A DEM-based framework to optimize the gradation of concrete aggregate using fractal approach

IF 2.8 3区 工程技术 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Gang Ma, Fan Wang
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Abstract

Several gradations of concrete with fractal dimension D = 2.0–2.9 (i.e., 2.0, 2.2, 2.4 2.6, 2.7, 2.8, 2.9) were designed based on particle size-mass distribution fractal model. The random polyhedral aggregate model was generated and then imported particle flow code, the discrete element method (DEM), to establish a multi-phase model considering mortar, aggregate, and interfacial transition zone (ITZ). On this basis, the relationship between fractal dimension D and macro-mechanical properties and microstructure of concrete was discussed, and the grading evaluation index was proposed based on fractal dimension D. The results show that the number of large-size aggregates decreases with increase in the fractal dimension, the compressive strength of concrete increases and reaches the maximum when the fractal dimension D = 2.7. Meanwhile, the fractal dimension affects the failure mode, as fractal dimension D increases, the total microcracks gradually increase, among which the ITZ microcracks increase mainly. Compared with the uncertainty of the non-uniformity coefficient and curvature coefficient, the fractal dimension can more accurately describe the aggregate grading characteristics. In addition, appropriate adjustments should be made to determine the range of fractal dimensions considering the differences between the aggregate filling.

Abstract Image

利用分形方法优化混凝土骨料级配的基于 DEM 的框架
根据粒径-质量分布分形模型,设计了几种分形维数 D = 2.0-2.9 的混凝土级配(即 2.0、2.2、2.4 2.6、2.7、2.8、2.9)。生成随机多面体集料模型后,导入颗粒流代码--离散元法(DEM),建立考虑砂浆、集料和界面过渡区(ITZ)的多相模型。在此基础上,讨论了分形维数 D 与混凝土宏观力学性能和微观结构的关系,并提出了基于分形维数 D 的级配评价指标。结果表明,随着分形维数的增加,大粒径集料数量减少,混凝土抗压强度增加,当分形维数 D = 2.7 时,混凝土抗压强度达到最大值。同时,分形维数对破坏模式也有影响,随着分形维数 D 的增大,总的微裂缝逐渐增多,其中主要是 ITZ 微裂缝增多。与不均匀系数和曲率系数的不确定性相比,分形维数能更准确地描述集料级配特征。此外,考虑到骨料充填物之间的差异,在确定分形尺寸范围时应进行适当调整。
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来源期刊
Computational Particle Mechanics
Computational Particle Mechanics Mathematics-Computational Mathematics
CiteScore
5.70
自引率
9.10%
发文量
75
期刊介绍: GENERAL OBJECTIVES: Computational Particle Mechanics (CPM) is a quarterly journal with the goal of publishing full-length original articles addressing the modeling and simulation of systems involving particles and particle methods. The goal is to enhance communication among researchers in the applied sciences who use "particles'''' in one form or another in their research. SPECIFIC OBJECTIVES: Particle-based materials and numerical methods have become wide-spread in the natural and applied sciences, engineering, biology. The term "particle methods/mechanics'''' has now come to imply several different things to researchers in the 21st century, including: (a) Particles as a physical unit in granular media, particulate flows, plasmas, swarms, etc., (b) Particles representing material phases in continua at the meso-, micro-and nano-scale and (c) Particles as a discretization unit in continua and discontinua in numerical methods such as Discrete Element Methods (DEM), Particle Finite Element Methods (PFEM), Molecular Dynamics (MD), and Smoothed Particle Hydrodynamics (SPH), to name a few.
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