Think of not what you see, but of what it took to produce what you see ( Benoit Mandelbrot )

Adrian Corocsenie's vision is based on fractals. Their application in the gardens is an unusual one. He is among the few people who draw fractals manually. Generally fractals is done only using a computer. All his designs are unique fractals. The lines are rows of perennial flowers for 3 seasons (spring, summer, autumn), points are Buxus and the white areas are lawn.

Fractal theory is the so-called theory of complexity, which also includes chaos theory, dissipative structures theory, catastrophe theory, etc. It is a body with an irregular shape which can be broken, its fragments resembling the whole. The name fractal belongs to the mathematician Benoit Mandelbrot French (born in 1924), the inventor of the famous "apple math" that bears his name, built with the help of a computer. Fractal characteristics are in contrast to the order of Euclid and crystal perfection of the physical world. In math, a fractal is an object whose geometry (size) is on fractions.

Fractals have found unexpected applications, like in the development of antennas used in telecommunications (eg in the shape of the triangular Van Kock fractal or square Minkowski type), with exceptional performance: high quality, on un-harmonically correlated frequencies, and by obtaining resonance frequencies with lower values than the ones corresponding to the geometrical dimensions. This allows for an antenna miniaturisation on a certain frequency. Already, such miniaturised antennas are used to equip current cell phones. Also, fractals have found their use in computer graphics, creating artificial landscapes, etc. The usefulness of fractal geometry in chaos theory lies in the fact that objects are no longer reduced to a few perfectly symmetrical forms as in Euclidean geometry - fractal geometry studies asymmetry, asperity of objects, and fractal structures in nature. In fractal geometry, clouds are no longer spheres, mountains are no longer cones, coast lines are no longer circles. In fact, asperity is not only an imperfection of an ideal thing, it is the very essence of many natural objects. Thus, while Euclidean geometry served as a descriptive language for classical movement mechanisms, fractal geometry is used to study patterns produced by chaos. In mathematics, fractal functions behave like chaotic systems in which random changes on the starting values ​​can change the value of the function in unpredictable ways, within the system boundaries. The famous Mandelbrot Crowd demonstrates this link between fractals and chaos theory - from a very simple mathematical equation, very complex results are produced. In order to understand fractals, one must distinguish those fundamental properties that do not change from one studied object to another. By studying the fractal structure of chaotic systems, it is possible to determine the critical points at which the predictability of a system disappears. The purpose of fractal geometry is to provide an ingenious method of knowledge, by which complex phenomena can be explained starting from simple rules.

Fractals in art. Due to their beauty, fractals are processed by some people in art, coloured in their different manifestations and grouped in galleries of fractal images, to amaze and to provoke imagination. Also, fractals can be used to accurately model music produced by different composers. Fractals can be found in some paintings, as well as in African art and architecture.

Fractal Generators. Anyone can create beautiful landscapes and attractive images with the help of fractals because there are a lot of fractal-generating software applications on the Internet. Thus, anyone can generate fractals, without needing to know complex mathematical notions - all they have to do is modify the function that generates the fractal and other parameters, and select some colours. Also, you can compose your own fractal music using specialised software programs.

Applications in various fields. The complexity and amazing properties of fractals allow them to model things from different fields: biology, geography, hydrology, meteorology, geology, economics, medicine, psychology, astronomy (modelling the structure of the Universe, the distribution of galaxies and the distribution of craters per month - in the Apollo 13 film, an image of the moon was generated using fractals).

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