A digital sundial is a clock that indicates the current time with numerals formed by the sunlight striking it. Like a classical

sundial A sundial is a horological device that tells the time of day (referred to as civil time in modern usage) when direct sunlight shines by the apparent position of the Sun in the sky. In the narrowest sense of the word, it consists of a flat ...

, the device contains no moving parts. It uses no electricity nor other manufactured sources of energy. The digital display changes as the sun advances in its daily course.

Technique

There are two basic types of digital sundials. One type uses optical waveguides, while the other is inspired by

fractal In mathematics, a fractal is a geometric shape containing detailed structure at arbitrarily small scales, usually having a fractal dimension strictly exceeding the topological dimension. Many fractals appear similar at various scales, as illu ...

geometry.

Optical fiber sundial

Sunlight enters into the device through a slit and moves as the sun advances. The sun's rays shine on ten linearly distributed sockets of optical waveguides that transport the light to a seven-segment display. Each socket fiber is connected to a few segments forming the digit corresponding to the position of the sun.

Fractal sundial

The theoretical basis for the other construction comes from fractal geometry. For the sake of simplicity, we describe a two-dimensional (planar) version. Let denote a straight line passing through the origin of a

Cartesian coordinate system A Cartesian coordinate system (, ) in a plane is a coordinate system that specifies each point uniquely by a pair of numerical coordinates, which are the signed distances to the point from two fixed perpendicular oriented lines, measured in t ...

and making angle with the -axis. For any define to be the perpendicular projection of on the line .

Theorem

Let , be a family of any sets such that

\bigcup_\theta

is a measurable set in the plane. Then there exists a set such that * ; * the measure of the set is zero for almost all . There exists a set with prescribed projections in ''almost'' all directions. This theorem can be generalized to three-dimensional space. For a non-trivial choice of the family , the set described above is a fractal.

Application

Theoretically, it is possible to build a set of masks that produce shadows in the form of digits, such that the display changes as the sun moves. This is the fractal sundial. The theorem was proved in 1987 by Kenneth Falconer. Four years later it was described in '' Scientific American'' by Ian Stewart. The first prototype of a digital sundial was constructed in 1994; it writes the numbers with light instead of shadow, as Falconer proved. In 1998 a digital sundial was installed for the first time in a public place ( Genk, Belgium). There exist window and tabletop versions as well. Julldozer in October 2015 published an

open-source Open source is source code that is made freely available for possible modification and redistribution. Products include permission to use the source code, design documents, or content of the product. The open-source model is a decentralized sof ...

3D printed model sundial.Mojoptix 001: Digital Sundial
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References

{{Reflist Sundials