The Resource Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource)
Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource)
Resource Information
The item Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource) represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in Massey University Library, University of New Zealand.This item is available to borrow from 1 library branch.
Resource Information
The item Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource) represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in Massey University Library, University of New Zealand.
This item is available to borrow from 1 library branch.
 Summary
 This book identifies the organizing concepts of physical and biological phenomena by an analysis of the foundations of mathematics and physics. Our aim is to propose a dialog between different conceptual universes and thus to provide a unification of phenomena. The role of "order" and symmetries in the foundations of mathematics is linked to the main invariants and principles, among them the geodesic principle (a consequence of symmetries), which govern and confer unity to various physical theories. Moreover, an attempt is made to understand causal structures, a central element of physical intelligibility, in terms of both symmetries and symmetry breakings. A distinction between the principles of (conceptual) construction and of proofs, both in physics and in mathematics guides most of the work. The importance of mathematical tools is also highlighted to clarify differences in the models for physics and biology that are proposed by continuous and discrete mathematics, such as computational simulations. Since biology is particularly complex and not as well understood at a theoretical level, we propose a "unification by concepts" which in any case should precede mathematization. This constitutes an outline for unification also based on highlighting conceptual differences, complex points of passage and technical irreducibilities of one field to another. Indeed, we suppose here a very common monist point of view, namely the view that living objects are "big bags of molecules". The main question though is to understand which "theory" can help better understand these bags of molecules. They are, indeed, rather "singular", from the physical point of view. Technically, we express this singularity through the concept of "extended criticality", which provides a logical extension of the critical transitions that are known in physics. The presentation is mostly kept at an informal and conceptual level
 Language
 eng
 Extent
 1 online resource (xvii, 318 pages)
 Contents

 The genesis of mathematical structures and of their relationships  a few conceptual analogies
 1.1.3.
 Formalization, calculation, meaning, subjectivity
 1.1.4.
 Between cognition and history: Towards new structures of intelligibility
 1.2.
 Mathematical Concepts: A Constructive Approach
 1.2.1.
 Genealogies of concepts
 1.2.2.
 Machine generated contents note:
 The "transcendent" in physics and in mathematics
 1.2.3.
 Laws, structures, and foundations
 1.2.4.
 Subject and objectivity
 1.2.5.
 From intuitionism to a renewed constructivism
 1.3.
 Regarding Mathematical Concepts and Physical Objects
 1.3.1.
 1.
 "Friction" and the determination of physical objects
 1.3.2.
 The absolute and the relative in mathematics and in physics
 1.3.3.
 On the two functions of language within the process of objectification and the construction of mathematical models in physics
 Mathematical Concepts and Physical Objects
 1.1.
 On the Foundations of Mathematics. A First Inquiry
 1.1.1.
 Terminological issues?
 1.1.2.
 2.1.
 The Cognitive Foundations of Mathematics: Human Gestures in Proofs and Mathematical Incompleteness of Formalisms
 2.1.1.
 Introduction
 2.1.2.
 Machines, body, and rationality
 2.1.3.
 Ameba, motivity, and signification
 2.1.4.
 The abstract and the symbolic; the rigor
 1.3.4.
 2.1.5.
 From the Platonist response to action and gesture
 2.1.6.
 Intuition, gestures, and the numeric line
 2.1.7.
 Mathematical incompleteness of formalisms
 2.1.8.
 Iterations and closures on the horizon
 2.1.9.
 Intuition
 From the relativity to reference universes to that of these universes themselves as generators of physical invariances
 2.1.10.
 Body gestures and the "cogito"
 2.1.11.
 Summary and conclusion of part 2.1
 2.2.
 Incompleteness, Uncertainty, and Infinity: Differences and Similarities Between Physics and Mathematics
 2.2.1.
 Completeness/incompleteness in physical theories
 2.2.2.
 Finite/infinite in mathematics and physics
 1.3.5.
 Physical causality and mathematical symmetry
 1.3.6.
 Towards the "cognitive subject"
 2.
 Incompleteness and Indetermination in Mathematics and Physics
 3.1.3.
 Some epistemological remarks
 3.2.
 Towards Biology: Space and Time in the "Field" of Living Systems
 3.2.1.
 The time of life
 3.2.2.
 More on Biological time
 3.2.3.
 Dynamics of the selfconstitution of living systems
 3.
 3.2.4.
 Morphogenesis
 3.2.5.
 Information and geometric structure
 3.3.
 Spatiotemporal Determination and Biology
 3.3.1.
 Biological aspects
 3.3.2.
 Space: Laws of scaling and of critical behavior. The geometry of biological functions
 Space and Time from Physics to Biology
 3.3.3.
 Three types of time
 3.3.4.
 Epistemological and mathematical aspects
 3.3.5.
 Some philosophy, to conclude
 4.
 Invariances, Symmetries, and Symmetry Breakings
 4.1.
 A Major Structuring Principle of Physics: The Geodesic Principle
 3.1.
 4.1.1.
 The physicomathematical conceptual frame
 An Introduction to the Space and Time of Modern Physics
 3.1.1.
 Taking leave of Laplace
 3.1.2.
 Three types of physical theory: Relativity, quantum physics, and the theory of critical transitions in dynamical systems
 4.3.1.
 A few abstract invariances in biology: Homology, analogy, allometry
 4.3.2.
 Comments regarding the relationships between invariances and the conditions of possibility for life
 4.4.
 About the Possible Recategorizations of the Notions of Space and Time under the Current State of the Natural Sciences
 5.
 Causes and Symmetries: The Continuum and the Discrete in Mathematical Modeling
 5.1.
 Causal Structures and Symmetries, in Physics
 4.2.
 5.1.1.
 Symmetries as starting point for intelligibility
 5.1.2.
 Time and causality in physics
 5.1.3.
 Symmetry breaking and fabrics of interaction
 5.2.
 From the Continuum to the Discrete
 5.2.1.
 Computer science and the philosophy of arithmetic
 On the Role of Symmetries and of Their Breakings: From Description to Determination
 5.2.2.
 Laplace, digital rounding, and iteration
 4.2.1.
 Symmetries, symmetry breaking, and logic
 4.2.2.
 Symmetries, symmetry breaking, and determination of physical reality
 4.3.
 Invariance and Variability in Biology
 5.3.2.
 On contingent finality
 5.3.3.
 "Causal" dynamics: Development, maturity, aging, death
 5.3.4.
 Invariants of causal reduction in biology
 5.3.5.
 A few comments and comparisons with physics
 5.4.
 Synthesis and Conclusion
 5.2.3.
 6.
 Extended Criticality: The Physical Singularity of Life Phenomena
 6.1.
 On Singularities and Criticality in Physics
 6.1.1.
 From gas to crystal
 6.1.2.
 From the local to the global
 6.1.3.
 Phase transitions in selforganized criticality and "order for free"
 Iteration and prediction
 6.2.
 Life as "Extended Critical Situation"
 6.2.1.
 Extended critical situations: General approaches
 6.2.2.
 The extended critical situation: A few precisions and complements
 6.2.3.
 More on the relations to autopoiesis
 6.2.4.
 Summary of the characteristics of the extended critical situation
 5.2.4.
 6.3.
 Integration, Regulation, and Causal Regimes
 6.4.
 Phase Spaces and Their Trajectories
 Rules and the algorithm
 5.3.
 Causalities in Biology
 5.3.1.
 Basic representation
 7.2.
 The Objectivity of Quantum Randomness
 7.2.1.
 Separability vs nonseparability
 7.2.2.
 Possible objections
 7.2.3.
 Final remarks on quantum randomness
 7.3.
 Determination and Continuous Mathematics
 6.5.
 7.4.
 Conclusion: Towards Computability
 8.
 Conclusion: Unification and Separation of Theories, or the Importance of Negative Results
 8.1.
 Foundational Analysis and Knowledge Construction
 8.2.
 The Importance of Negative Results
 8.2.1.
 Changing frames
 Another View on Stability and Variability
 8.3.
 Vitalism and NonRealism
 8.4.
 End and Opening
 6.5.1.
 Biolons as attractors and individual trajectories
 7.
 Randomness and Determination in the Interplay between the Continuum and the Discrete
 7.1.
 Deterministic Chaos and Mathematical Randomness: The Case of Classical Physics
 Isbn
 9781283234542
 Label
 Mathematics and the natural sciences : the physical singularity of life
 Title
 Mathematics and the natural sciences
 Title remainder
 the physical singularity of life
 Statement of responsibility
 Francis Bailly, Giuseppe Longo
 Language
 eng
 Summary
 This book identifies the organizing concepts of physical and biological phenomena by an analysis of the foundations of mathematics and physics. Our aim is to propose a dialog between different conceptual universes and thus to provide a unification of phenomena. The role of "order" and symmetries in the foundations of mathematics is linked to the main invariants and principles, among them the geodesic principle (a consequence of symmetries), which govern and confer unity to various physical theories. Moreover, an attempt is made to understand causal structures, a central element of physical intelligibility, in terms of both symmetries and symmetry breakings. A distinction between the principles of (conceptual) construction and of proofs, both in physics and in mathematics guides most of the work. The importance of mathematical tools is also highlighted to clarify differences in the models for physics and biology that are proposed by continuous and discrete mathematics, such as computational simulations. Since biology is particularly complex and not as well understood at a theoretical level, we propose a "unification by concepts" which in any case should precede mathematization. This constitutes an outline for unification also based on highlighting conceptual differences, complex points of passage and technical irreducibilities of one field to another. Indeed, we suppose here a very common monist point of view, namely the view that living objects are "big bags of molecules". The main question though is to understand which "theory" can help better understand these bags of molecules. They are, indeed, rather "singular", from the physical point of view. Technically, we express this singularity through the concept of "extended criticality", which provides a logical extension of the critical transitions that are known in physics. The presentation is mostly kept at an informal and conceptual level
 http://library.link/vocab/creatorName
 Bailly, Francis
 Dewey number
 510.1
 Index
 index present
 Literary form
 non fiction
 Nature of contents

 dictionaries
 bibliography
 http://library.link/vocab/relatedWorkOrContributorName
 Longo, G.
 Series statement
 Advances in computer science and engineering: texts
 Series volume
 v. 7
 http://library.link/vocab/subjectName

 Mathematics
 Physics
 Biomathematics
 Label
 Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource)
 Antecedent source
 unknown
 Bibliography note
 Includes bibliographical references (pages 299312) and index
 Color
 multicolored
 Contents

 The genesis of mathematical structures and of their relationships  a few conceptual analogies
 1.1.3.
 Formalization, calculation, meaning, subjectivity
 1.1.4.
 Between cognition and history: Towards new structures of intelligibility
 1.2.
 Mathematical Concepts: A Constructive Approach
 1.2.1.
 Genealogies of concepts
 1.2.2.
 Machine generated contents note:
 The "transcendent" in physics and in mathematics
 1.2.3.
 Laws, structures, and foundations
 1.2.4.
 Subject and objectivity
 1.2.5.
 From intuitionism to a renewed constructivism
 1.3.
 Regarding Mathematical Concepts and Physical Objects
 1.3.1.
 1.
 "Friction" and the determination of physical objects
 1.3.2.
 The absolute and the relative in mathematics and in physics
 1.3.3.
 On the two functions of language within the process of objectification and the construction of mathematical models in physics
 Mathematical Concepts and Physical Objects
 1.1.
 On the Foundations of Mathematics. A First Inquiry
 1.1.1.
 Terminological issues?
 1.1.2.
 2.1.
 The Cognitive Foundations of Mathematics: Human Gestures in Proofs and Mathematical Incompleteness of Formalisms
 2.1.1.
 Introduction
 2.1.2.
 Machines, body, and rationality
 2.1.3.
 Ameba, motivity, and signification
 2.1.4.
 The abstract and the symbolic; the rigor
 1.3.4.
 2.1.5.
 From the Platonist response to action and gesture
 2.1.6.
 Intuition, gestures, and the numeric line
 2.1.7.
 Mathematical incompleteness of formalisms
 2.1.8.
 Iterations and closures on the horizon
 2.1.9.
 Intuition
 From the relativity to reference universes to that of these universes themselves as generators of physical invariances
 2.1.10.
 Body gestures and the "cogito"
 2.1.11.
 Summary and conclusion of part 2.1
 2.2.
 Incompleteness, Uncertainty, and Infinity: Differences and Similarities Between Physics and Mathematics
 2.2.1.
 Completeness/incompleteness in physical theories
 2.2.2.
 Finite/infinite in mathematics and physics
 1.3.5.
 Physical causality and mathematical symmetry
 1.3.6.
 Towards the "cognitive subject"
 2.
 Incompleteness and Indetermination in Mathematics and Physics
 3.1.3.
 Some epistemological remarks
 3.2.
 Towards Biology: Space and Time in the "Field" of Living Systems
 3.2.1.
 The time of life
 3.2.2.
 More on Biological time
 3.2.3.
 Dynamics of the selfconstitution of living systems
 3.
 3.2.4.
 Morphogenesis
 3.2.5.
 Information and geometric structure
 3.3.
 Spatiotemporal Determination and Biology
 3.3.1.
 Biological aspects
 3.3.2.
 Space: Laws of scaling and of critical behavior. The geometry of biological functions
 Space and Time from Physics to Biology
 3.3.3.
 Three types of time
 3.3.4.
 Epistemological and mathematical aspects
 3.3.5.
 Some philosophy, to conclude
 4.
 Invariances, Symmetries, and Symmetry Breakings
 4.1.
 A Major Structuring Principle of Physics: The Geodesic Principle
 3.1.
 4.1.1.
 The physicomathematical conceptual frame
 An Introduction to the Space and Time of Modern Physics
 3.1.1.
 Taking leave of Laplace
 3.1.2.
 Three types of physical theory: Relativity, quantum physics, and the theory of critical transitions in dynamical systems
 4.3.1.
 A few abstract invariances in biology: Homology, analogy, allometry
 4.3.2.
 Comments regarding the relationships between invariances and the conditions of possibility for life
 4.4.
 About the Possible Recategorizations of the Notions of Space and Time under the Current State of the Natural Sciences
 5.
 Causes and Symmetries: The Continuum and the Discrete in Mathematical Modeling
 5.1.
 Causal Structures and Symmetries, in Physics
 4.2.
 5.1.1.
 Symmetries as starting point for intelligibility
 5.1.2.
 Time and causality in physics
 5.1.3.
 Symmetry breaking and fabrics of interaction
 5.2.
 From the Continuum to the Discrete
 5.2.1.
 Computer science and the philosophy of arithmetic
 On the Role of Symmetries and of Their Breakings: From Description to Determination
 5.2.2.
 Laplace, digital rounding, and iteration
 4.2.1.
 Symmetries, symmetry breaking, and logic
 4.2.2.
 Symmetries, symmetry breaking, and determination of physical reality
 4.3.
 Invariance and Variability in Biology
 5.3.2.
 On contingent finality
 5.3.3.
 "Causal" dynamics: Development, maturity, aging, death
 5.3.4.
 Invariants of causal reduction in biology
 5.3.5.
 A few comments and comparisons with physics
 5.4.
 Synthesis and Conclusion
 5.2.3.
 6.
 Extended Criticality: The Physical Singularity of Life Phenomena
 6.1.
 On Singularities and Criticality in Physics
 6.1.1.
 From gas to crystal
 6.1.2.
 From the local to the global
 6.1.3.
 Phase transitions in selforganized criticality and "order for free"
 Iteration and prediction
 6.2.
 Life as "Extended Critical Situation"
 6.2.1.
 Extended critical situations: General approaches
 6.2.2.
 The extended critical situation: A few precisions and complements
 6.2.3.
 More on the relations to autopoiesis
 6.2.4.
 Summary of the characteristics of the extended critical situation
 5.2.4.
 6.3.
 Integration, Regulation, and Causal Regimes
 6.4.
 Phase Spaces and Their Trajectories
 Rules and the algorithm
 5.3.
 Causalities in Biology
 5.3.1.
 Basic representation
 7.2.
 The Objectivity of Quantum Randomness
 7.2.1.
 Separability vs nonseparability
 7.2.2.
 Possible objections
 7.2.3.
 Final remarks on quantum randomness
 7.3.
 Determination and Continuous Mathematics
 6.5.
 7.4.
 Conclusion: Towards Computability
 8.
 Conclusion: Unification and Separation of Theories, or the Importance of Negative Results
 8.1.
 Foundational Analysis and Knowledge Construction
 8.2.
 The Importance of Negative Results
 8.2.1.
 Changing frames
 Another View on Stability and Variability
 8.3.
 Vitalism and NonRealism
 8.4.
 End and Opening
 6.5.1.
 Biolons as attractors and individual trajectories
 7.
 Randomness and Determination in the Interplay between the Continuum and the Discrete
 7.1.
 Deterministic Chaos and Mathematical Randomness: The Case of Classical Physics
 Control code
 ocn756782470
 Dimensions
 unknown
 Extent
 1 online resource (xvii, 318 pages)
 File format
 unknown
 Form of item
 online
 Isbn
 9781283234542
 Level of compression
 unknown
 Note
 eBooks on EBSCOhost
 Quality assurance targets
 not applicable
 Reformatting quality
 unknown
 Sound
 unknown sound
 Specific material designation
 remote
 System control number
 (OCoLC)756782470
 Label
 Mathematics and the natural sciences : the physical singularity of life, Francis Bailly, Giuseppe Longo, (electronic resource)
 Antecedent source
 unknown
 Bibliography note
 Includes bibliographical references (pages 299312) and index
 Color
 multicolored
 Contents

 The genesis of mathematical structures and of their relationships  a few conceptual analogies
 1.1.3.
 Formalization, calculation, meaning, subjectivity
 1.1.4.
 Between cognition and history: Towards new structures of intelligibility
 1.2.
 Mathematical Concepts: A Constructive Approach
 1.2.1.
 Genealogies of concepts
 1.2.2.
 Machine generated contents note:
 The "transcendent" in physics and in mathematics
 1.2.3.
 Laws, structures, and foundations
 1.2.4.
 Subject and objectivity
 1.2.5.
 From intuitionism to a renewed constructivism
 1.3.
 Regarding Mathematical Concepts and Physical Objects
 1.3.1.
 1.
 "Friction" and the determination of physical objects
 1.3.2.
 The absolute and the relative in mathematics and in physics
 1.3.3.
 On the two functions of language within the process of objectification and the construction of mathematical models in physics
 Mathematical Concepts and Physical Objects
 1.1.
 On the Foundations of Mathematics. A First Inquiry
 1.1.1.
 Terminological issues?
 1.1.2.
 2.1.
 The Cognitive Foundations of Mathematics: Human Gestures in Proofs and Mathematical Incompleteness of Formalisms
 2.1.1.
 Introduction
 2.1.2.
 Machines, body, and rationality
 2.1.3.
 Ameba, motivity, and signification
 2.1.4.
 The abstract and the symbolic; the rigor
 1.3.4.
 2.1.5.
 From the Platonist response to action and gesture
 2.1.6.
 Intuition, gestures, and the numeric line
 2.1.7.
 Mathematical incompleteness of formalisms
 2.1.8.
 Iterations and closures on the horizon
 2.1.9.
 Intuition
 From the relativity to reference universes to that of these universes themselves as generators of physical invariances
 2.1.10.
 Body gestures and the "cogito"
 2.1.11.
 Summary and conclusion of part 2.1
 2.2.
 Incompleteness, Uncertainty, and Infinity: Differences and Similarities Between Physics and Mathematics
 2.2.1.
 Completeness/incompleteness in physical theories
 2.2.2.
 Finite/infinite in mathematics and physics
 1.3.5.
 Physical causality and mathematical symmetry
 1.3.6.
 Towards the "cognitive subject"
 2.
 Incompleteness and Indetermination in Mathematics and Physics
 3.1.3.
 Some epistemological remarks
 3.2.
 Towards Biology: Space and Time in the "Field" of Living Systems
 3.2.1.
 The time of life
 3.2.2.
 More on Biological time
 3.2.3.
 Dynamics of the selfconstitution of living systems
 3.
 3.2.4.
 Morphogenesis
 3.2.5.
 Information and geometric structure
 3.3.
 Spatiotemporal Determination and Biology
 3.3.1.
 Biological aspects
 3.3.2.
 Space: Laws of scaling and of critical behavior. The geometry of biological functions
 Space and Time from Physics to Biology
 3.3.3.
 Three types of time
 3.3.4.
 Epistemological and mathematical aspects
 3.3.5.
 Some philosophy, to conclude
 4.
 Invariances, Symmetries, and Symmetry Breakings
 4.1.
 A Major Structuring Principle of Physics: The Geodesic Principle
 3.1.
 4.1.1.
 The physicomathematical conceptual frame
 An Introduction to the Space and Time of Modern Physics
 3.1.1.
 Taking leave of Laplace
 3.1.2.
 Three types of physical theory: Relativity, quantum physics, and the theory of critical transitions in dynamical systems
 4.3.1.
 A few abstract invariances in biology: Homology, analogy, allometry
 4.3.2.
 Comments regarding the relationships between invariances and the conditions of possibility for life
 4.4.
 About the Possible Recategorizations of the Notions of Space and Time under the Current State of the Natural Sciences
 5.
 Causes and Symmetries: The Continuum and the Discrete in Mathematical Modeling
 5.1.
 Causal Structures and Symmetries, in Physics
 4.2.
 5.1.1.
 Symmetries as starting point for intelligibility
 5.1.2.
 Time and causality in physics
 5.1.3.
 Symmetry breaking and fabrics of interaction
 5.2.
 From the Continuum to the Discrete
 5.2.1.
 Computer science and the philosophy of arithmetic
 On the Role of Symmetries and of Their Breakings: From Description to Determination
 5.2.2.
 Laplace, digital rounding, and iteration
 4.2.1.
 Symmetries, symmetry breaking, and logic
 4.2.2.
 Symmetries, symmetry breaking, and determination of physical reality
 4.3.
 Invariance and Variability in Biology
 5.3.2.
 On contingent finality
 5.3.3.
 "Causal" dynamics: Development, maturity, aging, death
 5.3.4.
 Invariants of causal reduction in biology
 5.3.5.
 A few comments and comparisons with physics
 5.4.
 Synthesis and Conclusion
 5.2.3.
 6.
 Extended Criticality: The Physical Singularity of Life Phenomena
 6.1.
 On Singularities and Criticality in Physics
 6.1.1.
 From gas to crystal
 6.1.2.
 From the local to the global
 6.1.3.
 Phase transitions in selforganized criticality and "order for free"
 Iteration and prediction
 6.2.
 Life as "Extended Critical Situation"
 6.2.1.
 Extended critical situations: General approaches
 6.2.2.
 The extended critical situation: A few precisions and complements
 6.2.3.
 More on the relations to autopoiesis
 6.2.4.
 Summary of the characteristics of the extended critical situation
 5.2.4.
 6.3.
 Integration, Regulation, and Causal Regimes
 6.4.
 Phase Spaces and Their Trajectories
 Rules and the algorithm
 5.3.
 Causalities in Biology
 5.3.1.
 Basic representation
 7.2.
 The Objectivity of Quantum Randomness
 7.2.1.
 Separability vs nonseparability
 7.2.2.
 Possible objections
 7.2.3.
 Final remarks on quantum randomness
 7.3.
 Determination and Continuous Mathematics
 6.5.
 7.4.
 Conclusion: Towards Computability
 8.
 Conclusion: Unification and Separation of Theories, or the Importance of Negative Results
 8.1.
 Foundational Analysis and Knowledge Construction
 8.2.
 The Importance of Negative Results
 8.2.1.
 Changing frames
 Another View on Stability and Variability
 8.3.
 Vitalism and NonRealism
 8.4.
 End and Opening
 6.5.1.
 Biolons as attractors and individual trajectories
 7.
 Randomness and Determination in the Interplay between the Continuum and the Discrete
 7.1.
 Deterministic Chaos and Mathematical Randomness: The Case of Classical Physics
 Control code
 ocn756782470
 Dimensions
 unknown
 Extent
 1 online resource (xvii, 318 pages)
 File format
 unknown
 Form of item
 online
 Isbn
 9781283234542
 Level of compression
 unknown
 Note
 eBooks on EBSCOhost
 Quality assurance targets
 not applicable
 Reformatting quality
 unknown
 Sound
 unknown sound
 Specific material designation
 remote
 System control number
 (OCoLC)756782470
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