To answer your specific question:

I came accross them looking for a value that would be greater than
every other float or failing that all except the greatest. Does either
meet that criteria?

Yes, `Float.POSITIVE_INFINITY`

is, by its definition, the only `Float`

that is greater than `Float.MAX_VALUE`

. It is, however, something of a special case in terms of how it interacts with mathematical operations.

From the javadoc:

public static final float POSITIVE_INFINITY :

A constant holding the positive infinity of type float. It is equal to
the value returned by Float.intBitsToFloat(0x7f800000).

public static final float MAX_VALUE :

A constant holding the largest positive finite value of type float,
(2-2-23)·2127. It is equal to the hexadecimal floating-point literal
0x1.fffffeP+127f and also equal to Float.intBitsToFloat(0x7f7fffff).

So, as you can see, according to the very literal definition is that `POSITIVE_INFINITY`

is greater than `MAX_VALUE`

by one bit.

In terms of their utility, `POSITIVE_INFINITY`

provides a value that you can use to recognize otherwise problematic mathematical expressions. The one used in the JDK source is `1.0f / 0.0f`

. The result of this expression is `POSITIVE_INFINITY`

, indicating that you have exceeded the upper bound of reasonable mathematics, never to return. Given the two constants `POSITIVE_INFINITY`

and `NEGATIVE_INFINITY`

, you can check to see if a general expression has left the bounds of the useful Floats and whether it was the positive or negative door.

`MAX_VALUE`

, on the other hand, represents the maximum value on which you can still apply normal mathematical operations. For example, `MAX_VALUE - 1.0f`

is a (very slightly) smaller number than `MAX_VALUE`

. `POSITIVE_INFINITY - 1.0f`

, however, is still `POSITIVE_INFINITY`

.