Ontological Mathematics
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Author | : Morgue |
Publisher | : |
Total Pages | : 134 |
Release | : 2019-07-11 |
Genre | : |
ISBN | : 9781082506437 |
Ontological mathematics is the rational core of Hyperianism. It's the science of the future that proves the shocking truth that the world is not material but a collective dream, that so-called "matter" is an illusion, and the ultimate reality is a domain of pure mind. This is not a belief but a deductive, mathematical certainty. Ontological Mathematics was originally leaked to the public via a controversial hidden society operating under various pseudonyms. Since then, it has taken the world by storm. Ontological mathematics isn't any one person's idea. It's a new way of thinking that is championed by the greatest thinkers of the age. Nearly 100 books have been written about it by various authors and independent ontological mathematics research groups are appearing around the world. Ontological mathematics and Hyperianism is a global phenomenon.We have made the groundbreaking knowledge of our system available to all by introducing the reader to the foundational concepts of ontological mathematics in an accessible way. This text assumes the reader has only minimal philosophical knowledge, and it is written in such a way that anyone can begin learning the mathematics of our system.Imagine living in a time and place where the Earth is believed to be flat and humans created by a god. Now imagine you discover a book containing many astounding facts of science such as the spheroidal shape of the Earth and evolution. How exciting would that be? As you read the book, your entire perspective of reality would change. Your world would never be the same. This is such a book.You currently exist in a time and place where existence is viewed as material. This book reveals that the world is in fact a shared dream. Ontological mathematics is the study of the mathematical wave nature of existence. This is not a reality of matter, rather, it's a reality mind, of thought. And what is thought? Thoughts are mathematical sinusoidal waves. So ontological mathematics is the study of the mathematical waveforms of mind that make up all of existence and your very being. The spacetime world isn't a material reality at all. It's the Holos, which is a mathematical Fourier projection from a frequency singularity known as the Source.When properly understood and integrated, the information within this text will change your existence forever and elevate you to a new level of consciousness. This is the science of the future that one day soon will be taught in every school throughout the world.You are a Mind. Existence is Thought. The World is a Dream. The Science of the Future is Here.
Author | : Mike Hockney |
Publisher | : Magus Books |
Total Pages | : 735 |
Release | : |
Genre | : Philosophy |
ISBN | : |
This book explains how the entire universe can be created using just two ingredients: nothing at all and the Principle of Sufficient Reason (PSR). Why would you need anything else? Nothing else could do the job. Existence, believe it or not, is just dimensionless mathematical points moving according to the PSR. Come and find out how the PSR accomplishes it.
Author | : Jack Tanner |
Publisher | : Magus Books |
Total Pages | : 382 |
Release | : |
Genre | : Mathematics |
ISBN | : |
Ontological mathematics is the rational and logical explanation of everything. Where did it come from? If you wish to develop a profound understanding of ontological mathematics, the science that will shape the future of the human race, you need to know the context in which it evolved, and how it diverged from scientific materialism. Ontological mathematics is the subject that accomplished what scientific materialism considered impossible. It inserted mind into science, via the most powerful analytic formula in all of mathematics. What went wrong with how scientists think about reality, leading them into systemic error? This is the extraordinary tale of how the ultimate intellectual revolution unfolded in its earliest phase.
Author | : Stewart Shapiro |
Publisher | : Oxford University Press |
Total Pages | : 290 |
Release | : 1997-08-07 |
Genre | : Philosophy |
ISBN | : 0190282525 |
Do numbers, sets, and so forth, exist? What do mathematical statements mean? Are they literally true or false, or do they lack truth values altogether? Addressing questions that have attracted lively debate in recent years, Stewart Shapiro contends that standard realist and antirealist accounts of mathematics are both problematic. As Benacerraf first noted, we are confronted with the following powerful dilemma. The desired continuity between mathematical and, say, scientific language suggests realism, but realism in this context suggests seemingly intractable epistemic problems. As a way out of this dilemma, Shapiro articulates a structuralist approach. On this view, the subject matter of arithmetic, for example, is not a fixed domain of numbers independent of each other, but rather is the natural number structure, the pattern common to any system of objects that has an initial object and successor relation satisfying the induction principle. Using this framework, realism in mathematics can be preserved without troublesome epistemic consequences. Shapiro concludes by showing how a structuralist approach can be applied to wider philosophical questions such as the nature of an "object" and the Quinean nature of ontological commitment. Clear, compelling, and tautly argued, Shapiro's work, noteworthy both in its attempt to develop a full-length structuralist approach to mathematics and to trace its emergence in the history of mathematics, will be of deep interest to both philosophers and mathematicians.
Author | : Mary Leng |
Publisher | : OUP Oxford |
Total Pages | : 288 |
Release | : 2010-04-22 |
Genre | : Philosophy |
ISBN | : 0191576247 |
Mary Leng offers a defense of mathematical fictionalism, according to which we have no reason to believe that there are any mathematical objects. Perhaps the most pressing challenge to mathematical fictionalism is the indispensability argument for the truth of our mathematical theories (and therefore for the existence of the mathematical objects posited by those theories). According to this argument, if we have reason to believe anything, we have reason to believe that the claims of our best empirical theories are (at least approximately) true. But since claims whose truth would require the existence of mathematical objects are indispensable in formulating our best empirical theories, it follows that we have good reason to believe in the mathematical objects posited by those mathematical theories used in empirical science, and therefore to believe that the mathematical theories utilized in empirical science are true. Previous responses to the indispensability argument have focussed on arguing that mathematical assumptions can be dispensed with in formulating our empirical theories. Leng, by contrast, offers an account of the role of mathematics in empirical science according to which the successful use of mathematics in formulating our empirical theories need not rely on the truth of the mathematics utilized.
Author | : Dr. Cody Newman |
Publisher | : Magus Books |
Total Pages | : 57 |
Release | : |
Genre | : Mathematics |
ISBN | : |
There's a new kid on the block, a subject that can revolutionize humanity's understanding of reality, while being completely rational and logical, and scrupulously avoiding faith and mysticism. It's the long-awaited replacement for science. Only one subject can take over from science and that is the subject that is already at the core of science and gives it all of its power and success, namely mathematics. Come inside and discover the extraordinary world of ontological mathematics. Mathematics is not an unreal abstraction. It's real and concrete.
Author | : Brian Henderson-Sellers |
Publisher | : Springer Science & Business Media |
Total Pages | : 111 |
Release | : 2012-06-13 |
Genre | : Computers |
ISBN | : 3642298257 |
Computing as a discipline is maturing rapidly. However, with maturity often comes a plethora of subdisciplines, which, as time progresses, can become isolationist. The subdisciplines of modelling, metamodelling, ontologies and modelling languages within software engineering e.g. have, to some degree, evolved separately and without any underpinning formalisms. Introducing set theory as a consistent underlying formalism, Brian Henderson-Sellers shows how a coherent framework can be developed that clearly links these four, previously separate, areas of software engineering. In particular, he shows how the incorporation of a foundational ontology can be beneficial in resolving a number of controversial issues in conceptual modelling, especially with regard to the perceived differences between linguistic metamodelling and ontological metamodelling. An explicit consideration of domain-specific modelling languages is also included in his mathematical analysis of models, metamodels, ontologies and modelling languages. This encompassing and detailed presentation of the state-of-the-art in modelling approaches mainly aims at researchers in academia and industry. They will find the principled discussion of the various subdisciplines extremely useful, and they may exploit the unifying approach as a starting point for future research.
Author | : Neven Knezevic |
Publisher | : |
Total Pages | : 346 |
Release | : 2019-06-18 |
Genre | : |
ISBN | : 9781074086138 |
Eidomorphism: The World as Math and Representation is a book comprising a total system of philosophical knowledge, encompassing science, religion, mathematics, and logic. Eidomorphism is a synthesis of the philosophies of the Pythagoras, Plotinus, Spinoza, Leibniz, Schopenhauer and Gödel. Eidomorphism proposes a single mathematical substance as a unity of objective form and subjective content, united in unit-point entities outside of space and time. As a philosophical, mathematical, and scientific system and theory of everything, Eidomorphism unites quantum theory with philosophy, biology with psychology, and cosmology with first causes in a single, mathematical system based on the simplest and smallest entities imaginable. No stone is left unturned and no question is left unanswered in this mathematical answer to the riddle of the Philosopher's Stone.
Author | : Ernest Davis |
Publisher | : Springer |
Total Pages | : 374 |
Release | : 2015-11-17 |
Genre | : Mathematics |
ISBN | : 331921473X |
The seventeen thought-provoking and engaging essays in this collection present readers with a wide range of diverse perspectives on the ontology of mathematics. The essays address such questions as: What kind of things are mathematical objects? What kinds of assertions do mathematical statements make? How do people think and speak about mathematics? How does society use mathematics? How have our answers to these questions changed over the last two millennia, and how might they change again in the future? The authors include mathematicians, philosophers, computer scientists, cognitive psychologists, sociologists, educators and mathematical historians; each brings their own expertise and insights to the discussion. Contributors to this volume: Jeremy Avigad Jody Azzouni David H. Bailey David Berlinski Jonathan M. Borwein Ernest Davis Philip J. Davis Donald Gillies Jeremy Gray Jesper Lützen Ursula Martin Kay O’Halloran Alison Pease Steven Piantadosi Lance Rips Micah T. Ross Nathalie Sinclair John Stillwell Hellen Verran
Author | : Burhanuddin Baki |
Publisher | : Bloomsbury Publishing |
Total Pages | : 283 |
Release | : 2014-11-20 |
Genre | : Philosophy |
ISBN | : 1472578716 |
Alain Badiou's Being and Event continues to impact philosophical investigations into the question of Being. By exploring the central role set theory plays in this influential work, Burhanuddin Baki presents the first extended study of Badiou's use of mathematics in Being and Event. Adopting a clear, straightforward approach, Baki gathers together and explains the technical details of the relevant high-level mathematics in Being and Event. He examines Badiou's philosophical framework in close detail, showing exactly how it is 'conditioned' by the technical mathematics. Clarifying the relevant details of Badiou's mathematics, Baki looks at the four core topics Badiou employs from set theory: the formal axiomatic system of ZFC; cardinal and ordinal numbers; Kurt Gödel's concept of constructability; and Cohen's technique of forcing. Baki then rebuilds Badiou's philosophical meditations in relation to their conditioning by the mathematics, paying particular attention to Cohen's forcing, which informs Badiou's analysis of the event. Providing valuable insights into Badiou's philosophy of mathematics, Badiou's Being and Event and the Mathematics of Set Theory offers an excellent commentary and a new reading of Badiou's most complex and important work.