As mentioned in this question:

Classifying and Formally Verifying Integer Constant Folding

The **Java language specification defines exactly how integer numbers are represented and how integer arithmetic expressions are to be evaluated**. This is an important property of Java as this programming language has been designed to be used in distributed applications on the Internet. **A Java program is required to produce the same result independently of the target machine executing it**.

In contrast, C (and the majority of widely-used imperative and
object-oriented programming languages) is more sloppy and leaves many important characteristics open. The intention behind this inaccurate language
specification is clear. The same C programs are supposed to run on a 16-bit,
32-bit, or even 64-bit architecture by instantiating the integer arithmetics of
the source programs with the arithmetic operations built-in in the target processor. This leads to much more eﬃcient code because it can use the available
machine operations directly. As long as the integer computations deal only
with numbers being “sufficiently small”, no inconsistencies will arise.

In this sense, the C integer arithmetic is a placeholder which is not defined exactly
by the programming language specification but is only completely instantiated by determining the target machine.

Java precisely defines how integers are represented and how integer arithmetic is to be computed.

```
Java Integers
--------------------------
Signed | Unsigned
--------------------------
long (64-bit) |
int (32-bit) |
short (16-bit) | char (16-bit)
byte (8-bit) |
```

Char is the only unsigned integer type. Its values represent Unicode characters, from `\u0000`

to `\uffff`

, i.e. from 0 to 2^{16}−1.

**If an integer operator has an operand of type long, then the other operand is also converted to type long. Otherwise the operation is performed on operands of type int, if necessary shorter operands are converted into int**. The conversion rules are exactly specified.

[From Electronic Notes in Theoretical Computer Science 82 No. 2 (2003)

Blesner-Blech-COCV 2003: Sabine GLESNER, Jan Olaf BLECH,

Fakultät für Informatik,

Universität Karlsruhe

Karlsruhe, Germany]