A DIFFERENTIAL QUADRATURE PROCEDURE WITH DIRECT PROJECTION OF THE HEAVISIDE FUNCTION FOR NUMERICAL SOLUTION OF MOVING LOAD PROBLEM

S A EFTEKHARI

A DIFFERENTIAL QUADRATURE PROCEDURE WITH DIRECT PROJECTION OF THE HEAVISIDE FUNCTION FOR NUMERICAL SOLUTION OF MOVING LOAD PROBLEM

Authors

S A EFTEKHARI YOUNG RESEARCHERS AND ELITE CLUB, KARAJ BRANCH, ISLAMIC AZAD UNIVERSITY, KARAJ, IRAN

Keywords:

DQM, DIRAC-DELTA FUNCTION, HEAVISIDE FUNCTION, MODIFIED DIRECT PROJECTION APPROACH, MOVING LOAD PROBLEM, BEAMS, RECTANGULAR PLATES.

Abstract

OWING TO ITS PARTICULAR CHARACTERISTICS, THE DIRECT DISCRETIZATION OF THE DIRAC-DELTA FUNCTION IS NOT FEASIBLE WHEN POINT DISCRETIZATION METHODS LIKE THE DIFFERENTIAL QUADRATURE METHOD (DQM) ARE AP-PLIED. A WAY FOR OVERCOMING THIS DIFFICULTY IS TO APPROXIMATE (OR REGULARIZE) THE DIRAC-DELTA FUNCTION WITH SIMPLE MATHEMATICAL FUNC-TIONS. BY REGULARIZING THE DIRAC-DELTA FUNCTION, SUCH SINGULAR FUNC-TION IS TREATED AS NON-SINGULAR FUNCTIONS AND CAN BE EASILY AND DIRECTLY DISCRETIZED USING THE DQM. ON THE OTHER HAND, IT IS POSSI-BLE TO COMBINE THE DQM WITH THE INTEGRAL QUADRATURE METHOD (IQM) TO HANDLE THE DIRAC-DELTA FUNCTION. ALTERNATIVELY, ONE MAY USE ANOTHER DEÏ¬NITION OF THE DIRAC-DELTA FUNCTION THAT THE DERIVA-TIVE OF THE HEAVISIDE FUNCTION, H(X), IS THE DIRAC-DELTA FUNCTION, Î´(X), IN THE DISTRIBUTION SENSE, NAMELY, DH(X)/DX = Î´(X). THIS APPROACH HAS BEEN REFERRED IN THE LITERATURE AS THE DIRECT PROJECTION APPROACH. IT HAS BEEN SHOWN THAT ALTHOUGH THIS APPROACH YIELDS HIGHLY OSCILLATORY APPROXIMATION OF THE DIRAC-DELTA FUNCTION, IT CAN YIELD A NON-OSCILLATORY APPROXIMATION OF THE SOLUTION. IN THIS PAPER, WE FIRST PRESENT A MODIFIED DIRECT PROJECTION APPROACH THAT ELIMI-NATES SUCH DIFFICULTY (OSCILLATORY APPROXIMATION OF THE DIRAC-DELTA FUNCTION). WE THEN DEMONSTRATE THE APPLICABILITY AND RELIABILITY OF THE PROPOSED METHOD BY APPLYING IT TO SOME MOVING LOAD PROBLEMS OF BEAMS AND RECTANGULAR PLATES.

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Published

2016-04-12

Issue

Vol. 13 No. 9 (2016)

Section

Articles

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