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The Blind Spot: Lectures on Logic
 
Jean-Yves Girard Institut de Mathématiques de Luminy, Marseille, France
A publication of European Mathematical Society
The Blind Spot
Hardcover ISBN:  978-3-03719-088-3
Product Code:  EMSTBS
List Price: $98.00
AMS Member Price: $78.40
Please note AMS points can not be used for this product
The Blind Spot
Click above image for expanded view
The Blind Spot: Lectures on Logic
Jean-Yves Girard Institut de Mathématiques de Luminy, Marseille, France
A publication of European Mathematical Society
Hardcover ISBN:  978-3-03719-088-3
Product Code:  EMSTBS
List Price: $98.00
AMS Member Price: $78.40
Please note AMS points can not be used for this product
  • Book Details
     
     
    2011; 550 pp
    MSC: Primary 03; 18; 68

    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 Gödel'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.

    A publication of the European Mathematical Society (EMS). Distributed within the Americas by the American Mathematical Society.

    Readership

    Postgraduate students and research mathematicians interested in logic and proof theory.

  • Requests
     
     
    Review Copy – for publishers of book reviews
    Accessibility – to request an alternate format of an AMS title
2011; 550 pp
MSC: Primary 03; 18; 68

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 Gödel'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.

A publication of the European Mathematical Society (EMS). Distributed within the Americas by the American Mathematical Society.

Readership

Postgraduate students and research mathematicians interested in logic and proof theory.

Review Copy – for publishers of book reviews
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.