**the algebra of quantions a unifying number system for** - *more specifically if a new number system seems to be needed in physics there is no reason to believe that this system already belongs to our mathematical heritage this observation changes the nature of the problem from finding a unifying number system among the algebras already studied by mathematicians to discovering it ab initio from the requirement that it should lead to a structural merging of quantum mechanics and relativity the solution named algebra of quantions is derived*, **9781420840360 the algebra of quantions by emile grgin** - *the algebra of quantions a unifying number system for quantum mechanics and relativity by grgin emile authorhouse paperback 1420840363 special order direct from the distributor*, **pdf overview of the structural unification of quantum** - *overview of the structural unification of quantum mechanics and relativity using the algebra of quantions reason of calling quantions a number system is the unifying quantum mechanics and*, **unifying quantum mechanics and general relativity** - *wolff m and haselhurst g light and the electron einstein s last question presentation at meeting beyond einstein stanford university 2004 mach e the science of mechanics open court london 1960 einstein a the meaning of relativity princeton university press princeton 1955*, **full text of overview of the structural unification of** - *b quantions a mixed relativity and quantum mechanics object in quantum field theory an important theorem is the cpt theorem this theorem mixes quantum mechan ics and relativity concepts complex conjugation and charge are properties of the quantum theory and parity and time are relativity concepts*, **linear algebra and postulates of quantum mechanics iqst ca** - *2paul dirac 1902 1984 was an english theoretical physicists one of the founders of quantum mechanics 3field is a term from algebra which means a set of elements that satis es certain axioms for both addition and multiplication the sets of rational numbers q real numbers r complex numbers c are examples of elds quantum*, **general relativity and quantum cosmology arxiv** - *abstract we construct a model unifying general relativity and quantum mechanics in a broader structure of noncommutative geometry the geometry in question is that of a transformation groupoid given by the action of a finite group g on a space e*, **the quantal algebra and abstract equations of motion arxiv** - *intrinsic reimannian therefore the algebra of quantions structurally unifies quantum mechanics and general relativity the unnecessary division property of complex numbers was the main road block in uncovering the relativity structure null space time intervals do not have an inverse in the algebra of quantions imposing the unnecessary division property removes relativity from the algebra of quantions forcing us back at using complex numbers*, **mathematical equation unifying paradoxical laws of physics** - *mathematical equation unifying paradoxical laws of physics published in 2013 quantum mechanics general relativity doesn t apply at the quantum level hence a seeming paradox universal intelligence is easily accessed by posing a question and waiting for the answer to reveal itself*, **the octonion math that could underpin physics quanta** - *as numbers go the familiar real numbers those found on the number line like 1 and 83 777 just get things started real numbers can be paired up in a particular way to form complex numbers first studied in 16th century italy that behave like coordinates on a 2 d plane*, **overview of the structural unification of quantum** - *this structure is the algebra of quantions a non division algebra that is the natural framework for electroweak theory on curved space time similar with quaternions quantions preserve the core features of associativity and complex conjugation while giving up the unnecessarily historically biased property of division*, **1264 questions in quantum mechanics science topic** - *version 2 0 the question of the nature or ontological status of fundamental physics theories such as spacetime in special and general relativity and quantum mechanics have been each a*, **noncommutative unification of general relativity and** - *we construct a model unifying general relativity and quantum mechanics in a broader structure of noncommutative geometry the geometry in question is that of a transformation groupoid given by the action of a finite group on a space e*, **why can t einstein and quantum mechanics get along io9** - *quantum mechanics and relativity typically operate on vastly different scales quantum mechanics for instance was unknown to science for so long because it normally becomes important only on the*, **general relativity and quantum cosmology scirate com** - *various theories that aim at unifying gravity with quantum mechanics suggest modifications of the heisenberg algebra for position and momentum from the perspective of quantum mechanics such modifications lead to new uncertainty relations which are thought but not proven to imply the existence of a minimal observable length*