Sensitivity analysis of a phase field model for static recrystallization of deformed microstructures

Gentry, Susan P.; Thornton, Katsuyo

doi:10.1088/1361-651x/ab9751

Cited by 9 publications

(6 citation statements)

References 43 publications

(92 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Based on Hillert predictions in a 3D model [43], in this system, α = 1, ρ = 9/8. It is revealed by equation (21), that small grains are expected to shrink at a higher rate. Nevertheless, with increasing grain size, the grain growth rate increases as the grain size exceeds the critical size.…”

Section: Grain Growth Kineticsmentioning

confidence: 99%

“…The successful application of phase field models in simulating microstructure evolution has been thoroughly demonstrated [20][21][22][23]. Ideal grain growth can be captured by phase field models [24][25][26], also some computational studies on the effect of an external load on grain growth and texture evolution have been conducted [14,27].…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Microstructure evolution in 439 stainless steels under tensile: phase field simulation and experiment

Liu,

Wang,

Liu

et al. 2024

Modelling Simul. Mater. Sci. Eng.

View full text Add to dashboard Cite

A combination of phase-field simulations and experimental validation is utilized to examine the effect of annealing tension on the microstructure evolution of 439 ferrite stainless steel (FSS). The study reveals the competing mechanisms of texture under tensile stress. Furthermore, a phase field model that incorporates anisotropic grain boundary (GB) energy and elastic energy is established. The microstructure of 439 FSS is created using a 3D reconstruction strategy based on the 2D EBSD characterization proposed in this work. Elastic constants are calibrated using actual alloy data and determined through molecular dynamics simulations. Finally, simulations of the grain coarsening process in 439 FSS are successfully achieved, considering both tensile stress and anisotropic GB energy effects. The results reveal that the presence of low-angle grain boundaries (LAGBs) deviates from Hillert model predictions in terms of grain size distribution and slows down the average grain size evolution over time. A significant deviation in the grain size distribution, compared to Hillert predictions, is observed in the textured system under tensile stress. The results of growth kinetics indicate that tensile stress promotes grain growth more than GB energy anisotropy retards microstructure evolution. Both experiment and simulation results consistently demonstrate that grains with <111>//ND orientation experience a better growth proficiency compared to grains of other orientations under tensile stress. This investigation offers fresh insights into managing the ferritic microstructure of FSS to enhance its formability capabilities.

show abstract

Section: Grain Growth Kineticsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Microstructure evolution in 439 stainless steels under tensile: phase field simulation and experiment

Liu,

Wang,

Liu

et al. 2024

Modelling Simul. Mater. Sci. Eng.

View full text Add to dashboard Cite

show abstract

“…This formula is identical to those used in [16,25,37,46], except that in these previous works, ρ i was a constant associated with the i th grain, and therefore these models could not treat intra-granular inhomogeneity nor a decay in the dislocation density as the grain boundaries migrate.…”

Section: Individual Dislocation Density Fieldmentioning

confidence: 99%

“…To work in concert with the experimental characterization tools to provide an in-depth understanding of how the combined effects of grain boundary energy and the stored energy impact the microstructure evolution within a sample undergoing CHT, a computational model that considers both driving forces is necessary. Phase-field (PF) models are commonly utilized to simulate microstructure evolution [18][19][20], such as solidification [21][22][23][24], recrystallization [25,26], and chemical reaction [27][28][29]. In a PF model, the thermodynamics for the material system being modeled is incorporated into the free energy functional that is used to compute the driving force for evolution, and the microstructure is described by field variables (often referred to as order parameters) that can be conserved or non-conserved over the domain.…”

Section: Introductionmentioning

confidence: 99%

“…A few PF models have been developed to study the influence of anisotropy in grain boundary energy [33], anisotropy in grain boundary mobility [34,35], and second-phase particles [36] on the dynamics of AGG. Higgins et al presented a PF model [16] that extended recrystallization models developed by Moelans et al [37] and Gentry and Thornton [25] to account for the contribution of stored energy as the driving force for grain boundary migration. Their simulations showed that the additional driving force allows for the grains with a low dislocation density to consume the grains with a high dislocation density.…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Phase-field modeling of stored-energy-driven grain growth with intra-granular variation in dislocation density

Huang,

Mensah,

Chlupsa

et al. 2024

Modelling Simul. Mater. Sci. Eng.

Self Cite

View full text Add to dashboard Cite

We present a phase-field model to simulate the microstructure evolution occurring in polycrystalline materials with a variation in the intra-granular dislocation density. The model accounts for two mechanisms that lead to the grain boundary migration: the driving force due to capillarity and that due to the stored energy arising from a spatially varying dislocation density. In addition to the order parameters that distinguish regions occupied by different grains, we introduce dislocation density fields that describe spatial variation of the dislocation density. We assume that the dislocation density decays as a function of the distance the grain boundary has migrated. To demonstrate and parameterize the model, we simulate microstructure evolution in two dimensions, for which the initial microstructure is based on real-time experimental data. Additionally, we applied the model to study the effect of a cyclic heat treatment on the microstructure evolution. Specifically, we simulated stored-energy-driven grain growth during three thermal cycles, as well as grain growth without stored energy that serves as a baseline for comparison. We showed that the microstructure evolution proceeded much faster when the stored energy was considered. A non-self-similar evolution was observed in this case, while a nearly self-similar evolution was found when the microstructure evolution is driven solely by capillarity. These results suggest a possible mechanism for the initiation of abnormal grain growth during cyclic heat treatment. Finally, we demonstrate an integrated experimental-computational workflow that utilizes the experimental measurements to inform the phase-field model and its parameterization, which provides a foundation for the development of future simulation tools capable of quantitative prediction of microstructure evolution during non-isothermal heat treatment.

show abstract

An Integrated Computational and Experimental Study of Static Recrystallization in the Mg–Zn–Ca Alloy System

Berman,

Montiel,

Pilipchuk

et al. 2024

The Minerals, Metals &Amp; Materials Series

View full text Add to dashboard Cite

Sensitivity analysis of a phase field model for static recrystallization of deformed microstructures

Cited by 9 publications

References 43 publications

Microstructure evolution in 439 stainless steels under tensile: phase field simulation and experiment

Microstructure evolution in 439 stainless steels under tensile: phase field simulation and experiment

Phase-field modeling of stored-energy-driven grain growth with intra-granular variation in dislocation density

An Integrated Computational and Experimental Study of Static Recrystallization in the Mg–Zn–Ca Alloy System

Contact Info

Product

Resources

About