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PDE surface generation with combined closed and non-closed form solutions
Zhang J., You L. Journal of Computer Science and Technology19(5):650-656,2004.Type:Article

Date Reviewed: 03/03/05

The partial differential equation (PDE) method for surface generation yields surfaces as solutions to elliptic boundary value problems. The method was introduced by Bloor and Wilson [1], and Hoschek and Lasser [2]. Lowe et al. [3] used it for the automatic design of ship hulls.

In this paper, the authors use the PDE method to generate smooth surfaces. They discuss the solution of a biharmonic elliptic equation with three vector-valued shape parameters, instead of one as done by Bloor and Wilson. The use of this generalized PDE in vase design was discussed by the authors in a separate paper [4]. Here, the authors allow a combination of the analytic closed form solution and a collocation method to minimize the residuals. They demonstrate the accuracy and efficiency of the new method with several examples, including the modeling of a claw.

Bloor, M.I.G.; Wilson, M.J. Generating blend surfaces using PDEs. Computer-Aided Design 21, 3(1989), 165–171.

Hoschek, J.; Lasser, D. Fundamentals of CAGD. A. K. Peters, Wellesley, MA, 1993.

Lowe, T.W.; Bloor, M.I.G.; Wilson, M.J. The automatic functional design of hull surface geometry. J. Ship Res. 38, 4(1994), 319–328.

Zhang, J.J.; You, L. PDE based surface representation -- vase design. Computers & Graphics 26, (2002), 89–98.

Reviewer: Beny Neta

Review #: CR130907 (0509-1055)

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