한국분말재료학회지 (Journal of Powder Materials)

  • 제30권1호
  • /
  • Pages.29-34
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  • 2023
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  • 2799-8525(pISSN)
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  • 2799-8681(eISSN)
한국분말재료학회 (*구 분말야금학회) (The Korean Powder Metallurgy & Materials Institute)
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이방성 재료의 소성변형 해석을 위한 고정점 축차

Fixed-point Iteration for the Plastic Deformation Analysis of Anisotropic Materials

  • 양승용 (한국기술교육대학교 기계공학부) ;
  • 김정한 (한밭대학교 신소재공학과)
  • 투고 : 2023.01.09
  • 심사 : 2023.02.14
  • 발행 : 2023.02.28
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초록

A fixed-point iteration is proposed to integrate the stress and state variables in the incremental analysis of plastic deformation. The Conventional Newton-Raphson method requires a second-order derivative of the yield function to generate a complicated code, and the convergence cannot be guaranteed beforehand. The proposed fixed-point iteration does not require a second-order derivative of the yield function, and convergence is ensured for a given strain increment. The fixed-point iteration is easier to implement, and the computational time is shortened compared with the Newton-Raphson method. The plane-stress condition is considered for the biaxial loading conditions to confirm the convergence of the fixed-point iteration. 3-dimensional tensile specimen is considered to compare the computational times in the ABAQUS/explicit finite element analysis.

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과제정보

이 논문은 한국기술교육대학교 교수 교육연구진흥과제 지원에 의하여 연구되었음.

참고문헌

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