Space-filling curve is a curve which maps a unit line segment to a continuous curve in the unit n-dimensional cube.
Fraction is an n-dimensional subcube, which is some partition of an n-dimensional cube.
Genus is the number of fractions of the first partition of an n-dimensional cube.
Monofractal - a curve constructed using one recurrent formula.
Polyfractal - a curve constructed with the help of several recurrent formulas.
Prototype is a way of passing through the fractions of the first partition of an n-dimensional cube.
Basic transformation is the operation that performs an isometric transformation of a fraction (rotation, reflection and/or reverse).
To define a curve means to specify its prototype and the sequence of basic transformations.
Hilbert curve is mono-fractal curve [1]. Let
Basic transformation ji(Pn) -> ij means that j -> i, i -> j and J -> I, I -> J for Pn.
Basic transformation JI(Pn) -> ij means that J -> i, I ->j and j -> I, i -> J for Pn.
It transforms the coordinates as follows:
Permuting the letters in the base transformation is equivalent to permuting the columns in the matrix, and changing the letter case is equivalent to multiplying by -1.
Peano curve is mono-fractal curve [2]. Prototype chain code for the Peano curve is
The recursive formula describing this curve has the form:
Н curve is trangular curve. It was first obtained by Niedermeier R., Reinhardt K. and Sanders P. [3]. Prototype chain code for the H curve is
The recursive formula describing this curve has the form:
The curve is completed to a square according to the following rule:
The line above the base transforms means reversal. This operation consists in changing the case of the letters of the base transformation and passing in the reverse order Pn.
It transforms the coordinates as follows:
Changing the case of the letters of the base transformation is equivalent to multiplying the matrix by -1 and passing in the reverse order Pn is equivalent to passing each column of the matrix in reverse order.
βΩ curve is bi-fractal curve. It was first obtained by Jens-Michael Wierum [4]. Prototype chain codes for the βΩ curve are
The recursive formulas describing this curve has the form:
This curve is tetra-fractal curve. It was first obtained by T. Asano, D. Ranjan, T. Roos, E. Welzl and P. Widmayer [5]. Prototype chain codes are
The recursive formulas describing this curve has the form:
[1] D. Hilbert, Über die stetige Abbildung einer Linie auf ein Flächenstück, Math. Ann. 38 (3) (1891) 459–460.
[2] G. Peano, Sur une courbe, qui remplit toute une aire plane, Math. Ann. 36 (1) (1890) 157–160.
[3] R. Niedermeier, K. Reinhardt, P. Sanders, Towards optimal locality in mesh-indexings, Discrete Applied Mathematics 117 (2002) 211–237.
[4] J.-M. Wierum, Definition of a new circular space-filling curve: βΩ-indexing, Technical Report TR-001-02, Paderborn Center for Parallel Computing (PC2), 2002.
[5] T. Asano, D. Ranjan, T. Roos, E. Welzl, P. Widmayer, Space-filling curves and their use in the design of geometric data structures, Theoretical Computer Science 181 (1) (1997) 3–15.