Browsing by Author "Lira, I."
Now showing 1 - 6 of 6
Results Per Page
Sort Options
- ItemAnalysis of plastic strain localization by a combination of the speckle interferometry with the bulge test(ELSEVIER SCI LTD, 2007) Montay, G.; Francois, M.; Tourneix, M.; Guelorget, B.; Vial Edwards, C.; Lira, I.The process of localization of strains, diffuse and localized necking, up to fracture in equi-biaxial loading was analyzed through the images obtained by electronic speckle pattern interferometry (ESPI). The problem of localization is important in the sheet metal forming processes. The ESPI technique is used to have a better resolution on the measured strains (10(-5)) than other technique such as the image correlation (10(-2), 10(-3)). The bulge test is currently used to determine the mechanical properties of materials by measuring the deformation that occurs in response to the application of a controlled pressure. This test is used to determine the mechanical properties of sheet metals submitted to an equi-biaxial loading path, the strains at failure are used as data to determine forming limit diagrams (FLDs).
- ItemBeyond the GUM: variance-based sensitivity analysis in metrology(2016) Lira, I.
- ItemEquivalence of alternative Bayesian procedures for evaluating measurement uncertainty(IOP PUBLISHING LTD, 2010) Lira, I.; Grientschnig, D.Current recommendations for evaluating uncertainty of measurement are based on the Bayesian interpretation of probability distributions as encoding the state of knowledge about the quantities to which those distributions refer. Given a measurement model that relates an output quantity to one or more input quantities, the distribution of the former is obtained by propagating those of the latter according to the axioms of probability calculus and also, if measurement data are available, by applying Bayes' theorem.
- ItemMonte Carlo evaluation of the uncertainty associated with the construction and use of a fitted curve(ELSEVIER SCI LTD, 2011) Lira, I.A Monte Carlo procedure is presented for computing the joint state-of-knowledge probability distribution to be assigned to the coefficients of a curve fitted to a set of points in a two-dimensional coordinate system. Experimental data about this set may be available, but other relevant information may also be taken into account. The procedure is fully in line with the approach in Supplement 1 to the Guide to the Expression of Uncertainty in Measurement. It consists of propagating the joint probability distribution of the input quantities through the mathematical model of the measurement by which the coefficients are defined. The model is usually obtained by least-squares adjustment, which is here interpreted differently than in the conventional formulation. However, applying other fitting criteria is also possible. Examples illustrate the application of the procedure. (C) 2011 Elsevier Ltd. All rights reserved.
- ItemStrain and strain rate measurement during the bulge test by electronic speckle pattern interferometry(ELSEVIER SCIENCE SA, 2007) Montay, G.; Francois, M.; Tourneix, M.; Guelorget, B.; Vial Edwards, C.; Lira, I.This paper presents a new experimental method to measure the strain increment and the strain rate during the bulge of a copper sheet. The electronic speckle pattern interferometry (ESPI) is combined with the bulge test to measure the field of strain increment. The strain rate is used to detect heterogeneity in the strain distribution.
- ItemUncertainty of residual stresses measurement by layer removal(PERGAMON-ELSEVIER SCIENCE LTD, 2006) Bendek, E.; Lira, I.; Francois, M.; Vial, C.A model to evaluate the uncertainty in the measurement of the through-thickness residual stress distribution in plates by the layer removal technique is presented. Thin layers were chemically etched from a stripe on rectangular specimens cut from a low carbon cold-rolled steel sheet. Phase shifting laser interferometry was used to measure the ensuing curvature. Polynomials were least-squares adjusted to the curvatures as a function of the etched depth. The polynomials were inserted into an integro-differential equation relating the curvature to the residual stresses, which were assumed to be a function of depth only. A comparison with X-ray diffraction measurement of the surface residual stresses showed good agreement. The uncertainty was found to increase steeply at the surfaces and to depend mainly on the assumed value for the modulus of elasticity, on the curvature fit, and on the depth of etching. (C) 2006 Elsevier Ltd. All rights reserved.