Max Cooper - Penrose Tiling (official video by Jessica In)
Stream/download the album 'Yearning for the Infinite': https://ffm.to/yearningfortheinfinite
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Max Cooper:
"The new visual project involved finding different ways of visualising the aesthetics of the infinite. One chapter approached the idea via Penrose Tiling, an aperiodic tiling system developed by Roger Penrose in the 1970’s, which can tile an infinite plane without falling into simple repeating units as with normal (periodic) tiling systems. This idea of the link between non-cyclical structure and the infinite was also central to the the processes of improvisation used throughout. But for this piece I wanted to mirror the tiling regime more explicitly.
I opted to do that by having all loop lengths corresponding to prime numbers. This yielded the equivalent behaviour musically, where at least for the length of the track (and for two weeks or so if it had gone on playing), there would be no exact repeat of any bar - loops without loops. The feeling of this idea was a nice rhythmical syncopation which I applied to some live instrumentation with the sansula to begin with, and built more and more layers of tight percussion around as the piece progressed.
Jessica In built a real animated Penrose Tiling visual environment to accompany to great effect. Using the roof, walls, floor and two front surfaces of animated tiling structures to engulf the audience in beautiful fine detailing work which bursts to life towards the end."
Follow Max Cooper:
https://www.facebook.com/maxcoopermax/
https://www.instagram.com/maxcoopermax/
https://maxcooper.net/
The full album project is explained at https://www.yearningfortheinfinite.net
Jessica In:
"Named after mathematician and physicist Roger Penrose, Penrose tilings are geometrical packings of a pair of rhombohedral tiles that can be used to tile a flat plane ad infinitum without the pattern ever repeating itself. Although comprising of a set of regular rhombus blocks, it is non-periodic, meaning that it lacks translational symmetry. While this aperiodicity implies that a shifted copy of a tiling will never match the original, a Penrose tiling may be constructed so as to exhibit both reflection symmetry and five-fold rotational symmetry - the tiling has scaling self-similarity, so the same patterns occur at larger and larger scales.
For the Infinite visuals, the pattern is constructed in a way to try and reveal the growth of the tiling, spinning out in trails that initially appear to be random but gradually exhibit the underlying structure. The work explores the visual properties of the tiling to exhibit a mixture of regularity and disorder that somehow retains an order to the eye. Different scales are superimposed to explore the tiling’s self similarity that occurs through its different hierarchical levels of composition and decomposition. Many different algorithms for producing a spacing filling Penrose exist, the method used here is a substitution method known as a Robinson triangle decomposition: the Penrose rhombi are continually split into triangles with side lengths in ratios 1 and φ (phi, golden ratio). Smaller and smaller tiles are created as they are continually broken into these ratios, generating a potentially infinite tilling structure."
Follow Jessica:
http://www.jessicain.net
https://twitter.com/innjesst
https://www.instagram.com/shedrawswithcode
Видео Max Cooper - Penrose Tiling (official video by Jessica In) канала Max Cooper
Subscribe to Max Cooper: https://MaxCooper.lnk.to/Subscribe and enable alerts.
Max Cooper:
"The new visual project involved finding different ways of visualising the aesthetics of the infinite. One chapter approached the idea via Penrose Tiling, an aperiodic tiling system developed by Roger Penrose in the 1970’s, which can tile an infinite plane without falling into simple repeating units as with normal (periodic) tiling systems. This idea of the link between non-cyclical structure and the infinite was also central to the the processes of improvisation used throughout. But for this piece I wanted to mirror the tiling regime more explicitly.
I opted to do that by having all loop lengths corresponding to prime numbers. This yielded the equivalent behaviour musically, where at least for the length of the track (and for two weeks or so if it had gone on playing), there would be no exact repeat of any bar - loops without loops. The feeling of this idea was a nice rhythmical syncopation which I applied to some live instrumentation with the sansula to begin with, and built more and more layers of tight percussion around as the piece progressed.
Jessica In built a real animated Penrose Tiling visual environment to accompany to great effect. Using the roof, walls, floor and two front surfaces of animated tiling structures to engulf the audience in beautiful fine detailing work which bursts to life towards the end."
Follow Max Cooper:
https://www.facebook.com/maxcoopermax/
https://www.instagram.com/maxcoopermax/
https://maxcooper.net/
The full album project is explained at https://www.yearningfortheinfinite.net
Jessica In:
"Named after mathematician and physicist Roger Penrose, Penrose tilings are geometrical packings of a pair of rhombohedral tiles that can be used to tile a flat plane ad infinitum without the pattern ever repeating itself. Although comprising of a set of regular rhombus blocks, it is non-periodic, meaning that it lacks translational symmetry. While this aperiodicity implies that a shifted copy of a tiling will never match the original, a Penrose tiling may be constructed so as to exhibit both reflection symmetry and five-fold rotational symmetry - the tiling has scaling self-similarity, so the same patterns occur at larger and larger scales.
For the Infinite visuals, the pattern is constructed in a way to try and reveal the growth of the tiling, spinning out in trails that initially appear to be random but gradually exhibit the underlying structure. The work explores the visual properties of the tiling to exhibit a mixture of regularity and disorder that somehow retains an order to the eye. Different scales are superimposed to explore the tiling’s self similarity that occurs through its different hierarchical levels of composition and decomposition. Many different algorithms for producing a spacing filling Penrose exist, the method used here is a substitution method known as a Robinson triangle decomposition: the Penrose rhombi are continually split into triangles with side lengths in ratios 1 and φ (phi, golden ratio). Smaller and smaller tiles are created as they are continually broken into these ratios, generating a potentially infinite tilling structure."
Follow Jessica:
http://www.jessicain.net
https://twitter.com/innjesst
https://www.instagram.com/shedrawswithcode
Видео Max Cooper - Penrose Tiling (official video by Jessica In) канала Max Cooper
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