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Mathematical analysis on the propagation of Griffith crack in an initially stressed strip subjected to punch pressure

Abhishek Kumar Singh, Abhishek Kumar Singh, Ajeet Kumar Singh, Ajeet Kumar Singh, Sayantan Guha, Deepak Kumar

2023Mechanics Based Design of Structures and Machines19 citationsDOI

Abstract

The purpose of this study is to analyze the features of a moving Griffith crack in an initially stressed infinitely long and finitely thick isotropic strip with moving parallel punches of constant load acting on its boundaries owing to plane wave propagation under point loading. Coupled singular integral equations and singularities of the Cauchy-type are used to formulate the present model, Dirac delta function is employed to analyze point load located at the moving crack edge, and Hilbert transformation properties are used for obtaining stress intensity factor (SIF) with constant point loading. Numerical simulations and graphical illustrations are performed to analyze the influences of the prevalent parameters, viz. initial stresses, punch pressure, distinct positions of point load, length and speed of the crack on the SIF for the considered isotropic material strip.

Topics & Concepts

IsotropyStress intensity factorConstant (computer programming)Cauchy distributionMathematical analysisGravitational singularityPlane (geometry)Point (geometry)Moving loadDirac delta functionSingular point of a curveMathematicsFracture mechanicsGeometryEnhanced Data Rates for GSM EvolutionMechanicsStructural engineeringPhysicsEngineeringFinite element methodOpticsComputer scienceTelecommunicationsProgramming languageNumerical methods in engineeringElasticity and Wave PropagationHigh-Velocity Impact and Material Behavior
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