if (RectA.X1 < RectB.X2 && RectA.X2 > RectB.X1 &&
        RectA.Y1 < RectB.Y2 && RectA.Y2 > RectB.Y1) 
        

say you have Rect A, and Rect B. 
Proof is by contradiction. Any one of four conditions guarantees that NO OVERLAP CAN EXIST.

<pre>Cond1.  If A's left edge is to the right of the B's right edge. A is Totally to right Of B
Cond2.  If A's right edge is to the left of the B's left edge. A is Totally to left Of B
Cond3.  If A's top edge is below B's bottom  edge. A is Totally below B
Cond4.  If A's bottom edge is above B's top edge. A is Totally above B</pre>

So condition for Non-Overlap is 

<pre>Cond1 Or Cond2 Or Cond3 Or Cond4</pre>

Therefore, a sufficient condition for Overlap is the opposite (De Morgan)
 
<pre>Not Cond1 AND Not Cond2 And Not Cond3 And Not Cond4</pre>

this is equivilent to 

<pre>A's Left Edge to left of B's right edge  And
A's right edge to right of B's left edge And
A's top above B's bottom And
A's bottom below B's Top</pre>