I have derived two equations of the following type
$\dfrac{\delta A}{\delta x}=a\dfrac{\delta B}{\delta t}-b\dfrac{\delta^3 B}{\delta x^2 \delta t}$
and
$\dfrac{\delta B}{\delta x}=\int _0^l e^{-\lambda|x-x'|}\dfrac{\delta A(x')}{\delta t} dx'$
Where A and B are functions of 'x' and 't'. x and x' are any point between 0 and $l$. a, b and $\lambda$ are constants.
Is it possible to get a partial differential equation on B alone from these equations