ProductsAbaqus/Standard The basic solution variable (used as the degree of freedom at the nodes of the mesh) is the “normalized concentration” (often referred to as the “activity” of the diffusing material), , where c is the mass concentration of the diffusing material and s is its solubility in the base material. This means that when the mesh includes dissimilar materials that share nodes, the normalized concentration is continuous across the interface between the different materials. Since is the square root of the partial pressure of the diffusing phase, the partial pressure is the same on both sides of the interface; Sievert's law is assumed to hold at the interface. Governing equationsThe diffusion problem is defined from the requirement of mass conservation for the diffusing phase: where V is any volume whose surface is S, is the outward normal to S, is the flux of concentration of the diffusing phase, and is the flux of concentration leaving S. Using the divergence theorem, Because the volume is arbitrary, this provides the pointwise equation The equivalent weak form is where is an arbitrary, suitably continuous, scalar field. This statement can be rewritten as Using the divergence theorem again yields Constitutive behaviorThe diffusion is assumed to be driven by the gradient of a chemical potential, which gives the general behavior where is the diffusivity; is the solubility; is the “Soret effect” factor, providing diffusion because of the temperature gradient; is the temperature; is the absolute zero on the temperature scale used; is the pressure stress factor, providing diffusion driven by the gradient of the equivalent pressure stress, ; and are any predefined field variables. An example of a particular form of this constitutive model is the assumption made for hydrogen diffusion in a metal: with the chemical potential, , defined as where is a fixed datum, R is the universal gas constant, and is the partial molar volume of hydrogen in the solid solution. This form is similar to that used by Sofronis and McMeeking (1989) and results in a constitutive expression of the form To implement this particular form, data for and must be calculated from the equations Changing variables () and introducing the constitutive assumption of Equation 3 into Equation 2 yields where is the concentration flux entering the body across S. Discretization and time integrationEquilibrium in a finite element model is approximated by a finite set of equations through the introduction of appropriate interpolation functions. Discretized quantities are indicated by uppercase superscripts (for example, ). The summation convention is adopted for the superscripts. These represent nodal variables, with nodes shared between adjacent elements and appropriate interpolation chosen to provide adequate continuity of the assumed variation. The interpolation is based on material coordinates , , 2, 3. The virtual normalized concentration field is interpolated by where are interpolation functions. Then, the discretized equations are written as Time integration in transient problems utilizes the backward Euler method (the modified Crank-Nicholson operator). Adopting the convention that any quantity not explicitly associated with a point in time is taken at , we can drop the subscript and write the integrated equations as Jacobian contributionThe Jacobian contribution from the conservation equation is obtained from the variation of Equation 6 with respect to at time . This yields Rearranging and using the interpolation , we obtain Inspecting the above equation, we observe that the Jacobian becomes unsymmetric whenever the diffusivity, ; the temperature-driven diffusion coefficient, ; or the pressure-driven diffusion coefficient, , is defined as a function of concentration. |