Hilbert's two-dimensional space-filling curve is appreciated for its good locality-preserving properties and easy implementation for many applications. However, Hilbert did not describe how to generalize his construction to higher dimensions. In fact, the number of ways in which this may be done ranges from zero to infinite, depending on what properties of the Hilbert curve one considers to be essential. \u3cbr/\u3eIn this work we take the point of view that a Hilbert curve should at least be self-similar and traverse cubes octant by octant. We organize and explore the space of possible three-dimensional Hilbert curves and the potentially useful properties which they may have. We discuss a notation system that allows us to distinguish the c...
(a) 3D Hilbert curve and (b) 2D Hilbert curve and particles randomly distributed in regions.</p
Space-filling curves, particularly Hilbert curves, have proven to be a powerful paradigm for maintai...
Hilbert functions developed from classical mathematical concepts. In algebraic geometry, the coeffic...
Hilbert's two-dimensional space-filling curve is appreciated for its good locality-preserving proper...
Hilbert's two-dimensional space-filling curve is appreciated for its good locality properties for ma...
Hilbert’s two-dimensional space-filling curve is appreciated for its good locality properties for ma...
This paper introduces a new way of generalizing Hilbert's two-dimensional space-filling curve to arb...
This paper introduces a new way of generalizing Hilbert’s two-dimensional space-filling curve to arb...
This tip will describe the use of a graphical tool to explore the recursive Hilbert curves and will ...
R-trees can be used to store and query sets of point data in two or more dimensions. An easy way to ...
This article describes sixteen different ways to traverse d-dimensional space recursively in a way t...
Abstract R-trees can be used to store and query sets of point data in two or more dimensions. An eas...
Indexing schemes for grids based on space-filling curves (e.g., Hilbert curves) find applications in...
(a) 3D Hilbert curve and (b) 2D Hilbert curve and particles randomly distributed in regions.</p
Space-filling curves, particularly Hilbert curves, have proven to be a powerful paradigm for maintai...
Hilbert functions developed from classical mathematical concepts. In algebraic geometry, the coeffic...
Hilbert's two-dimensional space-filling curve is appreciated for its good locality-preserving proper...
Hilbert's two-dimensional space-filling curve is appreciated for its good locality properties for ma...
Hilbert’s two-dimensional space-filling curve is appreciated for its good locality properties for ma...
This paper introduces a new way of generalizing Hilbert's two-dimensional space-filling curve to arb...
This paper introduces a new way of generalizing Hilbert’s two-dimensional space-filling curve to arb...
This tip will describe the use of a graphical tool to explore the recursive Hilbert curves and will ...
R-trees can be used to store and query sets of point data in two or more dimensions. An easy way to ...
This article describes sixteen different ways to traverse d-dimensional space recursively in a way t...
Abstract R-trees can be used to store and query sets of point data in two or more dimensions. An eas...
Indexing schemes for grids based on space-filling curves (e.g., Hilbert curves) find applications in...
(a) 3D Hilbert curve and (b) 2D Hilbert curve and particles randomly distributed in regions.</p
Space-filling curves, particularly Hilbert curves, have proven to be a powerful paradigm for maintai...
Hilbert functions developed from classical mathematical concepts. In algebraic geometry, the coeffic...