Lebesgue curve is a space-filling curve that fills the unit square through linear interpolation. In this study, we generalise Lebesgue's construction to generate space-filling curves from any given planar substitution satisfying a mild condition. The generated space-filling curves for some known substitutions are elucidated. Some of those substitutions further induce relatively dense fractal-like sets in the plane, whenever some additional assumptions are met
The first part of this thesis deals with Cantor's bijection and the historical develop- ment of the ...
AbstractWe are given a two-dimensional square grid of size N × N, where N :=2n and n⩾0. A space fill...
Space-filling curves can be used to organise points in the plane into bounding-box hierarchies (such...
We define exact self-similarity of Space Filling Curves on the plane. For that purpose, we adapt the...
Space-filling curves have been colloquially referred to as "fractals" since the term was coined and ...
A space-filling curve (SFC) is a way of mapping a multi-dimensional space into a one-dimensional spa...
A famous theorem discovered in 1936 by H. Steinhaus on a sufficient condition for obtaining the coor...
Abstract. We construct a continuous curve from the interval [0, 1] into the n-dimensional cube [0, 1...
El propósito de este artículo es desarrollar un test que permita determinar la auto-similaridad de u...
In this paper, we shall investigate several questions related to space-lling curves. We start with a...
We present a newly developed, self-contained theory for discrete space-filling curves (SFCs). Mesh p...
The theory of space-filling curves will be developed. The two original space-filling curves, those o...
A space-filling curve is a way of mapping the discrete multi-dimensional space into the one-dimensio...
The use of space filling curves for proximity-improving mappings is well known and has found many us...
The first part of this thesis deals with Cantor's bijection and the historical develop- ment of the ...
AbstractWe are given a two-dimensional square grid of size N × N, where N :=2n and n⩾0. A space fill...
Space-filling curves can be used to organise points in the plane into bounding-box hierarchies (such...
We define exact self-similarity of Space Filling Curves on the plane. For that purpose, we adapt the...
Space-filling curves have been colloquially referred to as "fractals" since the term was coined and ...
A space-filling curve (SFC) is a way of mapping a multi-dimensional space into a one-dimensional spa...
A famous theorem discovered in 1936 by H. Steinhaus on a sufficient condition for obtaining the coor...
Abstract. We construct a continuous curve from the interval [0, 1] into the n-dimensional cube [0, 1...
El propósito de este artículo es desarrollar un test que permita determinar la auto-similaridad de u...
In this paper, we shall investigate several questions related to space-lling curves. We start with a...
We present a newly developed, self-contained theory for discrete space-filling curves (SFCs). Mesh p...
The theory of space-filling curves will be developed. The two original space-filling curves, those o...
A space-filling curve is a way of mapping the discrete multi-dimensional space into the one-dimensio...
The use of space filling curves for proximity-improving mappings is well known and has found many us...
The first part of this thesis deals with Cantor's bijection and the historical develop- ment of the ...
AbstractWe are given a two-dimensional square grid of size N × N, where N :=2n and n⩾0. A space fill...
Space-filling curves can be used to organise points in the plane into bounding-box hierarchies (such...