Originally posted by Canute
Exactly. So the idea that Achilles is ever at precisely the half way point in some particular instant is incoherent.
I think Zeno's paradox is more involved with motion than location. It's not so much the idea that Zeno is located at a particular point that is singled out in Zeno's paradox-- it's that he must perform an infinity of tasks in order to get anywhere.
Fair enough. If you want to believe that motion is discontinuous and that an object in motion spends most of its time in some never never land between locations then the paradox is solved. I agree that this is the only alternative to believing Zeno, but personally I find it paradoxical and logically inconsistent as well as counterintuitive.
The object does not spend time in never-never land between locations-- it is always located somewhere. There is just a discontinuous transition between locations. And for what it's worth, this is our best working theory for how subatomic particles behave.
But believing in quantized space is not the only way to alleviate Zeno's paradox. The problem in the paradox centers on the infinite number of tasks Achilles must perform in order to travel from one point to another. There are two direct objections here: either Zeno has to travel an infinite distance, or he has to take an infinite amount of time to perform his infinite amount of tasks.
We can rule out the former objection, since the limit of the summation of all his infinite steps approaches a whole number, not infinity. For instance, if Achilles has to travel 1 unit of space to reach the goal, then he needs to first cross 1/2 unit of space in the first step, then 1/4 in second step, then 1/8 in the third, and 1/2
i units in general in the
ith step. But the sum \sum_{i=1} 1/2^i approaches 1 as i approaches infinity, so Zeno has to cross a finite distance in spite of his infinite amount of tasks.
Similarly, Zeno only needs a finite amount of time to do his infinite number of tasks. Assume as before that Zeno needs to travel over 1 unit of space to reach the goal, and furthermore assume that Zeno travels at a constant velocity of 1 unit of space per 1 unit of time. Then he needs 1/2 unit of time to reach the halfway point, 1/4 unit of time to reach the 1/4 point, and so on. As before, in the limit as the number of tasks approaches infinity, Zeno only needs 1 unit of time to do his infinite number of tasks.
There is also the approach of trying to derive a logical contradiction from Zeno's paradox. Rather than go into this myself, I refer again to what is an excellent resource on the paradox:
http://faculty.washington.edu/smcohen/320/zeno3.htm
So we can assume space is an infinitely divisble continuum and still survive Zeno's paradox.
In your explanation how do you explain where the object is between 'instants', and how does it cross the gaps in no time at all?
It isn't somewhere between instants. It is always located at one location or another. When it moves, there is a discontinuous jump (quantum leap) from one location to another. To assume it is located somewhere inbetween in the meantime is to basically continue assuming continuous motion in continuous space.
As for how this all refers back to the initial question about instants, we can safely say that Zeno's paradox does not rule out the notion of instantaneous points in time. Further investigations in physics may rule out the notion of truly durationless points in time, but I don't think these can be ruled out purely on a logical basis.
Using calculus, we see that Zeno can cross a finite distance in a finite time, even if it can be theoretically broken down into infinitely many subdivisions. Specifically, we can show that in the limit as the number of steps approaches infinity, the size of the steps trails off quickly enough that their sum approaches a finite number rather than infinity (likewise for the time needed to complete the tasks). 
