The system \$H(s) = \frac{1}{s^2} \$ is open loop unstable. Take the inverse Laplace transform to find the impulse response
$$h(t) = \mathscr{L}^{-1} \bigg\{ \frac{1}{s^2} \bigg\} =t$$
and it shows that \$h(t) \to \infty \ \text{for} \ t\to \infty\$. Hence, the system is unbounded for any input.
If only one pole is at the origin, \$H(s) = \frac{1}{s}\$, the system is open loop stable for an impulse-input, but unstable for a step input.
$$h(t) = \mathscr{L}^{-1} \bigg\{ \frac{1}{s} \bigg\} =1$$
$$s(t) = \mathscr{L}^{-1} \bigg\{ \underbrace{\frac{1}{s}}_{\text{system}} \cdot \underbrace{\frac{1}{s}}_{\text{step}} \bigg\} =t \ \ \ \text{(step response)}$$
However, a system with multiple poles in the origin is not necessarily closed loop unstable. In the case with two poles in the origin we have
$$H_\text{cl} (s) = \frac{1}{1+H(s)} = \frac{1}{1+\frac{1}{s^2}} =\frac{s^2}{s^2+1} $$
The step response shows a BIBO-stable system
$$s(t) = \mathscr{L}^{-1} \bigg\{ \frac{s^2}{s^2+1} \cdot \frac{1}{s} \bigg\} = \cos(t).$$
So even one pole in the origin makes the system open loop unstable. But one or two poles in the origin doesn't make the system closed loop unstable. In the case of three poles in the origin, however, the system is both open and closed loop unstable:
$$G_\text{cl}(s) = \frac{1}{1+\frac{1}{s^3}} = \frac{s^3}{s^3+1} $$
$$\mathscr{L}^{-1} \bigg\{ \frac{s^3}{s^3+1} \cdot \frac{1}{s} \bigg\} =\frac{1}{3}e^{-t} + \frac{2}{3}e^{\frac{1}{2}t}\cos \bigg(\frac{\sqrt{3}t}{2} \bigg) \to \infty \ \text{for} \ t\to \infty. $$
