The regularisation length (\ell) controls the width of the diffusive crack zone ((\approx 3\ell)). When (\ell\to0), (\Pi) (\Gamma)-converges to the classical Griffith functional. Stationarity of (\Pi) with respect to admissible variations (\delta\mathbfu) and (\delta\phi) yields the coupled Euler‑Lagrange equations :
Figure 1 : Load‑displacement response (phase‑field vs. LEFM). Figure 2 : Phase‑field contour at (F = 0.9F_c) (crack tip radius ≈ 3(\ell)). A DCB specimen (length 0.2 m, thickness 0.01 m) is subjected to a symmetric opening displacement. The energy release rate calculated from the phase‑field solution
[ \psi^+(\boldsymbol\varepsilon) ;\rightarrow; H(\mathbfx) . \tag4 ] 3.1. Finite‑Element Discretisation Both fields are approximated using quadratic Lagrange shape functions on an unstructured triangular mesh: Working Model 2d Crack-
Given uⁿ, φⁿ: 1. Update history field Hⁿ⁺¹ ← max(Hⁿ, ψ⁺(ε(uⁿ))) 2. Solve displacement problem → uⁿ⁺¹ (with φⁿ fixed) 3. Solve phase‑field problem → φⁿ⁺¹ (with uⁿ⁺¹ fixed) 4. Check convergence: ‖uⁿ⁺¹‑uⁿ‖ + ‖φⁿ⁺¹‑φⁿ‖ < ε_tol 5. If not converged → repeat steps 2‑4 The linearised systems are assembled using (e.g., via the Sacado package) to obtain consistent tangent operators. 3.4. Load Control & Arc‑Length For softening problems, displacement control can cause snap‑back. We implement an arc‑length (Riks) method that controls the total work increment:
[ G = \frac{P^2
The first equation is the for a degraded material. The second is a reaction‑diffusion equation governing the evolution of the crack field. Irreversibility is enforced by a history field (H(\mathbfx) = \max_t\le t\psi^+(\boldsymbol\varepsilon(\mathbfx,t))) so that the tensile energy term never decreases:
The manuscript follows the conventional structure (Title, Abstract, Keywords, etc.) and includes all the essential elements (governing equations, numerical algorithm, validation, results, discussion, and references). Feel free to copy the LaTeX source into your favourite editor (Overleaf, TeXShop, etc.) and adapt the figures, tables, or code snippets to your own data. Authors : First Author ¹, Second Author ², Third Author ³ ¹ Department of Mechanical Engineering, University A, City, Country. ² Institute of Applied Mathematics, University B, City, Country. ³ Materials Science Division, Research Center C, City, Country. The regularisation length (\ell) controls the width of
The phase‑field approach was first introduced by Francfort & Marigo (1998) and later regularised by Bourdin, Francfort & Marigo (2000). Since then, a plethora of works (Miehe et al., 2010; Borden et al., 2012; Wu, 2018) have demonstrated its versatility for quasi‑static, dynamic, and fatigue fracture. However, practical adoption still requires a that guides the user from model formulation to implementation, parameter calibration, and verification.