TitleAn Uncertainty Model Of Approximating The Analytical Solution To The Real Case In The Field Of Stress Prediction
Journal titleMetrology and Measurement Systems
Divisions of PASNauki Techniczne
PublisherPolish Academy of Sciences Committee on Metrology and Scientific Instrumentation
Date2015[2015.01.01 AD - 2015.12.31 AD]
ReferencesRipperger (1947), Critical stresses in a circular ring, Proc, 112, 619. ; Cantrell (2008), Technical Note : Review of methods for linear least squares fitting of data and application to atmospheric chemistry problems, Atmos Chem Phys, 8, 5477, doi.org/10.5194/acp-8-5477-2008 ; Batista (1996), Stresses in a circular ring under two forces acting along a diameter, Strain Anal Eng, 31, 75, doi.org/10.1243/03093247V311075 ; Timoshenko (1910), Stresses in a circular ring compressed by two opposing forces Kiev Polytech, Proc Inst, 9, 21. ; Timoshenko (1922), On the distribution of stresses in a circular ring compressed by two forces acting along a diameter, Philos Mag, 44, 1014, doi.org/10.1080/14786441208562578 ; Schwer (2007), An Overview of the PTC Guide for verification and validation in computational solid mechanics, Eng Comput, 10, 60. ; Montero (2011), Uncertainties associated with strain measuring systems using resistance strain gauges, Strain Anal Eng, 46, 1, doi.org/10.1243/03093247JSA661 ; Chianese (1988), The general solution to the distribution of stresses in a circular ring compressed by two forces acting along a diameter, Mechanics Appl Math, 41, 239, doi.org/10.1093/qjmam/41.2.239 ; Williamson (1968), Least - squares fitting of a straight line, Can J Phys, 46, 1845, doi.org/10.1139/p68-523 ; Nelson (1939), Stresses and Displacements in a Hollow Circular Cylinder Ph University of Michigan, Thesis. ; Sebastian (2012), An approach to the validation of computational solid mechanics models for strain analysis, Strain Anal Eng, 48, 36, doi.org/10.1177/0309324712453409 ; Liu (2011), Toward a better understanding of model validation metrics, Mech Des, 133, 071005.