Is there an upper bound to BigInteger? [duplicate]

Possible Duplicate:
What does BigInteger having no limit mean?

The Javadoc for `BigInteger` does not define any maximum or minimum. However, it does say:

(emphasis added)

Immutable arbitrary-precision integers

Is there such a maximum, even in theory? Or is the way `BigInteger` operates fundamentally different, such that there is in reality no maximum except for the amount of memory available on the computer?

• In theory there is no limit. – Miserable Variable Oct 2 '12 at 15:29
• The accepted answer in that possible duplicate does not specify the theoretical limit of `BigInteger`; or, if it truly does not have one, it does not explain why. Instead, it just says that if there is a maximum, it will never affect you with current memory limitations. – asteri Oct 2 '12 at 15:44
• Its probably in base 2, so the max is (2 ^ 32) ^ Integer.MAX_VALUE in base 2. – Ran Feb 9 '15 at 19:43
• @Ran, `BigInteger.valueOf(2).pow(500500)` returned something for me. – Samuel Edwin Ward Apr 17 '15 at 21:04
• @Ran, "returns nothing" doesn't mean anything in Java. – Douglas Held Mar 20 '16 at 19:01

3 Answers

The number is held in an `int[]` - the maximum size of an array is `Integer.MAX_VALUE`. So the maximum BigInteger probably is `(2 ^ 32) ^ Integer.MAX_VALUE`.

Admittedly, this is implementation dependent, not part of the specification.

In Java 8, some information was added to the BigInteger javadoc, giving a minimum supported range and the actual limit of the current implementation:

`BigInteger` must support values in the range `-2``Integer.MAX_VALUE` (exclusive) to `+2``Integer.MAX_VALUE` (exclusive) and may support values outside of that range.

Implementation note: `BigInteger` constructors and operations throw `ArithmeticException` when the result is out of the supported range of `-2``Integer.MAX_VALUE` (exclusive) to `+2``Integer.MAX_VALUE` (exclusive).

• As the values are used as unsigned `int` values, the maximum is more like `(2^32)^Integer.MAX_VALUE * 10^Integer.MAX_VALUE` as it can be scaled as well. – Peter Lawrey Oct 2 '12 at 15:26
• @PeterLawrey Are you sure there is a scale for BigInteger? (there is one for BigDecimal). – assylias Oct 2 '12 at 15:28
• Since integer MAX_VALUE is approx 2^31, the maximal value can't be kept in 32-bit computer memory :) So the memory is the limit. – Suzan Cioc Oct 2 '12 at 15:33
• @SuzanCioc You could store an array of 2^32 integers on a 64 bits machine though (assuming you have enough RAM). – assylias Oct 2 '12 at 15:42
• @assylias Good point. You can also store a `new int[2^31-1]` in a 64-bit JVM. Its about 8 GB which costs about \$40. – Peter Lawrey Oct 2 '12 at 15:48

BigInteger would only be used if you know it will not be a decimal and there is a possibility of the long data type not being large enough. BigInteger has no cap on its max size (as large as the RAM on the computer can hold).

From here.

It is implemented using an `int[]`:

``````  110       /**
111        * The magnitude of this BigInteger, in <i>big-endian</i> order: the
112        * zeroth element of this array is the most-significant int of the
113        * magnitude.  The magnitude must be "minimal" in that the most-significant
114        * int ({@code mag[0]}) must be non-zero.  This is necessary to
115        * ensure that there is exactly one representation for each BigInteger
116        * value.  Note that this implies that the BigInteger zero has a
117        * zero-length mag array.
118        */
119       final int[] mag;
``````

From the source

From the Wikipedia article Arbitrary-precision arithmetic:

Several modern programming languages have built-in support for bignums, and others have libraries available for arbitrary-precision integer and floating-point math. Rather than store values as a fixed number of binary bits related to the size of the processor register, these implementations typically use variable-length arrays of digits.

The first maximum you would hit is the length of a String which is 231-1 digits. It's much smaller than the maximum of a BigInteger but IMHO it loses much of its value if it can't be printed.

• In full fairness, you'd just need more logic to print it. – Marko Topolnik Oct 2 '12 at 17:51
• If its ok to use multiple Strings you could use multiple BigIntegers as well. ;) – Peter Lawrey Oct 2 '12 at 18:02
• True, but that would cause much more complications in your code than just the print routine. – Marko Topolnik Oct 2 '12 at 18:09