Special Issue on Collaborative Engineering

Sriram, Ram D.; Szykman, Simon; Durham, Delcie

doi:10.1115/1.2201728

Cited by 13 publications

(4 citation statements)

References 2 publications

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“…In equation ( 4), the variable p is replaced by the variable p c and the variable p s is replaced by the variable p t . As a result, the transformation from p c to p t can be obtained, as shown equation (5).…”

Section: Construction Of General B éZier Curve With Independent Coord...mentioning

confidence: 99%

“…Parameterized representation of geometric shape has brought more conveniences to complex geometric shape construction in industrial practices, such as microstructure, free surface, etc [1,2]. With the rapid development of product design, geometric representation encounters many challenges, such as the conceptual design, the multidisciplinary design, the collaborative design [3][4][5]. It is well known that parameterized representation has brought more conveniences to represent complex geometric shape.…”

Section: Introductionmentioning

confidence: 99%

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An equivalent parameter geometric shape representation using independent coordinates of cubic Bézier control points

et al. 2022

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Bézier surface has been commonly applied to represent the complex geometric shape. Generally, all control points are dealt with by the same blending functions, regardless of the effect of independent coordinate. It causes to lack the modeling flexibility. Therefore, this paper proposes an equivalent parameter geometric shape representation method using the independent coordinates of control points. Since the coordinate components of control points are independent, the geometric modeling becomes more flexible. Firstly, a general Bézier curve is described in detail. Related expression is brought out in the form of independent coordinates by introducing two parameters. Then, their geometric meanings are analyzed in detail. Since both parameters are independent to parametric variables u and v, Bézier curve possess the same interval in the discrete parametric space, namely equivalent parameter. Next, a bicubic Bézier subsurface patch representation is discussed, including regular and non-regular subsurface patch. A general surface expression is given out in the form of independent coordinates, as well as the parameter structure and the geometric transformations. Finally, an example of ‘Bézier tree branch’ is constructed by using the proposed method. Results shows that the proposed method is feasible and reasonable.

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Section: Construction Of General B éZier Curve With Independent Coord...mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

An equivalent parameter geometric shape representation using independent coordinates of cubic Bézier control points

et al. 2022

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“…We should point out that, intellectually speaking, the basic knowledge that underlies many of these approaches may not be "scientifically" new. Yet, their implications for production engineering have become increasingly important as development cycles are tightened to the minimum and product complexities are pushed to the maximum [33].…”

Section: Review Of Current Research Approachesmentioning

confidence: 99%

A Scientific Foundation of Collaborative Engineering

et al. 2007

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Collaborative engineering is the practical application of collaboration sciences to the engineering domain. In today's highly connected technology-driven economy, the production industry must rely on the best practices of collaborative engineering to stay competitive when designing, manufacturing and operating complex machines, processes, and systems on a global scale. Despite its importance, collaborative engineering is currently more of a practiced art than a scientific discipline. A better understanding of how engineers should collaborate with all stakeholders to accomplish complex tasks that fulfill our increasing social responsibilities is a grand challenge. However, because we currently lack well-defined sciences of human collaboration, we must first establish a scientific foundation of collaborative engineering to develop this emerging field into a rigorous discipline. This paper reports on the CIRP community's collective efforts to establish such a scientific foundation according to the "Observation Hypothesis Theory" development pathway. Our objective is to spearhead the rigorous development of this new human-centered engineering discipline, so that useful knowledge can be generated to educate students and practical guidelines can be developed to enable engineers to become more productive collaboration leaders in the new global production industry.

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“…Alfred Leo [4] identified divided square difference labeling and labeled the graphs and its classes with the divided square difference labeling. Further study on the labeling and its behaviour is extensively found in many papers by various authors [5] and [6].…”

Section: Introductionmentioning

confidence: 99%

Divided square difference cordial Labeling of join some spider graphs

Christy,

Palani

2023

E3S Web of Conf.

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Let G be a graph with its vertices and edges. On defining bijective function ρ:V(G) →{0,1,...,p}. For each edge assign the label with 1 if ρ*(ab)= | ρ(a)2−ρ(b)2/ρ(a)−ρ(b) | is odd or 0 otherwise such that |eρ(1) − eρ(0)| ≤ 1 then the labeling is called as divided square difference cordial labeling graph. We prove in this paper for relatively possible set of spider graphs with atmost one legs greater than one namely J(SP(1m,2n)) ,J(SP(1m,2n,31)), (SP(1m,2n,32)),J(SP(1m,2n,41)),J(SP(1m,2n,51). AMS Mathematics Subject Classification:05C78.

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Special Issue on Collaborative Engineering

Cited by 13 publications

References 2 publications

An equivalent parameter geometric shape representation using independent coordinates of cubic Bézier control points

An equivalent parameter geometric shape representation using independent coordinates of cubic Bézier control points

A Scientific Foundation of Collaborative Engineering

Divided square difference cordial Labeling of join some spider graphs

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