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We are all captivated and puzzled by the infinite, in its many varied guises; by the endlessness of space and time; by the thought that between any two points in space, however close, there is always another; by the fact that numbers go on forever; and by the idea of an all-knowing, all-powerful God. In this acclaimed introduction to the infinite, A. W. Moore takes us on a journey back to early Greek thought about the infinite, from its inception to Aristotle. He then examines medieval and early modern conceptions of the infinite, including a brief history of the calculus, before turning to Kant and post-Kantian ideas. He also gives an account of Cantor's remarkable discovery that some infinities are bigger than others. In the second part of the book, Moore develops his own views, drawing on technical advances in the mathematics of the infinite, including the celebrated theorems of Skolem and Goedel, and deriving inspiration from Wittgenstein. He concludes this part with a discussion of death and human finitude. For this third edition Moore has added a new part, `Infinity superseded', which contains two new chapters refining his own ideas through a re-examination of the ideas of Spinoza, Hegel, and Nietzsche. This new part is heavily influenced by the work of Deleuze. Also new for the third edition are: a technical appendix on still unresolved questions about different infinite sizes; an expanded glossary; and updated references and further reading. The Infinite, Third Edition is ideal reading for anyone interested in an engaging and historically informed account of this fascinating topic, whether from a philosophical point of view, a mathematical point of view, or a religious point of view.

Metaphysics --- Infinite. --- Infini. --- Infinite

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Inequalities (Mathematics) --- Processes, Infinite

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Infinite matrices --- Matrices.

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This work presents Leibniz's view of infinity and the central role it plays in his theory of living beings. Chapter 1 introduces Leibniz's approach to infinity by presenting the central concepts he employs; chapter 2 presents the historical background through Leibniz's encounters with Galileo and Descartes, exposing a tension between the notions of an infinite number and of an infinite being; chapter 3 argues that Leibniz's solution to this tension, developed through his encounter with Spinoza (circa 1676), consists of distinguishing between a quantitative and a non-quantitative use of infinity, and an intermediate degree of infinity - a maximum in its kind, which sheds light on Leibniz's use of infinity as a defining mark of living beings; chapter 4 examines the connection between infinity and unity; chapter 5 presents the development of Leibniz's views on infinity and life; chapter 6 explores Leibniz's distinction between artificial and natural machines; chapter 7 focuses on Leibniz's image of a living mirror, contrasting it with Pascal's image of a mite; chapter 8 argues that Leibniz understands creatures as infinite and limited, or as infinite in their own kind, in distinction from the absolute infinity of God; chapter 9 argues that Leibniz's concept of a monad holds at every level of reality; chapter 10 compares Leibniz's use of life and primitive force. The conclusion presents Leibniz's program of infusing life into every aspect of nature as an attempt to re-enchant a view of nature left disenchanted by Descartes and Spinoza --

Infinite. --- Leibniz, Gottfried Wilhelm,

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This licentiate thesis by John Karlsson provides an introduction to the theory of infinite dimensional stochastic processes, focusing on processes with unbounded diffusion. It aims to extend results from finite dimensional theories to infinite dimensions through the use of specific mathematical forms, namely Dirichlet forms. The work is geared towards readers new to the subject and includes foundational theory necessary for understanding the paper included within the thesis. It explores properties such as closability and the existence of local moments, with potential applications in theoretical physics.

Infinite-dimensional manifolds. --- Stochastic processes. --- Infinite-dimensional manifolds --- Stochastic processes