English

An optimization-based registration approach to geometry reduction

Numerical Analysis 2022-11-21 v1 Numerical Analysis

Abstract

We develop and assess an optimization-based approach to parametric geometry reduction. Given a family of parametric domains, we aim to determine a parametric diffeomorphism Φ\Phi that maps a fixed reference domain Ω\Omega into each element of the family, for different values of the parameter; the ultimate goal of our study is to determine an effective tool for parametric projection-based model order reduction of partial differential equations in parametric geometries. For practical problems in engineering, explicit parameterizations of the geometry are likely unavailable: for this reason, our approach takes as inputs a reference mesh of Ω\Omega and a point cloud {yiraw}i=1Q\{y_i^{\rm raw}\}_{i=1}^Q that belongs to the boundary of the target domain VV and returns a bijection Φ\Phi that approximately maps Ω\Omega in VV. We propose a two-step procedure: given the point clouds {xj}j=1NΩ\{x_j\}_{j=1}^N\subset \partial \Omega and {yiraw}i=1QV\{y_i^{\rm raw}\}_{i=1}^Q \subset \partial V, we first resort to a point-set registration algorithm to determine the displacements {vj}j=1N\{ v_j \}_{j=1}^N such that the deformed point cloud {yj:=xj+vj}j=1N\{y_j:= x_j+v_j \}_{j=1}^N approximates V\partial V; then, we solve a nonlinear non-convex optimization problem to build a mapping Φ\Phi that is bijective from Ω\Omega in Rd\mathbb{R}^d and (approximately) satisfies Φ(xj)=yj\Phi(x_j) = y_j for j=1,,Nj=1,\ldots,N.We present a rigorous mathematical analysis to justify our approach; we further present thorough numerical experiments to show the effectiveness of the proposed method.

Keywords

Cite

@article{arxiv.2211.10275,
  title  = {An optimization-based registration approach to geometry reduction},
  author = {Tommaso Taddei},
  journal= {arXiv preprint arXiv:2211.10275},
  year   = {2022}
}
R2 v1 2026-06-28T06:13:15.044Z