Let $u(s,t,x)$ solve the equation $$ i \partial_s u +\partial^2_t u - \partial^2_x u =0$$ on the set $[0,1]^3$ and suppose that $u(0,t,x)=0$ on $[0,1]^2$ and that $$ u(s,0,x)=\partial_t u(s,0,x)=0$$ for all $x,s \in [0,1]$
My question is whether it follows that the function $u$ must also vanish in the typical domain of dependence $$\{(s,t,x)| s \in (0,1)\quad t \in (0,\frac{1}{2}) \quad x \in (t,1-t) \} $$
My intuition tells me that since the principal symbol is hyperbolic, this property must hold but I’m not sure and since I could not prove it.
