I have seen it stated that you need 5 points to define an ellipse, and that an ellipse can be drawn through 5 points as long as any $3$ points aren't on the same line. How can an ellipse be drawn through these $5$ points: or am I missing some other condition on when ellipses can be formed from a set of points $(1,1),(1,-1),(-1,1),(-1,1),(0,1/2)$?
If you have 5 points, no three collinear, then there is a unique conic section that goes through them. That includes ellipses, but also opens up the possibilities of parabolas and hyperbolas.
Only hyperbolas can cover a non-convex set of 5 points like yours. In your particular case, assuming the points are exactly where it looks like they are, that hyperbola is given by $$ 4y^2-3 x^2=1 $$