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n to Global Scaling Theory Continued from page 52 quantum mechanical phenomena, but consti- Editor's Note: tutes the basis for a totally new telecommu- if readers none barista figures fusion and nuclear decay. It is the cause of _ nications technology which was publicly Pee ee Ou Soa eS SeCHOn, -_ ; Penner - : these can be accounted by allowing for the topological three-dimensionality of lin- demonstrated for the first time on 27 recurring numbers ear space, of left-right asymmetry as well as October 2001 in Bad Télz, Germany. , of anisotropy of time. All of these phenom- G-Com® technology is still in its infancy References ena are physical effects which arise at the (a first language modulation succeeded in __ + For more information on Global Scaling transition from logarithmic into linear space. July 2001), but in two important aspects itis | Theory, see raumé&zeit, Special No. 1, ISBN 3- a already far superior to any other convention- _934-196-17-9, and visit the website Neighbours in Logarithmic Space al means of information transmission. _ http://www.raum-und-zeit.de/. . The standing wave in logarithmic space + A good introduction to Global Scaling Theory now allows us to communicate across astro- ave can be demodulated in any locationon 8 at http://www. globalscalingtheory.com/. nomical distances, practically without time arth on the planet Mars, or even outside Cislenko, L.L. (1980), Structure of Fauna and delay. How is this possible? Systems in lin- > P. ” a Flora with Regard to Body Size of Organisms ° aye . * that li TS possi: iy fron veach the solar system at the very same moment in (jn Russian), Lomonosov University Press, ear space that lie very remote y trom each time, thus making distances and transmis- Moscow, http://www.raum-energie- other can be very close to each other within sion times meaningless. Secondly, no _ forschung.de/ he logarithmic space of scales. Our Sun | ee oo. | conhy " “ati t . : waves are generated or transmitted, which is _* Euler, Leonhard (1748), "Sur la vibration des and Alpha Centauri are four light-years why G-Com technology does not require cordes", Mem. de l'Accad. Sci. Berlin 4:69-85. away from each other in linear space, while aerials, satellites, amplifiers or converters. * Gantmacher, F.R. and M.G. Krein (1960), in the logarithmic space of scales they are This launch 2. a of telec . "Oszillationsmatrizen, Oszillationskerne und immediate neighbours. Once this is under- 1s Tauncnes a new era of telecommunt= sations—free fi lectric s kleine Schwingungen mechanischer Systeme", stood, it's not too difficult to create the phys- C@'ONS—iTee trom eleciric smog. °° Akademie Verlag Berlin. Firstly, a modulated standing gravitational fusion and nuclear decay. It is the cause of the topological three-dimensionality of lin- ear space, of left-right asymmetry as well as of anisotropy of time. All of these phenom- ena are physical effects which arise at the transition from logarithmic into linear space. References + For more information on Global Scaling Theory, see raum&zeit, Special No. 1, ISBN 3- 934-196-17-9, and visit the website http://www.raum-und-zeit.de/. ¢ A good introduction to Global Scaling Theory is at http://www.globalscalingtheory.com/. * Cislenko, L.L. (1980), Structure of Fauna and Flora with Regard to Body Size of Organisms (in Russian), Lomonosov University Press, Moscow, http://www.raum-energie- forschung.de/ . * Euler, Leonhard (1748), "Sur la vibration des cordes", Mem. de l'Accad. Sci. Berlin 4:69-85. * Gantmacher, F.R. and M.G. Krein (1960), "Oszillationsmatrizen, Oszillationskerne und Kleine Schwingungen mechanischer Systeme", Akademie Verlag Berlin. ¢ Miller, Hartmut (1982), "Die Skaleninvarianz physikalischer GréBen stabiler Systeme als globales Evolutionsgesetz", Biophysikalischer Allunionskongress, Band 2, Pushzino bei Moskau. * Waser, Andre, "The Global Scaling Theory: A short summary", 2001, revised 2004, http://www. global-scaling.ch. Neighbours in Logarithmic Space The standing wave in logarithmic space now allows us to communicate across astro- nomical distances, practically without time delay. How is this possible? Systems in lin- ear space that lie very remotely from each other can be very close to each other within the logarithmic space of scales. Our Sun and Alpha Centauri are four light-years away from each other in linear space, while in the logarithmic space of scales they are immediate neighbours. Once this is under- stood, it's not too difficult to create the phys- ical conditions that will make communica- tion in logarithmic space possible. Two electrons on the same quantum level that may be thousands of kilometres apart are found in practically one and the same point within the logarithmic space of scales. The fact explains not just a whole range of About the Author: Dr rer. nat. Hartmut Miller is Director of the Institute for Space Energy Research i.m. Leonard Euler (Institut fiir Raum-Energie- Forschung, IREF) in Wolfratshausen, Germany. For more info, see IREF's website at http:/www.raum-energie-forschung.de. 82 = NEXUS www.nexusmagazine.com AUGUST - SEPTEMBER 2004