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Theory of elasticity
TLDR
The theory of the slipline field is used in this article to solve the problem of stable and non-stressed problems in plane strains in a plane-strain scenario.Abstract:
Chapter 1: Stresses and Strains Chapter 2: Foundations of Plasticity Chapter 3: Elasto-Plastic Bending and Torsion Chapter 4: Plastic Analysis of Beams and Frames Chapter 5: Further Solutions of Elasto-Plastic Problems Chapter 6: Theory of the Slipline Field Chapter 7: Steady Problems in Plane Strain Chapter 8: Non-Steady Problems in Plane Strainread more
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Connecting near-field and far-field earthquake triggering to dynamic strain
TL;DR: In this article, the authors used a probabilistic model to transform measured interevent times to seismicity rate changes, and found that triggering rates in the far field scale with peak dynamic strain.
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A continuum model of motility in ameboid cells
Maria E. Gracheva,Hans G. Othmer +1 more
TL;DR: A continuum model of cell motility in ameboid cells based on a viscoelastic description of the cytoplasm and active stress generation controlled by extracellular signals is developed and analyzed.
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A lattice spring model of heterogeneous materials with plasticity
TL;DR: In this article, a three-dimensional lattice spring model of a heterogeneous material is presented and the model gives reasonable agreement with theoretical predictions for the elastic fields generated by a spherical inclusion, although for small particle sizes the discretization of the underlying lattice causes some departures from the predicted values.
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Precise measurement of strain accommodation in austenite matrix surrounding martensite in ferrous alloys by electron backscatter diffraction analysis
TL;DR: In this paper, electron backscatter diffraction (EBSD) analysis for various morphologies of lath, lenticular and thin plate martensite in ferrous alloys was performed.
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A New Implementation of the Meshless Finite Volume Method, Through the MLPG "Mixed" Approach
TL;DR: The meshless finite volume method (MFVM) as mentioned in this paper was developed for solving elasto-static problems, through a new meshless local Petrov-Galerkin (MLPG) "Mixed" approach.