3D打印英文文献和中文翻译(6)

4.1. Hierarchical algorithm for model slicing

Hierarchical processing refers to a series of parallel evenly spaced in-

cisal planes intersections with a model along the designated direction of layer slicing to acquire proﬁles of each layer section. The hierarchical al-

gorithm is based on the position information of triangles of an STL model, which is presented in Fig. 6.

Three key processes are required to determine the positioning for slicing the model:

a) A grouping method based on the position information of triangles: The value z is steeled numbered, which is in accordance with the incisal planes. By assumption, the minimum z of an STL model is Z0, the minimum z of a triangular facet is Zmin, and the maximum z is Zmax, then the sequence number n of incisal plane intersecting with the triangular facet is between number i and j which are calculated by the following equation:

Point V2 and intersections of other triangular facets and this incisal

plane are equally calculated.

c) Sequencing of the intersections: As is shown in Fig. 8, there are ﬁve calculated intersections for the incisal planes and triangular facets. The two intersections a and b on Δ 1 represent the ﬁrst and second

vertex of the proﬁle section. The intersection c from Δ 2, which is

equal with the intersection b, is taken as the third point, and so on, to determine the points so that they can be combined to ensure that the entire section proﬁle is obtained.

4.2. Modiﬁed scan line algorithm for nozzle path planning

A modiﬁed scan line algorithm suitable for the nozzle path planning [49], which can accommodate the characteristics of cement mortar- based 3D printing for building components is proposed. The process

In Eq. (1) above, x represents the smallest integer of those that are not less than x, whereas x represents the biggest integer of those

successively goes through a proﬁle scanning and a ﬁll scanning, which is applicable to different sections including those comprising of irregu- lar-shaped inner proﬁles. Fig. 9 presents a ﬂow chart for the algorithm.

4.2.1. Scanning of the proﬁle

The inner and outer section proﬁles can be judged by the inclusion relation of the circumscribed rectangles. As shown in Fig. 10, the coordinate minimum points of the circumscribed rectangles of Proﬁle

' ' '

a and Proﬁle b are respectively E1(xmin, ymin), E1(xmin, ymin), and

' ' , y' ) for the coordinate maximum points. The

Due to the width of the extruded materials, the proﬁle scan lines need to be offset, speciﬁcally, the original proﬁle scan lines offset to the graphic entity interior by a distance d (d is half the width of the ex- truded materials, the same below). As shown in Fig. 11, the solid and

Fig. 6. The hierarchical algorithm process. Fig. 7. Schematic of the intersection of an incisal plane and a model triangular facet

90 J. Xu et al. / Automation in Construction 76 (2017) 85–96

Fig. 8. Developed pattern of the triangular facets and a section proﬁle.

dotted lines are respectively the proﬁle scan line and the proﬁle scan line offset with P1(x1, y1)、P0(x0, y0)、P2(x2, y2) given. Then the coor- dinate after offset of a vertex P0(x0, y0) of the polygon proﬁle scan line is

According to Eq. (4), all the vertices of a proﬁle scan line offset can be calculated. Then the vertices are joined up successfully to obtain the off- set proﬁle scan lines of the entire graph. 3D打印英文文献和中文翻译(6):http://www.751com.cn/fanyi/lunwen_79266.html