Non-stationary heat problem for hemispherical spaces with hemispherical cavity (Q2768809)

Using the integral transforms the authors construct a bounded in the domain \(D=\{(t,r,\phi,\mu): t\in(0,\infty)\), \(r\in(R_0,\infty)\), \(\phi\in[0,2\pi)\), \(\mu\in[0,1]\); \(\mu=\cos\theta\}\) explicit analytical solution of the heat equation \(\partial T/\partial t+\gamma^2T-a^2\Delta_3[T]=f(t,r,\phi,\mu)\) with the initial condition \(T(t,r,\phi,\mu)|_{t=0}=g(r,\phi,\mu)\), the boundary conditions NEWLINE\[NEWLINE\left.\left(-h_1{\partial\over\partial r}+h_2\right)T\right|_{r=R_0}=\omega_0(t,\phi,\mu),\qquad \left.{\partial T\over\partial r}\right|_{r=\infty}=0,NEWLINE\]NEWLINE NEWLINE\[NEWLINET(t,r,\phi,\mu)|_{\mu=0}=\omega_1(t,r,\phi),\qquad T(t,r,\phi+2\pi,\mu)|_{\mu=0}=T(t,r,\phi,\mu).NEWLINE\]NEWLINE Here \(h_{j}\geq 0\), \(h_1+h_2\neq 0\), \(a>0\), \(\gamma^2\geq 0\), \(R_0>0\), \(\Delta_3={\partial^2\over\partial r^2}+{2\over r}{\partial\over\partial r^2}+{1\over r^2}{1\over 1-\mu^2}{\partial^2\over\partial \phi^2}+{1\over r^2}{\partial\over\partial \mu} [(1-\mu^2){\partial\over\partial \mu}]\).