
"The
Universe is a thought of the Deity. Since this ideal thoughtform has overflowed into actuality, and the world
born thereof has realized the plan of its creator, it is the calling of all thinking beings to rediscover in
this existent whole the original design."
Friedrich
Schiller

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 The outer and inner forms of the Tree of Life, the Platonic solids, the I Ching table of 64 hexagrams, the Sri Yantra, the disdyakis triacontahedron and the polychorons are shown to be equivalent representations of holistic systems and to embody the physics of superstrings as remote viewed by Annie Besant and C.W. Leadbeater.
 www.smphillips.8m.com
 Articles
 HTML and PDF articles.
 www.smphillips.8m.com/articles.html
 Web
 List of research articles as web pages.
 www.smphillips.8m.com/web.html
 PDF
 List of research articles as PDFs.
 www.smphillips.8m.com/pdf.html
 Sacred geometry
 Sacred geometries are the outer and inner Trees of Life, the Sri Yantra and the polyhedral Tree of Life composed of the 144 Polyhedron and the disdyakis triacontahedron. They are isomorphic to the 64 hexagrams in the I Ching.
 www.smphillips.8m.com/sacredgeometry.html
 Polyhedral Tree of Life
 How the polyhedral Tree of Life is encoded in the outer & inner Tree of Life and is isomorphic to the 64 hexagrams of the I Ching and to the Sri Yantra.
 www.smphillips.8m.com/polyhedraltreeoflife.html
 Correspondences
 The inner Tree of Life, Platonic solids, Sri Yantra and disdyakis triacontahedron are proved to be equivalent representations of holistic systems.
 www.smphillips.8m.com/correspondences.html
 The holistic pattern
 The basic holistic patterns within sacred geometries are analyzed.
 www.smphillips.8m.com/theholisticpattern.html
 Maps of reality
 The inner Tree of Life encodes the Cosmic Tree of Life. The Platonic solids, the Sri Yantra and the disdyakis triacontahedron are shown to be equivalent maps of the spiritual cosmos.
 www.smphillips.8m.com/mapsofreality.html
 Platonic solids
 The five Platonic solids are shown to be equivalent to the Cosmic Tree of Life as a map of the spiritual cosmos.
 www.smphillips.8m.com/platonicsolids.html
 Superstrings as sacred geometry
 How the E8xE8 heterotic superstring is encoded in the sacred geometry of the outer & inner Trees of Life, the Sri Yantra, the disdyakis triacontahedron and in the hexagrams of the I Ching.
 www.smphillips.8m.com/superstringsassacredgeometry.html
 Platonic solids
 Superstring dynamics & structure are encoded in the sacred geometry of the Platonic solids.
 www.smphillips.8m.com/platonicsolid.html
 Disdyakis triacontahedron
 The disdyakis triacontahedron encodes the heterotic superstring according to the micropsi description of the UPA published in Occult Chemistry.
 www.smphillips.8m.com/thedisdyakistriacontahedron.html
 4d sacred geometries
 The six polychorons and the 421 polytope are analysed in the context of superstring theory and the UPA.
 www.smphillips.8m.com/4dsacredgeometries.html
 Plato's Lambda
 Plato's Lambda, its generalisation and its equivalence to sacred geometries.
 www.smphillips.8m.com/plato'slambda.html
 Wonders of sacred geometry
 Spectacular examples of properties of sacred geometries that are indicative of divine intelligence.
 www.smphillips.8m.com/wondersofsacredgeometry.html
 Correspondence
 Correspondences between the Tree of Life, Sri Yantra, I Ching table, Platonic solids and the disdyakis triacontahedron.
 www.smphillips.8m.com/correspondence.html
 Superstrings
 How sacred geometries embody the dynamics and structure of superstrings.
 www.smphillips.8m.com/superstrings.html
 Miscellaneous
 Miscellaneous properties of sacred geometries.
 www.smphillips.8m.com/miscellaneous.html
 Wonders of correspondences
 Details of correspondences between sacred geometries.
 www.smphillips.8m.com/wondersofcorrespondences.html
 Wonders of superstrings
 How sacred geometries embody superstring structure and dynamics.
 www.smphillips.8m.com/wondersofsuperstrings.html
 Miscellaneous wonders
 Miscellanous wonders of sacred geometry.
 www.smphillips.8m.com/miscellaneouswonders.html
 Sacred art gallery
 Gallery of sacred geometrical art for sale.
 www.smphillips.8m.com/sacredartgallery.html
 My slideshows
 Five sets of PowerPoint slideshows available for purchase and download.
 www.smphillips.8m.com/myslideshows.html
 New book
 Description of Stephen Phillips' new book.
 www.smphillips.8m.com/newbook.html
 Article 1
 A Tetrad Principle is formulated that reveals the Pythagorean nature of the parameters determining superstring and bosonic string theories.
 www.smphillips.8m.com/article1.html
 Article 2
 The Theosophists' "physical plane" is related to 26dimensional spacetime and etheric matter is identified as the shadow matter predicted by E8xE8 heterotic superstring theory.
 www.smphillips.8m.com/article2.html
 Article 3
 The true nature of the sacred geometry of the five Platonic solids is revealed.
 www.smphillips.8m.com/article3.html
 Article 8
 The first four polygons of the iner Tree of Life encode superstring structural parameters.
 www.smphillips.8m.com/article08.htm
 Article 11
 The meaning of Plato's Lambda and its equivalence to the Tree of Life.
 www.smphillips.8m.com/article11.htm
 Article 12
 The tetrahedral generalisation of Plato's Lambda Tetractys is described.
 www.smphillips.8m.com/article12.htm
 Article 13
 An analogy is explored between the ten whorls of the superstring and the musical potential of a 10stringed harp.
 www.smphillips.8m.com/article13.htm
 Article 17
 The TitiusBode law is generalised in order to include Neptune and Pluto. An octet pattern appears that is analogous to the octets of electrons in atoms, baryons & mesons, the notes of the octave and the eight unit octonions.
 www.smphillips.8m.com/article17.html
 Article 24
 The faces of the 28 polyhedra contained in the disdyakis triacontahedron as the polyhedral Tree of Life contain 3360 hexagonal yods/ They denote the number of oscillatory waves in the ten whorls of the E8xE8 heterotic superstring described by Annie Besant and C.W. Leadbeater.
 www.smphillips.8m.com/article24.html
 Article 25
 The 33 layers of vertices of the disdyakis triacontahedron correspond to the 33 tree levels of ten overlapping Trees of Life.
 www.smphillips.8m.com/article25.html
 Article 26
 It is shown that the disdyakis triacontahedron is a geometrical counterpart of the intervals between the notes in the seven musical scales.
 www.smphillips.8m.com/article26.html
 Article 28
 The inner Tree of Life and the disdyakis triacontahedron encode the roots of the superstring gauge symmetry group E8.
 www.smphillips.8m.com/article28.html
 Article 29
 The triakis tetrahedron and the disdyakis triacontahedron embody the finestructure constant number 137.
 www.smphillips.8m.com/article29.html
 Article 30
 The triakis tetrahedron, the disdyakis triacontahedron and Plato's Lambda tetractys are shown to be equivalent.
 www.smphillips.8m.com/article30.html
 Article 31
 The composition of intervals in the eight church modes is related to the polyhedral Tree of Life.
 www.smphillips.8m.com/article31.html
 Article 40 (Part 2)
 The sacred geometries of the Tree of Life, the Sri Yantra, the I Ching table and the disdyakis triacontahedron are shown to be equivalent.
 www.smphillips.8m.com/article40(part2).htm
 Article 40 (Part 3)
 The sacred geometries of the Tree of Life, the Sri Yantra, the I Ching table and the disdyakis triacontahedron are shown to be equivalent.
 www.smphillips.8m.com/article40(part3).html
 Article 40 (Part 4)
 The sacred geometries of the Tree of Life, the Sri Yantra, the I Ching table and the disdyakis triacontahedron are shown to be equivalent.
 www.smphillips.8m.com/article40(part4).html
 Article 41
 When the polygons of the inner Tree of Life are regarded as the bases of pyramids, the latter encode the superstring structural parameters 336 and 16800. They also encode the bones of the human body.
 www.smphillips.8m.com/article41.htm
 Article 42
 The eight Church musical modes are compared with the human skeleton as holistic systems.
 www.smphillips.8m.com/article42.html
 Article 43
 The 168 automorphisms of the Klein quartic tessellated on the 3torus are shown to have a Tree of Life nature.
 www.smphillips.8m.com/article43.html
 Article 47 (Part 1)
 The polyhedral Tree of Life is encoded in its polygonal counterpart.
 www.smphillips.8m.com/article47(part1).html
 Article 47 (Part 2)
 Sacred geometries encode structural/dynamical properties of the E8xE8 heterotic superstring and the codon pattern of DNA.
 www.smphillips.8m.com/article47(part2).html
 Article 49
 Different sacred geometries are equivalent representations of all levels of reality.
 www.smphillips.8m.com/article49.html
 Article 50 (Part 1)
 How the Golden Ratio, Fibonacci & Lucas numbers appear in sacred geometries.
 www.smphillips.8m.com/article50(part1).htm
 Article 50 (Part 2)
 The Golden Ratio, Lucas and Fibonacci numbers in sacred geometries.
 www.smphillips.8m.com/article50(part2).htm
 Article 51
 The connection between Fibonacci numbers and the Pythagorean musical scale is analogous to how they appear in the Platonic solids and other sacred geometries.
 www.smphillips.8m.com/article51.html
 Article 53
 Four sacred geometries  the inner Tree of Life, the first three Platonic solids, the Sri Yantra & the disdyakis triacontahedron  are shown to have a 10x24 division that manifests as the UPA/subquark state of the E8xE8 heterotic superstring.
 www.smphillips.8m.com/article53.html
 Article 55
 The five Platonic solids embody the five exceptional groups G2, F4, E6, E7 & E8.
 www.smphillips.8m.com/article55.html
 Article 56
 The tetractys generates the universal pattern of sacred geometries.
 www.smphillips.8m.com/article56.html
 Article 59
 The geometrical and yod composition of the three polygons absent from the inner Tree of Life are shown to embody the root structure of E8 and E8xE8 describing one of the two types of heterotic superstrings.
 www.smphillips.8m.com/article59.html
 Article 61
 Tree of Life basis of an astrological era.
 www.smphillips.8m.com/article61.html
 Article 62
 The two 600cells in the 421 polytope embody the paranormally obtained superstring structural parameters 1680 and 16800.
 www.smphillips.8m.com/article62.html
 Article 63
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/i_fe7a62cfaef05e54.html
 Slide 2
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img1.html
 Slide 3
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img2.html
 Slide 4
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img3.html
 Slide 5
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img4.html
 Slide 6
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img5.html
 Slide 7
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img6.html
 Slide 8
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img7.html
 Slide 9
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img8.html
 Slide 10
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img9.html
 Slide 11
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img10.html
 Slide 12
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img11.html
 Slide 13
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img12.html
 Slide 14
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img13.html
 Slide 15
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img14.html
 Slide 16
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img15.html
 Slide 17
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img16.html
 Slide 18
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img17.html
 Slide 19
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img18.html
 Slide 20
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img19.html
 Slide 21
 Sacred geometries embody the number of edges of the 421 polytope whose 240 vertices define the 240 root vectors of the exceptional Lie group E8.
 www.smphillips.8m.com/img20.html
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