2012
DOI: 10.1007/s10704-012-9680-8
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Effect of non-singular stress on the brittle fracture of V-notched structure

Abstract: The traditional brittle fracture criteria for V-notched structures are established on the base of the singular stress field at a V-notch tip where only two singular stress terms are adopted. The non-singular stress terms also play a significant role in determining the stress and strain fields around a V-notch tip, which in turn could affect the fracture character of V-notched structures predicted by the fracture mechanics criteria. In this paper, the effect of the non-singular stress on the brittle fracture pr… Show more

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Cited by 33 publications
(18 citation statements)
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“…(x, y, z) = Cartesian coordinate system (ρ, θ, z) = cylindrical coordinate system (1, 2, 3) = principal axis of the orthotropic material E 1 , E 2 , E 3 = elastic modulus μ 12 , μ 13 , μ 21 , μ 23 , μ 31 , μ 32 = Poisson ratios G 12 , G 23 , G 13 = shear modulus σ 1 , σ 2 , σ 3 , τ 12 , τ 23 , τ 13 = stress components in Cartesian coordinate system ε 1 , ε 2 , ε 3 , γ 12 , γ 23 , γ 13 = strain components in Cartesian coordinate system S = compliance matrix e T = transformation matrix for strain components between (ρ, θ, z) and (x, y, z) T = transformation matrix for strain components between (1,2,3) and (x, y, z) D = stiffness matrix D ij (i, j = 1, …, 6) = elements of the stiffness matrix σ ρ , σ θ , σ z , τ ρθ , τ θz , τ ρz = stress components in cylindrical coordinate system ε ρ , ε θ , ε z , γ ρθ , γ θz , γ ρz = strain components in cylindrical coordinate system (l k , m k , n k ) = direction cosines between the kth principle axis and (x, y, z) u ρ , u θ , u z = displacement components in cylindrical coordinate system A k = amplitude coefficient in asymptotic expansions λ k = stress singularity order λ = abbreviation of λ k N = number of characteristic values truncated Correspondence: C. Z. Cheng.…”
Section: N O M E N C L a T U R Ementioning
confidence: 99%
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“…(x, y, z) = Cartesian coordinate system (ρ, θ, z) = cylindrical coordinate system (1, 2, 3) = principal axis of the orthotropic material E 1 , E 2 , E 3 = elastic modulus μ 12 , μ 13 , μ 21 , μ 23 , μ 31 , μ 32 = Poisson ratios G 12 , G 23 , G 13 = shear modulus σ 1 , σ 2 , σ 3 , τ 12 , τ 23 , τ 13 = stress components in Cartesian coordinate system ε 1 , ε 2 , ε 3 , γ 12 , γ 23 , γ 13 = strain components in Cartesian coordinate system S = compliance matrix e T = transformation matrix for strain components between (ρ, θ, z) and (x, y, z) T = transformation matrix for strain components between (1,2,3) and (x, y, z) D = stiffness matrix D ij (i, j = 1, …, 6) = elements of the stiffness matrix σ ρ , σ θ , σ z , τ ρθ , τ θz , τ ρz = stress components in cylindrical coordinate system ε ρ , ε θ , ε z , γ ρθ , γ θz , γ ρz = strain components in cylindrical coordinate system (l k , m k , n k ) = direction cosines between the kth principle axis and (x, y, z) u ρ , u θ , u z = displacement components in cylindrical coordinate system A k = amplitude coefficient in asymptotic expansions λ k = stress singularity order λ = abbreviation of λ k N = number of characteristic values truncated Correspondence: C. Z. Cheng.…”
Section: N O M E N C L a T U R Ementioning
confidence: 99%
“…The severity of the strong stress singularity may cause the crack initiation and propagation at the V‐notch apex, where failures are often started. The analysis of the stress singularity at the vicinity of the V‐notch tip is an important scientific topic …”
Section: Introductionmentioning
confidence: 99%
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“…Crushing refers to the process that a bulk material which is crushed into small pieces or powders by exerting a mechanical external force to overcome intermolecular cohesion forces, and it depends on its mechanical property, including brittleness and strength. [1,2] In some certain fields, they may prefer more obvious crushing effect, while some prefer less. Foundry silica sand particles indicate a tendency to be crushed during the service [3,4].…”
Section: Introductionmentioning
confidence: 99%
“…The closed form solution for the elastic stress fields at the tip of a blunt crack in an isotropic material were derived by Creager and Paris 6 , and later extended to any notch opening angle by Lazzarin and Tovo, 7 for plane loadings, and by Zappalorto et al 8 and Zappalorto and Lazzarin 9 for the mode III problem. [11][12][13] The most recent advances on this topic are related to the study of the effect non-singular terms of the stress field close to a pointed V notch, 14,15 as well as materials with unconventional properties (such as angularly inhomogeneous elastic properties, 16 magneto-electro-elastic 17 and piezoelectric materials 18 ). 10 The problem of sharp and blunt V-shaped notches was also thoroughly investigated over the years by Savruk and co-workers.…”
Section: Introductionmentioning
confidence: 99%