# Volumetric Untrimming: Precise decomposition of trimmed trivariates into   tensor products

**Authors:** Fady Massarwi, Pablo Antolin, Gershon Elber

arXiv: 1903.08907 · 2019-03-22

## TL;DR

This paper introduces a precise decomposition algorithm for trimmed B-spline trivariates into tensor-product B-spline trivariates, facilitating easier integration in isogeometric analysis of complex 3D CAD models.

## Contribution

The authors propose a novel untrimming algorithm that decomposes trimmed B-spline trivariates into tensor-product forms, improving volumetric integration for IGA applications.

## Key findings

- Effective decomposition of complex trimmed trivariates demonstrated
- Simplifies integration process in isogeometric analysis
- Applicable to complex CAD geometries with trimmed volumes

## Abstract

3D objects, modeled using Computer Aided Geometric Design tools, are traditionally represented using a boundary representation (B-rep), and typically use spline functions to parameterize these boundary surfaces. However, recent development in physical analysis, in isogeometric analysis (IGA) in specific, necessitates a volumetric parametrization of the interior of the object. IGA is performed directly by integrating over the spline spaces of the volumetric spline representation of the object. Typically, tensor-product B-spline trivariates are used to parameterize the volumetric domain. A general 3D object, that can be modeled in contemporary B-rep CAD tools, is typically represented using trimmed B-spline surfaces. In order to capture the generality of the contemporary B-rep modeling space, while supporting IGA needs, Massarwi and Elber (2016) proposed the use of trimmed trivariates volumetric elements. However, the use of trimmed geometry makes the integration process more difficult since integration over trimmed B-spline basis functions is a highly challenging task. In this work, we propose an algorithm that precisely decomposes a trimmed B-spline trivariate into a set of (singular only on the boundary) tensor-product B-spline trivariates, that can be utilized to simplify the integration process in IGA. The trimmed B-spline trivariate is first subdivided into a set of trimmed B\'ezier trivariates, at all its internal knots. Then, each trimmed B\'ezier trivariate, is decomposed into a set of mutually exclusive tensor-product B-spline trivariates, that precisely cover the entire trimmed domain. This process, denoted untrimming, can be performed in either the Euclidean space or the parametric space of the trivariate. We present examples on complex trimmed trivariates' based geometry, and we demonstrate the effectiveness of the method by applying IGA over the (untrimmed) results.

## Full text

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## Figures

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## References

33 references — full list in the complete paper: https://tomesphere.com/paper/1903.08907/full.md

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Source: https://tomesphere.com/paper/1903.08907