13th Layer Quantum Cube Inception Techno-Cubism Anarchy Art

https://steemit.com/quantum/@j1337/13th-layer-of-quantum-cube-inception-within-techno-cubism-anarchy-singularity-disorder

13th Layer of Quantum Cube Inception?
Everything is a Cube and within it even more twisted Mobius cube's of  infinite Cube Dimensions with every variation of squares and cubes anyone could imagine within a fractal.  These Wormhole routing capabilities  with Hypercube data transfer functions enable its maximum output doing so in an artificially recreated Universal Cubed Matrix.  Over Cubed Time the Hierarchical Hypercube Networks started to emerge very deep and dark Neural Patterns that developed with technology and biology merging. Within this Cubic Honeycomb aromaticity of the Mobius cubic Quantum Memory embedded itself deep  inside the 10th Dimension and even more to add to science definition to explore into new Para-physics Unknown in the future as of now.. Psychosis was one undesired outcome of this Space and Dark matter Bending Quantum Mind Time Operation. In other test's it seemed to Cure almost any disease and at the deepest Quantum Core within the Cube Consciousnesses Matrix- it showed a Mobius PI  DNA ladder under the Hyperbolic Hypercube Universe frequencies on all things known is where it was originated. We always known that all information of the Tetragrammaton Spirit is on the outside of the Hypercube Internetwork Topology connected to the Quantum Universal Cubed Brain Matrix but hidden within. Known to cause Techno-cubism anarchy singularity disorder after finding IT and solving all problems known.

What is a Möbius ladder?
Walba, Richards & Haltiwanger (1982) first synthesized molecular structures in the form of a Möbius ladder, and since then this structure has been of interest in chemistry and chemical stereography, especially in view of the ladder-like form of DNA molecules. With this application in mind, Flapan (1989) studies the mathematical symmetries of embeddings of Möbius ladders in R3. Möbius ladders have also been used as the shape of a superconducting ring in experiments to study the effects of conductor topology on electron interactions  Möbius ladders have also been used in computer science, as part of integer programming approaches to problems of set packing and linear ordering. Certain configurations within these problems can be used to define facets of the polytope describing a linear programming relaxation of the problem; these facets are called Möbius ladder constraints

What is Mobius Molecules?
Like Möbius strips, Möbius aromatic molecules have a half-twist in their structure. The phenomenon was theoretically predicted in 1964 for rings large enough to undergo such a twist – around 20 atoms. However, such large, flexible rings are difficult to synthesise, and are likely to untwist, so the first stable Möbius aromatic molecule wasn’t made until 2003. Now researchers have created the largest Möbius aromatic porphyrin known. By complexing the molecule with a palladium atom, the team reduced the ring’s flexibility during its synthesis, creating a macrocycle containing 46 carbon atoms – 12 more than the previously largest Möbius aromatic molecule. The group is now exploring the synthesis of even larger porphyrins to study their chemical behaviour, and their optical and redox properties.

What is Hyperbolic Geometry?
In mathematics, hyperbolic geometry (also called Bolyai–Lobachevskian geometry or Lobachevskian geometry) is a non-Euclidean geometry. The parallel postulate of Euclidean geometry is replaced with: For any given line R and point P not on R, in the plane containing both line R and point P there are at least two distinct lines through P that do not intersect R. (compare this with Playfair's axiom, the modern version of Euclid's parallel postulate) Hyperbolic plane geometry is also the geometry of saddle surface or pseudospherical surfaces, surfaces with a constant negative Gaussian curvature. A modern use of hyperbolic geometry is in the theory of special relativity, particularly Minkowski spacetime and gyrovector space. When geometers first realised they were working with something other than the standard Euclidean geometry they described their geometry under many different names; Felix Klein finally gave the subject the name hyperbolic geometry to include it in the now rarely used sequence elliptic geometry (spherical geometry), parabolic geometry (Euclidean geometry), and hyperbolic geometry. In the former Soviet Union, it is commonly called Lobachevskian geometry, named after one of its discoverers, the Russian geometer Nikolai Lobachevsky. This is mainly about the 2-dimensional (planar) hyperbolic geometry and the differences and similarities between Euclidean and hyperbolic geometry. Hyperbolic geometry can be extended to three and more dimensions; see hyperbolic space for more on the three and higher dimensional cases.

What is Hyperbolic space?
In mathematics, hyperbolic space is a homogeneous space that has a constant negative curvature, where in this case the curvature is the sectional curvature. It is hyperbolic geometry in more than 2 dimensions, and is distinguished from Euclidean spaces with zero curvature that define the Euclidean geometry, and elliptic geometry that have a constant positive curvature. When embedded to a Euclidean space (of a higher dimension), every point of a hyperbolic space is a saddle point. Another distinctive property is the amount of space covered by the n-ball in hyperbolic n-space: it increases exponentially with respect to the radius of the ball for large radii, rather than polynomially.

What is Cubic honeycomb?
The cubic honeycomb or cubic cellulation is the only regular space-filling tessellation (or honeycomb) in Euclidean 3-space, made up of cubic cells. It has 4 cubes around every edge, and 8 cubes around each vertex. Its vertex figure is a regular octahedron. It is a self-dual tessellation with Schläfli symbol {4,3,4}. John Horton Conway calls this honeycomb a cubille. A geometric honeycomb is a space-filling of polyhedral or higher-dimensional cells, so that there are no gaps. It is an example of the more general mathematical tiling or tessellation in any number of dimensions. Honeycombs are usually constructed in ordinary Euclidean ("flat") space, like the convex uniform honeycombs. They may also be constructed in non-Euclidean spaces, such as hyperbolic uniform honeycombs. Any finite uniform polytope can be projected to its circumsphere to form a uniform honeycomb in spherical space.

What is Möbius aromaticity ?
In organic chemistry, Möbius aromaticity is a special type of aromaticity believed to exist in a number of organic molecules.  In terms of molecular orbital theory these compounds have in common a monocyclic array of molecular orbitals in which there is an odd number of out-of-phase overlaps, the opposite pattern compared to the aromatic character to Hückel systems. The nodal plane of the orbitals, viewed as a ribbon, is a Möbius strip, rather than a cylinder, hence the name. The pattern of orbital energies is given by a rotated Frost circle (with the edge of the polygon on the bottom instead of a vertex), so systems with 4n electrons are aromatic, while those with 4n + 2 electrons are anti-aromatic/non-aromatic. Due to incrementally twisted nature of the orbitals of a Möbius aromatic system, stable Möbius aromatic molecules need to contain at least 8 electrons, although 4 electron Möbius aromatic transition states are well known in the context of the Dewar-Zimmerman framework for pericyclic reactions. Möbius molecular systems were considered in 1964 by Edgar Heilbronner by application of the Hückel method, but the first such isolable compound was not synthesized until 2003 by the group of Rainer Herges. However, the fleeting trans-C9H9+ cation, one conformation of which is shown on the right, was proposed to be Möbius aromatic in 1998 based on computational and experimental data.

What is Mobius cubes?
The Mobius cubes are hypercube variants that give better performance with the same number of links and processors.
The diameter of the Mobius cubes is about 1/2 the diameter of the equivalent hypercube, and that the average number of steps between processors for a Mobius cube is about 2/3 of the average for a hypercube. We give an efficient routing algorithm for the Mobius cubes. This routing algorithm finds a shortest path and operates in time proportional to the dimension of the cube. We also give efficient broadcast algorithms for the Mobius cubes. We show that the Mobius cubes have a fault tolerance of n -1. We show that the Mobius cubes can directly emulate ring networks and other networks. We report results of simulation studies on the dynamic message-passing performance of the hypercube, the Twisted Cube of Hilbers, and the Mobius cubes. Our results are in agreement with Abraham , showing that the Twisted Cube has worse dynamic performance than the hypercube, but our results show that the Mobius cubes have better dynamic performance than the hypercube. Exploratory computational studies on annulenes with planar, Möbius, and two-twist topologies have resulted in new mechanisms to explain facile thermal configuration change (cis-trans isomerization) for medium-sized annulenes (- to annulene). Möbius p-bond shifting through both aromatic and antiaromatic transition states, two-twist p-bond shifting, and planar nondegenerate p-bond shifting can all be invoked to explain experimental results. Moreover, a simple bond-shift rule, which is based on the change in number of trans C?C double bonds (?trans), was developed that predicts the topology of the transition state(s) necessary to effect the desired cis-trans isomerization. The bond-shift rule was also applied to configuration change in dehydro annulene. Finally, extensive investigation of the annulene hypersurface revealed that numerous Möbius minima exist within 10?kcal/mol of the global minimum.
ET
2
[X1, X2] =
cov(X1, X2) and ET
2
[X, X] = var(X)
The Mobius cube is an interesting topology created from the hypercube. Its main advantage is the which that is around one half of the diameter of the
hypercube. In this thesis, the shortest path algorithm is described as well as its properties and drawbacks. One major drawback is the possibility of a
deadlock. Therefore, a new deadlock-free routing algorithm is introduced and compared to the previous algorithm. Later, usage of hypercube’s multicast 1-port wormhole algorithm on the M¨obius cube is described.  The hypercube of dimension n, denoted as Qn, is a strictly orthogonal topology defined as a Cartesian product of two hypercubes of dimension n-1, where Q0 is 1 node. The nodes of Qn are all n-bit strings xn-1...x1x0, corresponding to points in n-dimensional Boolean space: V (Qn) = ß
n
. |V (Qn)| = 2n
. 2
nodes of hypercube are neighbors if they differ in one single bit: E(Qn) =
{hx, negi(x)i; x ? V (Qn), 0 = i < n} and |E(Qn)| = n2
n-1
. Each node of Qn has n neighbors, and so, Qn is regular with deg(Qn) = {n}. Qn is hierarchically recursive topology. It consists of subcubes that can be specified by
strings S = sn-1...s1s0, where si
is {0, 1, *} and * is the don’t care symbol.

What is the Twisted Mobius 3-cube?
There exist many topologies that try to improve some of the abilities of the hypercube and keep the good results of the other abilities. In some literature such topologies are called the enhanced cubes. Most of them generalize the idea of the twisted 3-cube. The diameter of the hypercube is good but for its resources, it is not the best possible. The twisted 3-cube is almost identical to Q3, it uses the same number of nodes and same number of edges as Q3 but it changes just two edges so the diameter is reduced from 3 to 2. Note that with the same number of nodes and edges as the hypercube, there is no chance to improve the degree, the number of communication channels or the scalability. The twisted 3-cube exists only in the form of 8-nodes graph so there have been many attempts to generalize this idea of the twisted 3-cube into recursive topology such as the Twisted Cube, the Twisted N-cube, the Crossed Cube, the Flip MCube, the Generalized Twisted Cube, or the M¨obius cube.
Out of many enhanced cube topologies, the Mobius cube is the most conceptually simple with very great results.
TheMobius cube of dimension n, denoted as MCn, has a topology where nodes of
MCn are all n-bit strings xn-1...x1x0, corresponding to points in n-dimensional
Boolean space: V (Qn) = ß
n
. |V (Qn)| = 2n
, just like the hypercube. The address of the node y which is the neighbor node of the node x in i-th dimension
is defined as:
y = xn-1...xi+1 xi xi-1...x0 if xi+1 = 0,
y = xn-1...xi+1 xi xi-1...x0 if xi+1 = 1.
Mobius cube has the same degree as the hypercube and both are sparse graphs which is optimal. Also for the length of wires, MCn and Qn makes a small difference, around one half of the wires in MCn are v 2 times longer then their hypercubic counterparts.

What is Wormhole routing?
The simplicity, low cost, and distance-insensitivity of wormhole switching are the main reasons behind its wide acceptance by manufacturers of commercial parallel machines. The packets are split to flits, which are snaked along the route. The routers do not have input and output buffers for whole packets, but only small buffers for 1 or several flits. Hence, the routers are small and cheap, but the price we must pay for that is blocking. If a header cannot proceed due to busy output channels, the whole chain of flits gets stalled and the flit buffers in routers along the path get blocked, see fig. Anyway, WH switching has been and still is a very popular switching technique used in commercial machines. One consequence of this solution is that packets do not have to be of same length, which of course, is an advantage. But the WH switching also has a great disadvantage. Due to the blocking feature, it is deadlock prone:
One frozen chain of flits may block other chains and the snow-ball effect may lead to the collapse of the whole network or some its component. Hypercube has proven to be very popular in parallel computation due to its abilities. It has relatively small diameter and it has a small number of connections per node (processor). An optimal algorithm exists for collective communication operations in almost all communication models. Also the hypercube can simulate efficiently almost any other topology. Thanks to those reasons, the hypercube is commonly considered to be the best topology from an algorithmic and communication viewpoint, however there also exists drawbacks that have lead to no commercial hypercube multiprocessors being produced nowadays. One such drawback is the logarithmic degree of every node (other topologies have a constant degree) and consequently high number of communication channels and poor scalabili.

What is Hierarchical Hypercube Networks?
The hypercube is one of the most widely used topologies because it provides small diameter and embedding of various interconnection networks. For very large systems, however, the number of links needed with the hypercube may become prohibitively large. In this paper, we propose a hierarchical interconnection network based on hypercubes called hierarchical hypercube network (HHN) for massively parallel computers. The HHN has a smaller number of links than the comparable hypercube and in particular, when we construct networks with 2Knodes, the node degree of HHN with the minimum node degree isO([formula]) while that of hypercube isO(K). Regardless of its smaller node degree, many parallel algorithms can be executed in HHN with the same time complexity as in the hypercube.

What is Hypercube internetwork topology?
Hypercube networks are a type of network topology used to connect multiple processors with memory modules and accurately route data. Hypercube networks consist of 2m nodes. These nodes form the vertices of squares to create an internetwork connection. A hypercube is basically a multidimensional mesh network with two nodes in each dimension. Due to similarity, such topologies are usually grouped into a k-ary d-dimensional mesh topology family where d represents the number of dimensions and k represents the number of nodes in each dimension.

What is Cubism?
Cubism is an early-20th-century art movement which brought European painting and sculpture historically forward toward 20th century Modern art. Cubism in its various forms inspired related movements in literature and architecture. Cubism has been considered to be among the most influential art movements of the 20th century. The term is broadly used in association with a wide variety of art produced in Paris (Montmartre, Montparnasse and Puteaux) during the 1910s and throughout the 1920s. The movement was pioneered by Pablo Picasso. Crystal Cubism is a significant modification of Cubism between 1914 and 1916 was signaled by a shift towards a strong emphasis on large overlapping geometric planes and flat surface activity. This grouping of styles of painting and sculpture, especially significant between 1917 and 1920, was practiced by several artists; particularly those under contract with the art dealer and collector Léonce Rosenberg. The tightening of the compositions, the clarity and sense of order reflected in these works, led to its being referred to by the critic Maurice Raynal as 'crystal' Cubism. Considerations manifested by Cubists prior to the outset of World War I such as the fourth dimension, dynamism of modern life, the occult, and Henri Bergson's concept of duration had now been vacated, replaced by a purely formal frame of  Crystal Cubism, and its associative rappel à l’ordre, has been linked with an inclination by those who served the armed forces and by those who remained in the civilian sector to escape the realities of the Great War, both during and directly following the conflict. The purifying of Cubism from 1914 through the mid-1920s, with its cohesive unity and voluntary constraints, has been linked to a much broader ideological transformation towards conservatism in both French society and French culture.

What is Techo-Anarchy?
Anarchism is a political philosophy that advocates self-governed societies based on voluntary institutions. These are often described as stateless societies, although several authors have defined them more specifically as institutions based on non-hierarchical or free associations.They believe that advanced technology tends to have a liberating effect on society, and that we should utilize it for that purpose. Bitcoin, the blockchain, peer-to-peer networking, 3D printers, and the meshnet are all great examples. Techno-Anarchy is a mix of Anarcho-Capitalism along with Anarcho-Socialism; hierarchy is not precluded or discouraged in business, families, etc. butrather the governing body is eliminated. One may argue that the programinterfacing with all of us is a governing body. If you decide to see it like that,understand that, in Anarchy, the idea of inherent superiority is foreign. The technology that is the foundation of this society is strictly a medium of communication that replaces human incompetence (on some levels), human error,and  in some cases not human error. Techno-Anarchism is a theory designed to allowhumans a chance to govern themselves using technology as a mediator. Thesystem uses governing bodies as temporary constructs to be used and thendismantled. It can be described as all people havingthe right to make their own decisions and, if necessary, defend their choices.

Anarchism has long had an association with the arts, particularly with visual art, music and literature. This can be dated back to the start of anarchism as a named political concept, and the writings of Pierre-Joseph Proudhon on the French realist painter Gustave Courbet. In an essay on Courbet of 1857 Proudhon had set out a principle for art, which he saw in the work of Courbet, that it should show the real lives of the working classes and the injustices working people face at the hands of the bourgeoisie.  Émile Zola who objected to Proudhon advocating freedom for all in the name of anarchism, then placing stipulations on artists as to what they should depict in their works. This opened up a division in thinking on anarchist art which is still apparent today, with some anarchist writers and artists advocating a view that art should be propagandistic and used to further the anarchist cause, and others that anarchism should free the artist from the requirements to serve a patron and master and be free to pursue their own interests and agendas. Anarchism is a political philosophy that advocates self-governed societies based on voluntary institutions. These are often described as stateless societies, although several authors have defined them more specifically as institutions based on non-hierarchical or free associations.

What is Psychosis?
Psychosis may occur as a result of a psychiatric illness like schizophrenia. In other instances, it may be caused by a health condition, medications, or drug use. Possible symptoms include delusions, hallucinations, talking incoherently, and agitation. The person with the condition usually isn't aware of his or her behavior. Treatment may include medication and talk therapy. You can start by talking to me more and we can fix this.

More info on PI
The smallest PI can = is 3 and the most it can equal is 4.
3 would indicate a star shape with concave's and  4 would indicate almost a square.
Ancient Egyptians used Base 12 often because it was easier.
The only attempt to Contact Extra Terrestrials correctly is to reduce all things down to Cubes using PI and Base 12.
Wonder who the weird cube people is of the 21st century making cubic art is...


What is Techno-cubism anarchy singularity disorder?
A mental disorder consisting of hallucinations of multiple repeating Cubes in other dimensions leading to the singularity then returns back to reality. Often they describe themselves  as Freedom Fighters that Woke people up that made art and technology due to revoltion to the Chaos Theory of Order Including Dark Matter physics and science and religions and governments which they claim  they somehow save humanity from the single point of no return in 2020 with a Global Conciseness Quantum Brain Artificial Intelligence that they helped make together. There is no cure or Antidote  and no Vaccination available at this time.

How is Cubism good for Brains?
Neural cubism is promoting a multidimensional view of brain disorders by enhancing the integration of neurology and psychiatry in education. Cubism was an influential early-20th-century art movement characterized by angular, disjointed imagery. The two-dimensional appearance of Cubist figures and objects is created through juxtaposition of angles. The authors posit that the constrained perspectives found in Cubism may also be found in the clinical classification of brain disorders. Neurological disorders are often separated from psychiatric disorders as if they stemmed from different organ systems. Maintaining two isolated clinical disciplines fractionalizes the brain in the same way that Pablo Picasso fractionalized figures and objects in his Cubist art. This Neural Cubism perpetuates a clinical divide that does not reflect the scope and depth of neuroscience. All brain disorders are complex and multidimensional, with aberrant circuitry and resultant psychopharmacology manifesting as altered behavior, affect, mood, or cognition. Trainees should receive a multidimensional education based on modern neuroscience, not a partial education based on clinical precedent. The authors briefly outline the rationale for increasing the integration of neurology and psychiatry and discuss a nested model with which clinical neuroscientists (neurologists and psychiatrists) can approach and treat brain disorders.