I come across a problem like

$\max {\frac{1+v}{1-u}}$

$s.t.~$ $ux^2+vy^2-xy\ge0$ $\forall x,y\in\mathbb{R}$

I do not know much of optimization. What I have done is that $ux^2+vy^2\ge 2\sqrt{uv}xy\ge xy$, so I let $uv=\frac{1}{4}$ and get the seemingly correct answer.

My question is that What kind of opt problem is it? Where can I get some resources to quickly learning to solving this kind of problem?

I come across an optimization problem of the following form.

$$\max {\frac{1+v}{1-u}} \qquad \text{s.t.} \qquad ux^2+vy^2-xy \ge 0, \quad \forall x,y\in\mathbb{R}$$

I do not know much of optimization. What I have done is that $ux^2+vy^2\ge 2\sqrt{uv}xy\ge xy$, so I let $uv=\frac{1}{4}$ and get the seemingly correct answer.

What kind of opt problem is it? Where can I get some resources to quickly learning to solving this kind of problem?