Suppose we have a function $\rho(x,t)$ defined over $[-1,1]\times[0,1]$.
Define the integral
$
f_T(x)=\int_{[0,1]} \int_{[-1,1]} (\rho(.,t)*K_{T-t})(x) dxdt
$
for $x\in R$ and $T>1$, where $*$ is the convolution, and $K_a$ is the Gaussian kernel with variance $a$.

The question is given $f_T$ for some $T>1$, can we determine $\rho$ uniquely
(noting that $\rho$ has a bounded support)?

$f_T$ has the following intuitive meaning:
Suppose we have an ideal metal rod of infinite length .
$\rho(x,t)$ is the rate of heat flow into $x$ at time $T$.
So $f_T$ is the temperature at time $t$.