where u is the tangential Darcy’s velocity (SI unit: m/s), κ is the fracture permeability (SI unit: m2), μ the fluid’s dynamic viscosity (SI unit: Pa⋅s), and ∇tp the tangential gradient of the fluid’s pressure.

The equation to solve for computing heat transfer in fractures is derived from Equation 4-62 to Equation 4-64 and using the procedure detailed in Theory for Heat Transfer in Porous Media to apply the mixture rule on solid and fluid internal energies. The resulting equations are:

Here (ρCp)eff is the effective heat capacity at constant pressure of the fracture-fluid volume, ρ is the fluid’s density, Cp is the fluid’s heat capacity at constant pressure, qfr is the conductive heat flux in the fracture-fluid volume, keff is the effective thermal conductivity of the fluid-fracture mixture, and Q is a possible heat source.

From the point of view of the domain, the following heat source, derived from Equation 4-64, is received from the fracture: