Geometry of principal stress trajectories for piece‐wise linear yield criteria under axial symmetry

Abstract: Rigid-and elastic-plastic solids obeying quite a general yield criterion represented by linear functions of the principal stresses are considered. A general axisymmetric state of stress satisfying the hypothesis of Haar and von Karman is analyzed in quasi-static flow. The circumferential velocity vanishes. A superimposed restriction on the yield criterion is that the system of stress equations is hyperbolic. The primary objective of this study is to select optimal coordinates and unknowns for deriving the inte… Show more

“…This relation was derived in [23]. It has been shown in this work that (34) reduces to ( 18), (25), or (30) if the function f in (31) is chosen accordingly.…”

“…Therefore, it is assumed that τ < 0 in the reminder of the present paper. Note that this inequality is automatically satisfied in the case of Equations ( 18) and (25). In the case of Equation (30), the inequality τ < 0 is equivalent to t > 0.…”

“…The definition of m is provided after Equation (25). Employing (12) 2 instead of (12) 1 and using the line of reasoning above, one gets…”

Principal Stress Trajectories in Plasticity under Plane Strain and Axial Symmetry

“…This relation was derived in [23]. It has been shown in this work that (34) reduces to ( 18), (25), or (30) if the function f in (31) is chosen accordingly.…”

“…Therefore, it is assumed that τ < 0 in the reminder of the present paper. Note that this inequality is automatically satisfied in the case of Equations ( 18) and (25). In the case of Equation (30), the inequality τ < 0 is equivalent to t > 0.…”

“…The definition of m is provided after Equation (25). Employing (12) 2 instead of (12) 1 and using the line of reasoning above, one gets…”

Principal Stress Trajectories in Plasticity under Plane Strain and Axial Symmetry

Eshelby’s circular cylindrical inclusion with polynomial eigenstrains in transverse direction by residue theorem