In this paper, we first review local counting methods for perimeter estimation of piecewise smooth binary figures on square, hexagonal, and triangular grids. We verify that better perimeter estimates, using local counting algorithms, can be obtained using hexagonal or triangular grids. We then compare surface area estimates using local counting techniques for binary three-dimensional volumes under the three semi-regular polyhedral tilings: the cubic, truncated octahedral, and rhombic dodecahedral tilings. It is shown that for surfaces of random orientation with a uniform distribution, the expected error of surface area estimates is smaller for the truncated octahedral and rhombic dodecahedral tilings than for the standard cubic or rectangul...
Candidates to the least perimeter partition of various polygonal shapes into N planar connected equa...
The surface area of a geometric model, like its volume, is an important integral property that need...
Consider digitising a binary pattern on a regular lattice, so that each 'face' of pixel of the latti...
In this paper, we first review local counting methods for perimeter estimation of piecewise smooth b...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
Surface tiling, as well as its counterpart in 3D, i.e. volume tiling, is a fundamental research prob...
A sampling design of local stereology is combined with a method from digital stereology to yield a n...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
This investigation concerns the comparison of two- and three-dimensional data obtained on a cellular...
Fractal dimension is widely used to give a measure of variability and roughness of curves, signals, ...
We demonstrate that the volume enclosed by triangulated surfaces can be computed eÆciently in the sa...
According to Crofton's formula, the surface area S(A) of a sufficiently regular compact set A in Rd ...
Consider a complex, highly convoluted three-dimensional object that has been digitized and is availa...
International audienceIt is a widely observed phenomenon in computer graphics that the size of the s...
Candidates to the least perimeter partition of various polygonal shapes into N planar connected equa...
The surface area of a geometric model, like its volume, is an important integral property that need...
Consider digitising a binary pattern on a regular lattice, so that each 'face' of pixel of the latti...
In this paper, we first review local counting methods for perimeter estimation of piecewise smooth b...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
Surface tiling, as well as its counterpart in 3D, i.e. volume tiling, is a fundamental research prob...
A sampling design of local stereology is combined with a method from digital stereology to yield a n...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
What is the least surface area of a shape that tiles Rd under translations by Zd? Any such shape mus...
This investigation concerns the comparison of two- and three-dimensional data obtained on a cellular...
Fractal dimension is widely used to give a measure of variability and roughness of curves, signals, ...
We demonstrate that the volume enclosed by triangulated surfaces can be computed eÆciently in the sa...
According to Crofton's formula, the surface area S(A) of a sufficiently regular compact set A in Rd ...
Consider a complex, highly convoluted three-dimensional object that has been digitized and is availa...
International audienceIt is a widely observed phenomenon in computer graphics that the size of the s...
Candidates to the least perimeter partition of various polygonal shapes into N planar connected equa...
The surface area of a geometric model, like its volume, is an important integral property that need...
Consider digitising a binary pattern on a regular lattice, so that each 'face' of pixel of the latti...