutOfMemoryError if boxing conversion is required and there is insufficient memory to perform the conversion.

The integral types in Java, representation, and inclusive ranges are shown in the following table taken from the JLS, §4.2.1, "Integral Types and Values" [JLS 2015]:

Type

Representation

Inclusive Range

byte

8-bit signed two's-complement

−128 to 127

short

16-bit signed two's-complement

−32,768 to 32,767

int

32-bit signed two's-complement

−2,147,483,648 to 2,147,483,647

long

64-bit signed two's-complement

−9,223,372,036,854,775,808 to 9,223,372,036,854,775,807

char

16-bit

Wiki Markup
According to Sun's Secure Coding Guidelines document \[[SCG 07|AA. Java References#SCG 07]\]:

The (Java) language is type-safe, and the runtime provides automatic memory management and range-checking on arrays. These features also make Java programs immune to the stack-smashing and buffer overflow attacks possible in the C and C++ programming languages, and that have been described as the single most pernicious problem in computer security today.

While this statement is true, arithmetic operations in the Java platform require as much caution as in C and C++. Integer operations can result in overflow because Java does not provide any indication of overflow conditions and silently wraps. While integer overflows in vulnerable C and C++ programs may result in execution of arbitrary code, in Java, wrapped values typically result in incorrect computations and unanticipated outcomes.

Wiki Markup
According to the Java Language Specification \[[JLS 05|AA. Java References#JLS 05]\], section 4.2.2 Integer Operations:

The built-in integer operators do not indicate overflow or underflow in any way. Integer operators can throw a NullPointerException if unboxing conversion of a null reference is required. Other than that, the only integer operators that can throw an exception are the integer divide operator / and the integer remainder operator %, which throw an ArithmeticException if the right-hand operand is zero, and the increment and decrement operators ++ and -- which can throw an OutOfMemoryError if boxing conversion is required and there is not sufficient memory available to perform the conversion.

...

unsigned integers representing UTF-16 code units

...

\u0000 to \uffff (0 to 65,535)

The following table shows the integer overflow behavior of the integral operators.

Operator

Overflow


Operator

Overflow


Operator

Overflow


Operator

Overflow

+

Yes


-=

Yes


<<

No


<

No

-

Yes


*=

Yes


>>

No


>

No

*

Yes


/=

Yes


&

No


>=

No

/

Yes


%=

No


\

No


<=

No

%

No


<<=

No


^

No


==

No

++

Yes


>>=

No


~

No


!=

No

--

Yes


&=

No


!

No

=

No


|=

No


Unary +

No

+=

Yes


^=

No


Unary -

Yes

Because the ranges of Java types are not symmetric (the negation of each minimum value is one more than each maximum value), even operations such as unary negation can overflow if applied to a minimum value. Because the java.lang.math.abs() method returns the absolute value of any number, it can also overflow if given the minimum int or long as an argument.

Comparison of Compliant Techniques

Following are the three main techniques for detecting unintended integer overflow:

  • Precondition testing. Check the inputs to each arithmetic operator to ensure that overflow cannot occur. Throw an ArithmeticException when the operation would overflow if it were performed; otherwise, perform the operation.
  • Upcasting. Cast the inputs to the next larger primitive integer type and perform the arithmetic in the larger size. Check each intermediate result for overflow of the original smaller type and throw an ArithmeticException if the range check fails. Note that the range check must be performed after each arithmetic operation; larger expressions without per-operation bounds checking can overflow the larger type. Downcast the final result to the original smaller type before assigning to a variable of the original smaller type. This approach cannot be used for type long because long is already the largest primitive integer type.
  • BigInteger. Convert the inputs into objects of type BigInteger and perform all arithmetic using BigInteger methods. Type BigInteger is the standard arbitrary-precision integer type provided by the Java standard libraries. The arithmetic operations implemented as methods of this type cannot overflow; instead, they produce the numerically correct result. Consequently, compliant code performs only a single range check just before converting the final result to the original smaller type and throws an ArithmeticException if the final result is outside the range of the original smaller type.

The precondition testing technique requires different precondition tests for each arithmetic operation. This approach can be somewhat more difficult to implement and to audit than either of the other two approaches.

The upcast technique is the preferred approach when applicable. The checks it requires are simpler than those of the previous technique; it is substantially more efficient than using BigInteger. Unfortunately, it cannot be applied to operations involving type long, as there is no bigger type to upcast to.

The BigInteger technique is conceptually the simplest of the three techniques because arithmetic operations on BigInteger cannot overflow. However, it requires the use of method calls for each operation in place of primitive arithmetic operators, which can obscure the intended meaning of the code. Operations on objects of type BigInteger can also be significantly less efficient than operations on the original primitive integer type.

Precondition Testing

The following code example shows the necessary precondition checks required for each arithmetic operation on arguments of type int. The checks for the other integral types are analogous. These methods throw an exception when an integer overflow would otherwise occur; any other conforming error handling is also acceptable. Since ArithmeticException inherits from RuntimeException, we do not need to declare it in a throws clause.

Code Block
bgColor#ccccff
static final int safeAdd(int left, int right) {
  if (right > 0 ? left > Integer.MAX_VALUE - right
                : left < Integer.MIN_VALUE - right) {
    throw new ArithmeticException("Integer overflow");
  }
  return left + right;
}

static final int safeSubtract(int left, int right) {
  if (right > 0 ? left < Integer.MIN_VALUE + right 
                : left > Integer.MAX_VALUE + right

Wiki Markup
According to the Java Language Specification \[[JLS 05|AA. Java References#JLS 05]\], section 4.2.1 "Integral Types and Values", the values of the integral types are integers in the following ranges:

  • For byte, from –128 to 127, inclusive
  • For short, from –32768 to 32767, inclusive
  • For int, from –2147483648 to 2147483647, inclusive
  • For long, from –9223372036854775808 to 9223372036854775807, inclusive
  • For char, from '\u0000' to '\uffff' inclusive, that is, from 0 to 65535

The table shown below enlists the operators that can lead to overflows:

Operator

Overflow

 

Operator

Overflow

 

Operator

Overflow

 

Operator

Overflow

+

yes

 

-=

yes

 

<<

no

 

<

no

-

yes

 

*=

yes

 

>>

no

 

>

no

*

yes

 

/=

yes

 

&

no

 

>=

no

/

yes

 

%=

no

 

\

no

 

<=

no

%

no

 

<<=

no

 

^

no

 

==

no

++

yes

 

>>=

no

 

~

no

 

!=

no

--

yes

 

&=

no

 

!

no

 

&&

no

=

no

 

|=

no

 

un +

no

 

||

no

+=

yes

 

^=

no

 

un -

yes

 

?:

no

Addition

Addition (as with all arithmetic operations) in Java is performed on signed numbers only as unsigned numbers are unsupported.

Noncompliant Code Example

In this noncompliant code example, the result of the addition can overflow.

Code Block
bgColor#FFcccc

public int do_operation(int a, int b){
  // May result in overflow 
  int temp = a + b;
  return temp;
}

If the result of the addition is greater than the maximum value or less than the minimum value that can be represented as an int, then the variable temp will contain an erroneous result.

Compliant Solution (Bounds Checking)

Explicitly check the range of each arithmetic operation and throw an ArithmeticException on overflow. When performing operations on values of type int, the arithmetic can be performed using variables of type long. For performing arithmetic operations on numbers of type long, the BigInteger Class must be used.

Because a variable of the long type is guaranteed to hold the result of an addition, subtraction or multiplication of values of type int, the result can be assigned to such a variable, and if the result is in the integer range, we can simply downcast it to a value of type int.

Compliant Solution (Use long and Downcast)

This compliant solution uses a variable of type long to store the result of the addition and proceeds to range check its value.
If the value cannot be represented in a variable of type int, it throws an ArithmeticException. Otherwise, it down casts the result to a value of type int.

Code Block
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public int do_operation(int a, int b) throws ArithmeticException {
   long temp = (long)a + (long)b;
   if (temp > Integer.MAX_VALUE || temp < Integer.MIN_VALUE) {
     throw new ArithmeticException("Out of range");
   }
   return (int)temp; // Value within range; can perform the addition
}

Compliant Solution (Bounds Checking)

This compliant solution range checks the operand values to ensure that the result does not overflow.

Code Block
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public int do_operation(int a, int b) throws ArithmeticException {
  if( b>0 ? a > Integer.MAX_VALUE - b : a < Integer.MIN_VALUE - b ) {
    throw new ArithmeticException("Not in range");
  }
  return a + b;  // Value within range so addition can be performed
}

Compliant Solution (Use BigInteger Class)

This compliant solution uses the BigInteger class as a wrapper to test for the overflow.

Code Block
bgColor#ccccff

public boolean overflow(long a, long b) {
  BigInteger ba = new BigInteger(String.valueOf(a));
  BigInteger bb = new BigInteger(String.valueOf(b));
  BigInteger br = ba.add(bb);
  return (br.compareTo(BigInteger.valueOf(Long.MAX_VALUE)) == 1 ||
          br.compareTo(BigInteger.valueOf(Long.MIN_VALUE)) == -1);
}

public long do_operation(long a, long b) throws ArithmeticException {
  if(overflow(a,b)) {
    throw new ArithmeticException("NotInteger in rangeoverflow");
  }
  return //left Within- rangeright;
}

static safely perform the addition
  return a + b;
}

With use of the BigInteger class, integer overflows are eliminated. However, due to increased performance costs, it should be used only when other methods are not appropriate.

Subtraction

Care must be taken while performing the subtraction operation as well because overflows (or underflows) are possible.

Noncompliant Code Example

In this noncompliant code example, the subtraction operation may overflow negatively when a is a negative integer and b is a large positive integer such that their sum is not representable as a value of type int. It can also overflow when a is positive and b is negative and their sum is not representable as a value of type int.

Code Block
bgColor#FFcccc

public int do_operation(int a, int b) {
  int temp = a - b;
  // Could result in overflow
  return temp;
}

Compliant Solution (Use Long)

This compliant solution suggests explicit range checking before performing the subtraction.

Code Block
bgColor#ccccff

public int do_operation(int a,int b) {
  long temp = (long)a - (long)b;
  if(temp < Integer.MIN_VALUE || temp > Integer.MAX_VALUE) final int safeMultiply(int left, int right) {
  if (right > 0 ? left > Integer.MAX_VALUE/right
                  || left < Integer.MIN_VALUE/right 
                : (right < -1 ? left > Integer.MIN_VALUE/right 
                                || left < Integer.MAX_VALUE/right
                              : right == -1 
                                && left == Integer.MIN_VALUE) ) {
    throw new ArithmeticException("NotInteger in rangeoverflow");
  }
  return left (int)* tempright;
}

Compliant Solution (Bounds Checking)

This compliant solution uses range checking to ensure that the result will not overflow.

Code Block
bgColor#ccccff

public
static final int do_operationsafeDivide(int aleft, int bright) throws ArithmeticException {
  if ((bleft > 0 ? a < Integer.MIN_VALUE + b : a > Integer.MAX_VALUE + b == Integer.MIN_VALUE) && (right == -1)) {
    throw new ArithmeticException("NotInteger in rangeoverflow");
  }
  return aleft -/ bright;
}

static final // Value within range; can perform the addition
}

Compliant Solution (Use BigInteger Class)

The BigInteger class can be used as a overflow-test wrapper as shown in this compliant solution.

Code Block
bgColor#ccccff

public boolean underflow(long a, long b) {
  BigInteger ba = new BigInteger(String.valueOf(a));
  BigInteger bb = new BigInteger(String.valueOf(b));
  BigInteger br = ba.subtract(bb);
  return (br.compareTo(BigInteger.valueOf(Long.MAX_VALUE)) == 1 ||
          br.compareTo(BigInteger.valueOf(Long.MIN_VALUE)) == -1);
}

public long do_operation(long a, long b) throws ArithmeticException {
  if(underflow(a,b)) {
    throw new ArithmeticException("Not in range");
  }
  // Within range; safely perform the subtraction
  return a - b;
}

Multiplication

This noncompliant code example can result in a signed integer overflow during the multiplication of the signed operands a and b. If this behavior is unanticipated, the resulting value may lead to undefined behavior.

Noncompliant Code Example

Code Block
bgColor#FFcccc

int a, b, result
//do stuff
result = a * b; // May result in overflow

Compliant Solution

int safeNegate(int a) {
  if (a == Integer.MIN_VALUE) {
    throw new ArithmeticException("Integer overflow");
  }
  return -a;
}
static final int safeAbs(int a) {
  if (a == Integer.MIN_VALUE) {
    throw new ArithmeticException("Integer overflow");
  }
  return Math.abs(a);
}

These method calls are likely to be inlined by most just-in-time (JIT) systems.

These checks can be simplified when the original type is char. Because the range of type char includes only positive values, all comparisons with negative values may be omitted.

Noncompliant Code Example

Either operation in this noncompliant code example could result in an overflow. When overflow occurs, the result will be incorrect.

Code Block
bgColor#FFcccc
public static int multAccum(int oldAcc, int newVal, int scale) {
  // May result in overflow
  return oldAcc + (newVal * scale);
}

Compliant Solution (Precondition Testing)

This compliant solution uses the safeAdd() and safeMultiply() methods defined in the "Precondition Testing" section to perform secure integral operations or throw ArithmeticException on overflow:

Code Block
bgColor#ccccff
public static int multAccum(int oldAcc, int newVal, int scale) {
  return safeAdd(oldAcc, safeMultiply(newVal, scale));
}

Compliant Solution (Java 8, Math.*Exact())

This compliant solution uses the addExact() and multiplyExact() methods defined in the Math class. These methods were added to Java as part of the Java 8 release, and they also either return a mathematically correct value or throw ArithmeticException. The Math class also provides SubtractExact() and negateExact() but does not provide any methods for safe division or absolute valueBecause the size of the type long (64 bits) is twice the size of the type int (32 bits), the multiplication should be performed using a variable of type long. If the product is in the range of the int type, it can be safely downcast to a value of type int.

Code Block
bgColor#ccccff

intpublic a,static b, result;
long temp = (long) a * (long)b;
if(temp > Integer.MAX_VALUE || temp < Integer.MIN_VALUEint multAccum(int oldAcc, int newVal, int scale) {
  throw new ArithmeticException("Not in range"); // Overflow
}
result = (int) temp; // Value within range, safe to downcast

Division

Although Java throws a java.lang.ArithmeticException for division by zero, the same issue as with C/C++ manifests, while dividing the Integer.MIN_VALUE by -1. It produces Integer.MIN_VALUE unexpectedly (as the result is -(Integer.MIN_VALUE) = Integer.MAX_VALUE + 1)).

Noncompliant Code Example

This noncompliant code example divides a and b without checking the range of the result.

Code Block
bgColor#FFcccc

int a;
int b;
int result;
result = a/b;

Compliant Solution

This compliant solution handles the special case of Integer.MIN_VALUE and -1 being used as the dividend and divisor, respectively.

return Math.addExact(oldAcc, Math.multiplyExact(newVal, scale));
}

Compliant Solution (Upcasting)

This compliant solution shows the implementation of a method for checking whether a value of type long falls within the representable range of an int using the upcasting technique. The implementations of range checks for the smaller primitive integer types are similar.

Code Block
bgColor#ccccff
public static long intRangeCheck(long value) {
  if ((value < Integer.MIN_VALUE) || (value > Integer.MAX_VALUE)) {
    
Code Block
bgColor#ccccff

if(a == Integer.MIN_VALUE && b == -1) {
  throw new ArithmeticException("NotInteger in rangeoverflow");
 // May}
 be Integer.MIN_VALUE and -1return value;
}
result = a/b; // Safe operation

Remainder Operator

The remainder operator in Java has the following behavior for corner cases:

  • If the modulo of Integer.MIN_VALUE with -1 is taken the result is always 0.
  • If the right-hand operand is zero, then the integer remainder operator % will throw an ArithmeticException.
  • The sign of the remainder is always the same as that of the dividend. For example, -3 % -2 results in the value -1. This behavior can sometimes be deceptive.

Refer to INT02-J. Do not assume a positive remainder when using the remainder operator for more details.

Unary Negation

If Integer.MIN_VALUE is negated, the same value Integer.MIN_VALUE is obtained. Range checking is important in this case as well.

Noncompliant Code Example

This noncompliant code example tries to negate the result without checking whether it is Integer.MIN_VALUE.

Code Block
bgColor#FFcccc

int temp = -result;

Compliant Solution

...



public static int multAccum(int oldAcc, int newVal, int scale) {
  final long res = intRangeCheck(
   ((long) oldAcc) + intRangeCheck((long) newVal * (long) scale)
  );
  return (int) res; // Safe downcast
}

Note that this approach cannot be applied to values of type long because long is the largest primitive integral type. Use the BigInteger technique instead when the original variables are of type long.

Compliant Solution (BigInteger)

This compliant solution uses the BigInteger technique to detect overflow:

Code Block
bgColor#ccccff
private static final BigInteger bigMaxInt = 
  BigInteger.valueOf(Integer.MAX_VALUE);
private static final BigInteger bigMinInt =    
  BigInteger.valueOf(Integer.MIN_VALUE);

public static BigInteger intRangeCheck(BigInteger val) {
  if (val.compareTo(bigMaxInt) == 1 ||
      val.compareTo(bigMinInt) == -1) {
    throw new ArithmeticException("Integer overflow");
  }
  return val;
}

public static int multAccum(int oldAcc, int newVal, int scale) {
  BigInteger product =
    BigInteger.valueOf(newVal).multiply(BigInteger.valueOf(scale));
  BigInteger res = 
    intRangeCheck(BigInteger.valueOf(oldAcc).add(product));
  return res.intValue(); // Safe conversion
}

Noncompliant Code Example (AtomicInteger)

Operations on objects of type AtomicInteger suffer from the same overflow issues as other integer types. The solutions are generally similar to the solutions already presented; however, concurrency issues add additional complications. First, potential issues with time-of-check, time-of-use (TOCTOU) must be avoided (see VNA02-J. Ensure that compound operations on shared variables are atomic for more information). Second, use of an AtomicInteger creates happens-before relationships between the various threads that access it. Consequently, changes to the number of accesses or order of accesses can alter the execution of the overall program. In such cases, you must either choose to accept the altered execution or carefully craft your implementation to preserve the exact number of accesses and order of accesses to the AtomicInteger.

This noncompliant code example uses an AtomicInteger, which is part of the concurrency utilities. The concurrency utilities lack integer overflow checks.

Code Block
bgColor#FFcccc
class InventoryManager {
  private final AtomicInteger itemsInInventory = new AtomicInteger(100);

  //...
  public final void nextItem() {
    itemsInInventory.getAndIncrement();
  }
}

Consequently, itemsInInventory can wrap around to Integer.MIN_VALUE when the nextItem() method is invoked when itemsInInventory == Integer.MAX_VALUE.

Compliant Solution (AtomicInteger)

This compliant solution uses the get() and compareAndSet() methods provided by AtomicInteger to guarantee successful manipulation of the shared value of itemsInInventory. This solution has the following characteristics:

  • The number and order of accesses to itemsInInventory remain unchanged from the noncompliant code example.
  • All operations on the value of itemsInInventory are performed on a temporary local copy of its value.
  • The overflow check in this example is performed in inline code rather than encapsulated in a method call. This is an acceptable alternative implementation. The choice of method call versus inline code should be made according to your organization's standards and needs.
Code Block
bgColor#ccccff

if(result == Integer.MIN_VALUE) {
  throw new ArithmeticException("Not in range");
}
temp = -result;

Absolute Value

A related pitfall is the use of the Math.abs() method that takes a parameter of type int and returns its absolute value. Because of the asymmetry between the representation of negative and positive integer values (Integer.MAX_VALUE is 2147483647 and Integer.MIN_VALUE is -2147483648, which means there is one more negative integer than positive integers), there is no equivalent positive value (+2147483648) for Integer.MIN_VALUE.

Shifting

The shift operation in Java has the following properties:

  • The right shift is an arithmetic shift
  • The types boolean, float and double cannot use the bit shifting operators.
  • If the value to be shifted is of type int, only the five lowest-order bits of the right-hand operand are used as the shift distance. That is, the shift distance is the value of the right-hand operand masked by 31 (0x1F). This results in a value modulo 31, inclusive.
  • Wiki Markup
    When the value to be shifted (left-operand) is of type {{long}}, only the last 6 bits of the right-hand operand are used to perform the shift. The shift distance is the value of the right-hand operand masked by 63 (0x3D) \[[JLS 03|AA. Java References#JLS 03]\], i.e., it is always between 0 and 63. (If the shift value is greater than 64, then the shift is {{value % 64}}.)

Refer to INT05-J. Use shift operators correctly for further details about the behavior of the shift operators.

Noncompliant Code Example

Wiki Markup
This noncompliant code example attempts to shift the value {{i}} of type {{int}} until, after 32 iterations, the value becomes 0. Unfortunately, this loop never terminates because an attempt to shift a value of type {{int}} by 32 bits results in the original value rather than the value 0. \[[Bloch 05|AA. Java References#Bloch 05]\] 

Code Block
bgColor#FFcccc

int i = 0;
while ((-1 << i) != 0)
  i++;

Compliant Solution

This compliant solution initially sets the value val to -1 and repeatedly shifts the value by one place on each successive iteration.

Code Block
bgColor#ccccff

for (int val = -1; val != 0; val <<= 1) { /* ... */ }

Risk Assessment

Failure to perform explicit range checking can lead to integer overflows causing unexpected program control flow or unanticipated program behavior.

Rule

Severity

Likelihood

Remediation Cost

Priority

Level

INT34- J

medium

unlikely

medium

P4

L3

Automated Detection

TODO

Related Vulnerabilities

Search for vulnerabilities resulting from the violation of this rule on the CERT website.

Other Languages

This rule appears in the C Secure Coding Standard as INT32-C. Ensure that operations on signed integers do not result in overflow.

This rule appears in the C++ Secure Coding Standard as INT32-CPP. Ensure that operations on signed integers do not result in overflow.

References

Wiki Markup
\[[SCG 07|AA. Java References#SCG 07]\] Introduction
\[[JLS 03|AA. Java References#JLS 03]\] 4.2.2 Integer Operations and 15.22 Bitwise and Logical Operators
\[[Tutorials 08|AA. Java References#Tutorials 08]\] Primitive Data Types
\[[Seacord 05|AA. Java References#Seacord 05]\] Chapter 5. Integers
\[[Bloch 05|AA. Java References#Bloch 05]\] Puzzle 27: Shifty i's
\[[MITRE 09|AA. Java References#MITRE 09]\] [CWE ID 682|http://cwe.mitre.org/data/definitions/682.html] "Incorrect Calculation", [CWE ID 190|http://cwe.mitre.org/data/definitions/190.html] "Integer Overflow or Wraparound", [CWE ID 191|http://cwe.mitre.org/data/definitions/191.html]  "Integer Underflow (Wrap or Wraparound)"

class InventoryManager {
  private final AtomicInteger itemsInInventory =
      new AtomicInteger(100);

  public final void nextItem() {
    while (true) {
      int old = itemsInInventory.get();
      if (old == Integer.MAX_VALUE) {
        throw new ArithmeticException("Integer overflow");
      }
      int next = old + 1; // Increment
      if (itemsInInventory.compareAndSet(old, next)) {
        break;
      }
    } // End while
  } // End nextItem()
}

The two arguments to the compareAndSet() method are the expected value of the variable when the method is invoked and the intended new value. The variable's value is updated only when the current value and the expected value are equal [API 2006] (refer to VNA02-J. Ensure that compound operations on shared variables are atomic for more details).

Exceptions

NUM00-J-EX0: Depending on circumstances, integer overflow could be benign. For example, many algorithms for computing hash codes use modular arithmetic, intentionally allowing overflow to occur. Such benign uses must be carefully documented.

NUM00-J-EX1: Prevention of integer overflow is unnecessary for numeric fields that undergo bitwise operations and not arithmetic operations (see NUM01-J. Do not perform bitwise and arithmetic operations on the same data for more information).

Risk Assessment

Failure to perform appropriate range checking can lead to integer overflows, which can cause unexpected program control flow or unanticipated program behavior.

Rule

Severity

Likelihood

Remediation Cost

Priority

Level

NUM00-J

Medium

Unlikely

Medium

P4

L3

Automated Detection

Automated detection of integer operations that can potentially overflow is straightforward. Automatic determination of which potential overflows are true errors and which are intended by the programmer is infeasible. Heuristic warnings might be helpful.

Tool
Version
Checker
Description
CodeSonar
Include Page
CodeSonar_V
CodeSonar_V

JAVA.MATH.ABSRAND
JAVA.ARITH.OFLOW

Abs on random (Java)
Cast: int Computation to long (Java)

Coverity7.5

BAD_SHIFT
OVERFLOW_BEFORE_WIDEN

Implemented
Parasoft Jtest
Include Page
Parasoft_V
Parasoft_V
CERT.NUM00.ICO
CERT.NUM00.BSA
CERT.NUM00.CACO
Avoid calculations which result in overflow or NaN
Do not use an integer outside the range of [0, 31] as the amount of a shift
Avoid using compound assignment operators in cases which may cause overflow
PVS-Studio

Include Page
PVS-Studio_V
PVS-Studio_V

V5308, V6117

Related Guidelines

SEI CERT C Coding Standard

INT32-C. Ensure that operations on signed integers do not result in overflow

ISO/IEC TR 24772:2010

Wrap-around Error [XYY]

MITRE CWE

CWE-682, Incorrect Calculation
CWE-190, Integer Overflow or Wraparound
CWE-191, Integer Underflow (Wrap or Wraparound)

Android Implementation Details

Mezzofanti for Android contained an integer overflow that prevented the use of a big SD card. Mezzofanti contained an expression:

(int) StatFs.getAvailableBlocks() * (int) StatFs.getBlockSize() 

to calculate the available memory in an SD card, which could result in a negative value when the available memory is larger than Integer.MAX_VALUE. Note that these methods are deprecated in API level 18 and replaced by getAvailableBlocksLong() and getBlockSizeLong().

Bibliography


...

Image Added Image Added Image AddedINT03-J. Do not cast numeric types to wider floating-point types without range checking      06. Integers (INT)      INT04-J. Do not attempt to store signed values in the char integral type