The Resource Convexity in the Theory of Lattice Gases
Convexity in the Theory of Lattice Gases
Resource Information
The item Convexity in the Theory of Lattice Gases represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.This item is available to borrow from 1 library branch.
Resource Information
The item Convexity in the Theory of Lattice Gases represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.
This item is available to borrow from 1 library branch.
- Summary
- In this book, Robert Israel considers classical and quantum lattice systems in terms of equilibrium statistical mechanics. He is especially concerned with the characterization of translation-invariant equilibrium states by a variational principle and the use of convexity in studying these states. Arthur Wightman's Introduction gives a general and historical perspective on convexity in statistical mechanics and thermodynamics. Professor Israel then reviews the general framework of the theory of lattice gases. In addition to presenting new and more direct proofs of some known results, he uses
- Language
- eng
- Extent
- 1 online resource (257 pages)
- Note
- Contents
- Contents
-
- VI. The Gibbs Phase Rule
- APPENDIX [Alpha]. Hausdorff Measure and Dimension
- APPENDIX B. Classical Hard-Core Continuous Systems
- BIBLIOGRAPHY
- INDEX
- Backmatter
- Frontmatter
- CONTENTS
- INTRODUCTION. Convexity and the Notion of Equilibrium State in Thermodynamics and Statistical Mechanics
- I. Interactions
- II. Tangent Functionals and the Variational Principle
- III. DLR Equations and KMS Conditions
- IV. Decomposition of States
- V. Approximation by Tangent Functionals: Existence of Phase Transitions
- Isbn
- 9781400868421
- Label
- Convexity in the Theory of Lattice Gases
- Title
- Convexity in the Theory of Lattice Gases
- Language
- eng
- Summary
- In this book, Robert Israel considers classical and quantum lattice systems in terms of equilibrium statistical mechanics. He is especially concerned with the characterization of translation-invariant equilibrium states by a variational principle and the use of convexity in studying these states. Arthur Wightman's Introduction gives a general and historical perspective on convexity in statistical mechanics and thermodynamics. Professor Israel then reviews the general framework of the theory of lattice gases. In addition to presenting new and more direct proofs of some known results, he uses
- Cataloging source
- EBLCP
- http://library.link/vocab/creatorName
- Israel, Robert B
- Dewey number
- 530.13
- Index
- no index present
- Language note
- In English
- LC call number
- QC174.85.L38 I87
- Literary form
- non fiction
- Nature of contents
- dictionaries
- Series statement
- Princeton Series in Physics
- http://library.link/vocab/subjectName
-
- Lattice gas
- Convex domains
- Statistical mechanics
- Statistical thermodynamics
- SCIENCE
- SCIENCE
- SCIENCE
- Convex domains
- Lattice gas
- Statistical mechanics
- Statistical thermodynamics
- Natural Sciences
- Physics, other
- Physics
- Physik
- Label
- Convexity in the Theory of Lattice Gases
- Note
- Contents
- Antecedent source
- unknown
- Carrier category
- online resource
- Carrier category code
-
- cr
- Carrier MARC source
- rdacarrier
- Color
- multicolored
- Content category
- text
- Content type code
-
- txt
- Content type MARC source
- rdacontent
- Contents
-
- VI. The Gibbs Phase Rule
- APPENDIX [Alpha]. Hausdorff Measure and Dimension
- APPENDIX B. Classical Hard-Core Continuous Systems
- BIBLIOGRAPHY
- INDEX
- Backmatter
- Frontmatter
- CONTENTS
- INTRODUCTION. Convexity and the Notion of Equilibrium State in Thermodynamics and Statistical Mechanics
- I. Interactions
- II. Tangent Functionals and the Variational Principle
- III. DLR Equations and KMS Conditions
- IV. Decomposition of States
- V. Approximation by Tangent Functionals: Existence of Phase Transitions
- Control code
- 902958227
- Dimensions
- unknown
- Extent
- 1 online resource (257 pages)
- File format
- unknown
- Form of item
- online
- Isbn
- 9781400868421
- Level of compression
- unknown
- Media category
- computer
- Media MARC source
- rdamedia
- Media type code
-
- c
- Other control number
- 10.1515/9781400868421
- http://library.link/vocab/ext/overdrive/overdriveId
- 22573/ctt13gm448
- Quality assurance targets
- not applicable
- Reformatting quality
- unknown
- Sound
- unknown sound
- Specific material designation
- remote
- System control number
- (OCoLC)902958227
- Label
- Convexity in the Theory of Lattice Gases
- Note
- Contents
- Antecedent source
- unknown
- Carrier category
- online resource
- Carrier category code
-
- cr
- Carrier MARC source
- rdacarrier
- Color
- multicolored
- Content category
- text
- Content type code
-
- txt
- Content type MARC source
- rdacontent
- Contents
-
- VI. The Gibbs Phase Rule
- APPENDIX [Alpha]. Hausdorff Measure and Dimension
- APPENDIX B. Classical Hard-Core Continuous Systems
- BIBLIOGRAPHY
- INDEX
- Backmatter
- Frontmatter
- CONTENTS
- INTRODUCTION. Convexity and the Notion of Equilibrium State in Thermodynamics and Statistical Mechanics
- I. Interactions
- II. Tangent Functionals and the Variational Principle
- III. DLR Equations and KMS Conditions
- IV. Decomposition of States
- V. Approximation by Tangent Functionals: Existence of Phase Transitions
- Control code
- 902958227
- Dimensions
- unknown
- Extent
- 1 online resource (257 pages)
- File format
- unknown
- Form of item
- online
- Isbn
- 9781400868421
- Level of compression
- unknown
- Media category
- computer
- Media MARC source
- rdamedia
- Media type code
-
- c
- Other control number
- 10.1515/9781400868421
- http://library.link/vocab/ext/overdrive/overdriveId
- 22573/ctt13gm448
- Quality assurance targets
- not applicable
- Reformatting quality
- unknown
- Sound
- unknown sound
- Specific material designation
- remote
- System control number
- (OCoLC)902958227
Library Links
Embed
Settings
Select options that apply then copy and paste the RDF/HTML data fragment to include in your application
Embed this data in a secure (HTTPS) page:
Layout options:
Include data citation:
<div class="citation" vocab="http://schema.org/"><i class="fa fa-external-link-square fa-fw"></i> Data from <span resource="http://link.library.missouri.edu/portal/Convexity-in-the-Theory-of-Lattice-Gases/cZWvlwSzDcA/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.library.missouri.edu/portal/Convexity-in-the-Theory-of-Lattice-Gases/cZWvlwSzDcA/">Convexity in the Theory of Lattice Gases</a></span> - <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.library.missouri.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.library.missouri.edu/">University of Missouri Libraries</a></span></span></span></span></div>
Note: Adjust the width and height settings defined in the RDF/HTML code fragment to best match your requirements
Preview
Cite Data - Experimental
Data Citation of the Item Convexity in the Theory of Lattice Gases
Copy and paste the following RDF/HTML data fragment to cite this resource
<div class="citation" vocab="http://schema.org/"><i class="fa fa-external-link-square fa-fw"></i> Data from <span resource="http://link.library.missouri.edu/portal/Convexity-in-the-Theory-of-Lattice-Gases/cZWvlwSzDcA/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.library.missouri.edu/portal/Convexity-in-the-Theory-of-Lattice-Gases/cZWvlwSzDcA/">Convexity in the Theory of Lattice Gases</a></span> - <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.library.missouri.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.library.missouri.edu/">University of Missouri Libraries</a></span></span></span></span></div>
