Author : Hao Wang
Publisher : Courier Corporation
Page : 290 pages
File Size : 42,72 MB
Release : 2014-09-22
Category : Mathematics
ISBN : 0486171043
Noted logician discusses both theoretical underpinnings and practical applications, exploring set theory, model theory, recursion theory and constructivism, proof theory, logic's relation to computer science, and other subjects. 1981 edition, reissued by Dover in 1993 with a new Postscript by the author.
Author : Georg Wilhelm Friedrich Hegel
Publisher :
Page : 586 pages
File Size : 40,4 MB
Release : 1902
Category : History
ISBN :
Author : Immanuel Kant
Publisher : Cambridge University Press
Page : 740 pages
File Size : 32,6 MB
Release : 2004-09-13
Category : Philosophy
ISBN : 9780521546911
Table of contents
Author :
Publisher : Allied Publishers
Page : 436 pages
File Size : 22,10 MB
Release : 2013
Category :
ISBN : 9788177644517
Probability theory
Author : Eugenia Cheng
Publisher : Basic Books
Page : 296 pages
File Size : 36,58 MB
Release : 2018-09-11
Category : Mathematics
ISBN : 154167250X
How both logical and emotional reasoning can help us live better in our post-truth world In a world where fake news stories change election outcomes, has rationality become futile? In The Art of Logic in an Illogical World, Eugenia Cheng throws a lifeline to readers drowning in the illogic of contemporary life. Cheng is a mathematician, so she knows how to make an airtight argument. But even for her, logic sometimes falls prey to emotion, which is why she still fears flying and eats more cookies than she should. If a mathematician can't be logical, what are we to do? In this book, Cheng reveals the inner workings and limitations of logic, and explains why alogic -- for example, emotion -- is vital to how we think and communicate. Cheng shows us how to use logic and alogic together to navigate a world awash in bigotry, mansplaining, and manipulative memes. Insightful, useful, and funny, this essential book is for anyone who wants to think more clearly.
Author : William J. Eccles
Publisher : Morgan & Claypool Publishers
Page : 220 pages
File Size : 36,78 MB
Release : 2007-06-01
Category : Technology & Engineering
ISBN : 1598291939
Pragmatic Logic presents the analysis and design of digital logic systems. The author begins with a brief study of binary and hexadecimal number systems and then looks at the basics of Boolean algebra. The study of logic circuits is divided into two parts, combinational logic, which has no memory, and sequential logic, which does. Numerous examples highlight the principles being presented. The text ends with an introduction to digital logic design using Verilog, a hardware description language. The chapter on Verilog can be studied along with the other chapters in the text. After the reader has completed combinational logic in Chapters 4 and 5, sections 9.1 and 9.2 would be appropriate. Similarly, the rest of Chapter 9 could be studied after completing sequential logic in Chapters 6 and 7. This short lecture book will be of use to students at any level of electrical or computer engineering and for practicing engineers or scientists in any field looking for a practical and applied introduction to digital logic. The author's "pragmatic" and applied style gives a unique and helpful "non-idealist, practical, opinionated" introduction to digital systems.
Author : Charles Sanders Peirce
Publisher : Harvard University Press
Page : 318 pages
File Size : 38,21 MB
Release : 1992
Category : Philosophy
ISBN : 9780674749672
Charles Sanders Peirce (1839-1914) was an American philosopher, physicist, mathematician and founder of pragmatism. This book provides readers with philosopher's only known, complete account of his own work. It comprises a series of lectures given in Cambridge, Massachusetts in 1898.
Author : J. -M. Kuczynski
Publisher :
Page : 159 pages
File Size : 11,78 MB
Release : 2017-03-08
Category :
ISBN : 9781520785882
Clear answers are given to important questions in both theoretical and applied logic. The writing is cogent and straightforward. Table of Contents: 30 Principles of LogicBoolean Algebra as the Basis of Mathematical Logic Trilingual Logic 101 Principles of Logic Different kinds of Mathematical Functions: A Dialogue Fucntions, Bijections and Mapping-relations Logic and Formal TruthRelations and Ordinal Numbers Nine Kinds of NumberCausalityAnalyticity Is Mind an Emergent Property?Is Time-travel Possible?What is a Formal Language? Logic and Inference
Author : Genesereth Michael
Publisher : Springer Nature
Page : 155 pages
File Size : 14,61 MB
Release : 2013-08-16
Category : Mathematics
ISBN : 3031017994
This book is a gentle but rigorous introduction to Formal Logic. It is intended primarily for use at the college level. However, it can also be used for advanced secondary school students, and it can be used at the start of graduate school for those who have not yet seen the material. The approach to teaching logic used here emerged from more than 20 years of teaching logic to students at Stanford University and from teaching logic to tens of thousands of others via online courses on the World Wide Web. The approach differs from that taken by other books in logic in two essential ways, one having to do with content, the other with form. Like many other books on logic, this one covers logical syntax and semantics and proof theory plus induction. However, unlike other books, this book begins with Herbrand semantics rather than the more traditional Tarskian semantics. This approach makes the material considerably easier for students to understand and leaves them with a deeper understanding of what logic is all about. In addition to this text, there are online exercises (with automated grading), online logic tools and applications, online videos of lectures, and an online forum for discussion. They are available at logic.stanford.edu/intrologic/
Author : Jean-Yves Girard
Publisher : European Mathematical Society
Page : 554 pages
File Size : 32,17 MB
Release : 2011
Category : Logic
ISBN : 9783037190883
These lectures on logic, more specifically proof theory, are basically intended for postgraduate students and researchers in logic. The question at stake is the nature of mathematical knowledge and the difference between a question and an answer, i.e., the implicit and the explicit. The problem is delicate mathematically and philosophically as well: the relation between a question and its answer is a sort of equality where one side is ``more equal than the other'': one thus discovers essentialist blind spots. Starting with Godel's paradox (1931)--so to speak, the incompleteness of answers with respect to questions--the book proceeds with paradigms inherited from Gentzen's cut-elimination (1935). Various settings are studied: sequent calculus, natural deduction, lambda calculi, category-theoretic composition, up to geometry of interaction (GoI), all devoted to explicitation, which eventually amounts to inverting an operator in a von Neumann algebra. Mathematical language is usually described as referring to a preexisting reality. Logical operations can be given an alternative procedural meaning: typically, the operators involved in GoI are invertible, not because they are constructed according to the book, but because logical rules are those ensuring invertibility. Similarly, the durability of truth should not be taken for granted: one should distinguish between imperfect (perennial) and perfect modes. The procedural explanation of the infinite thus identifies it with the unfinished, i.e., the perennial. But is perenniality perennial? This questioning yields a possible logical explanation for algorithmic complexity. This highly original course on logic by one of the world's leading proof theorists challenges mathematicians, computer scientists, physicists, and philosophers to rethink their views and concepts on the nature of mathematical knowledge in an exceptionally profound way.
