The differential equation algorithm for general deformed swept volumes

The Sweep-Envelope Differential Equation (SEDE) and some aspects of the Sweep Differential Equation (SDE) approaches for characterizing swept volume boundaries are extended to include objects experiencing deformation in this paper. For deformed swept volume, it is found that the structure and algori

The generalized di!erential quadrature rule (GDQR) proposed recently by the authors is applied here to solve initial-value di!erential equations of the 2nd to 4th order. Di!erential quadrature expressions are derived based on the GDQR for these equations. The Hermite interpolation functions are used

## Abstract The generalized differential quadrature rule (GDQR) proposed here is aimed at solving high‐order differential equations. The improved approach is completely exempted from the use of the existing __δ__‐point technique by applying multiple conditions in a rigorous manner. The GDQR is used