If you're talking about formal regular expressions (i.e. regular expressions that describe regular languages), then here's a procedure to convert a regular expression into one that accepts prefixes.

Any regular expression has a DFA; here's the DFA for `/apple/`

(with transitions to failure states left out):

To produce a DFA that matches prefixes of strings accepted by this DFA, convert states to accepting states if they lie along paths that lead to accepting states in the original DFA:

There are several methods for reading a regular expression from a DFA. If we use the state removal technique, we arrive at the following DFA:

This corresponds to the regular expression `/a|ap|app|appl|apple|/`

, plus the empty string (since the empty string is a prefix of any regular expression).

The `apple`

example is trivial, but this same technique can be used for more complicated regular expressions. For example, consider `/(00)*1(00|1)*/`

:

This DFA accepts the string `00100`

but doesn't accept `0010101`

. After converting the appropriate states to final states and combining two identical states, we have

This is equivalent to

from which we can read the regular expression `/(00)*(0?|1(1|00)*0?)/`

, which includes the empty string.

This regular expression rejects `00101`

because it causes the original DFA to transition into a failing state, but accepts '0' and '00', because those strings do not cause the original DFA to enter a failure state.