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Advanced Functional Materials, EarlyView.This study examines how pore shape and manufacturing‐induced deviations affect the mechanical properties of 3D‐printed lattice materials with constant porosity. Combining µ‐CT analysis, FEM, and compression testing, the authors show that structural imperfections reduce stiffness and strength, while bulk material inhomogeneities probably enhance ...
Oliver Walker +5 more
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Edgewise Compressive Properties of Ecological Sandwich Panels with Engineered Bamboo Face Sheets and Bamboo Culm Core. [PDF]
Materials (Basel)Liu X, Deng J, Wang M, Meng X, Xu L.
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Flexural Behavior of Orthotropic Steel-LUHPC Composite Bridge Decks: Experimental and Numerical Study. [PDF]
Materials (Basel)Worku Z, Liu M, Wang X, Sheng G.
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Adoption of hooped-battens in cold-formed steel built-up columns for superior axial performance. [PDF]
Sci RepSadid AJ, Dar MA, Ghowsi AF, Aydın AC.
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Differential response pathways of <i>Picea asperata</i> seedlings from different provenances to altitudinal transfer. [PDF]
Front Plant SciXie J +5 more
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A 15-year-old teenager with refractory intracranial hypertension due to scalp arteriovenous fistula: case report. [PDF]
BMC NeurolZhang Q +7 more
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Tensile experimental data from monotonic loading on connections to concrete filled steel tubes using Extended Hollo-bolt blind bolts. [PDF]
Data BriefCabrera M, Tizani W, Ninic J.
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Israel Journal of Mathematics, 2017
A subgroup \(M\) of \(\mathbb{Z}^{\omega }\) is \textit{monotone} if whenever \( x,y\in \mathbb{Z}^{\omega}\), \(x\preceq y\) and \(y\in M\), then \(x\in M\).
Kolman, Oren, Wald, Burkhard
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A subgroup \(M\) of \(\mathbb{Z}^{\omega }\) is \textit{monotone} if whenever \( x,y\in \mathbb{Z}^{\omega}\), \(x\preceq y\) and \(y\in M\), then \(x\in M\).
Kolman, Oren, Wald, Burkhard
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Journal of Fluid Mechanics, 1979
Flows of incompressible inviscid heavy fluids with free or rigid boundary surfaces are considered. For slender streams of fluid, the flow and the free boundaries are represented by a number of different asymptotic expansions in powers of the slenderness ratio. There are three kinds of outer expansions representing respectively jets, which have two free
Geer, James, Keller, Joseph B.
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Flows of incompressible inviscid heavy fluids with free or rigid boundary surfaces are considered. For slender streams of fluid, the flow and the free boundaries are represented by a number of different asymptotic expansions in powers of the slenderness ratio. There are three kinds of outer expansions representing respectively jets, which have two free
Geer, James, Keller, Joseph B.
openaire +2 more sources