Intermittent Convex Integration for the 3D Euler Equations : : (AMS-217) / / Matthew Novack, Vlad Vicol, Nader Masmoudi, Tristan Buckmaster.
A new threshold for the existence of weak solutions to incompressible Euler equationsTo gain insight into the nature of turbulent fluids, mathematicians start from experimental facts, translate them into mathematical properties for solutions of the fundamental fluids PDEs, and construct solutions to...
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Buckmaster, Tristan, author. aut http://id.loc.gov/vocabulary/relators/aut Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / Matthew Novack, Vlad Vicol, Nader Masmoudi, Tristan Buckmaster. Princeton, NJ : Princeton University Press, [2023] ©2023 1 online resource (256 p.) : 11 b/w illus. text txt rdacontent computer c rdamedia online resource cr rdacarrier text file PDF rda Annals of Mathematics Studies ; 217 Frontmatter -- Contents -- 1. Introduction -- 1.1 Context and motivation -- 1.2 Ideas and difficulties -- 1.3 Organization of the book -- 1.4 Acknowledgments -- 2. Outline of the convex integration scheme -- 2.1 A Guide to the Parameters -- 2.2 Inductive Assumptions -- 2.3 Intermittent Pipe Flows -- 2.4 Higher Order Stresses -- 2.5 Cutoff Functions -- 2.6 The Perturbation -- 2.7 The Reynolds Stress Error and Heuristic Estimates -- 3. Inductive Assumptions -- 3.1 General Notations -- 3.2 Inductive Estimates -- 3.3 Main Inductive Proposition -- 3.4 Proof of Theorem 1.1 -- 4. Building Blocks -- 4.1 A Careful Construction of Intermittent Pipe Flows -- 4.2 Deformed Pipe Flows and Curved Axes -- 4.3 Placements Via Relative Intermittency -- 5. Mollification -- 6. Cutoffs -- 6.1 Definition of the Velocity Cutoff Functions -- 6.2 Properties of the Velocity Cutoff Functions -- 6.3 Definition of the Temporal Cutoff Functions -- 6.4 Estimates on Flow Maps -- 6.5 Stress Estimates on the Support of the New Velocity Cutoff Functions -- 6.6 Definition of the Stress Cutoff Functions -- 6.7 Properties of the Stress Cutoff Functions -- 6.8 Definition and Properties of the Checkerboard Cutoff Functions -- 6.9 Definition of the Cumulative Cutoff Function -- 7. From q to q + 1: Breaking Down the Main Inductive Estimates -- 7.1 Induction on Q -- 7.2 Notations -- 7.3 Induction on ñ -- 8. Proving the Main Inductive Estimates -- 8. 1 Definition of R̊q, n̄, p̄ and Wq+1, n̄, p̄ -- 8. 2 Estimates For Wq+1, n̄, p̄ -- 8.3 Identification of Error Terms -- 8.4 Transport Errors -- 8.5 Nash Errors -- 8.6 Type 1 Oscillation Errors -- 8.7 Type 2 Oscillation Errors -- 8.8 Divergence Corrector Errors -- 8.9 Time Support of Perturbations and Stresses -- 9. Parameters -- 9.1 Definitions and Hierarchy of the Parameters -- 9.2 Definitions of the Q-Dependent Parameters -- 9.3 Inequalities and Consequences of the Parameter Definitions -- 9.4 Mollifiers and Fourier Projectors -- 9.5 Notations -- Appendix A: Useful Lemmas -- Introduction -- A.1 Transport Estimates -- A.2 Proof of Lemma 6.2 -- A.3 Lp Decorrelation -- A.4 Sobolev Inequality with Cutoffs -- A.5 Consequences of the Faà di Bruno Formula -- A.6 Bounds for Sums and Iterates of Operators -- A.7 Commutators with Material Derivatives -- A.8 Intermittency-Friendly Inversion of the Divergence -- Bibliography -- Index restricted access http://purl.org/coar/access_right/c_16ec online access with authorization star A new threshold for the existence of weak solutions to incompressible Euler equationsTo gain insight into the nature of turbulent fluids, mathematicians start from experimental facts, translate them into mathematical properties for solutions of the fundamental fluids PDEs, and construct solutions to these PDEs that exhibit turbulent properties. This book belongs to such a program, one that has brought convex integration techniques into hydrodynamics. Convex integration techniques have been used to produce solutions with precise regularity, which are necessary for the resolution of the Onsager conjecture for the 3D Euler equations, or solutions with intermittency, which are necessary for the construction of dissipative weak solutions for the Navier-Stokes equations. In this book, weak solutions to the 3D Euler equations are constructed for the first time with both non-negligible regularity and intermittency. These solutions enjoy a spatial regularity index in L^2 that can be taken as close as desired to 1/2, thus lying at the threshold of all known convex integration methods. This property matches the measured intermittent nature of turbulent flows. The construction of such solutions requires technology specifically adapted to the inhomogeneities inherent in intermittent solutions. The main technical contribution of this book is to develop convex integration techniques at the local rather than global level. This localization procedure functions as an ad hoc wavelet decomposition of the solution, carrying information about position, amplitude, and frequency in both Lagrangian and Eulerian coordinates. Mode of access: Internet via World Wide Web. In English. Description based on online resource; title from PDF title page (publisher's Web site, viewed 08. Aug 2023) MATHEMATICS / Applied. bisacsh Annals of Mathematics Studies. Euler equations. Intermittent Convex Integration for the 3D Euler Equations: (AMS-217). Kolmogorov. Matthew Novack. Nader Masmoudi. Nash iteration. Navier-Stokes equations. Onsager conjecture. Onsager. Princeton university press. Tristan Buckmaster. Vlad Vicol. anomalous dissipation. convex integration. intermittency. math. mathematics. scholarly. structure functions. turbulence. Masmoudi, Nader, author. aut http://id.loc.gov/vocabulary/relators/aut Novack, Matthew, author. aut http://id.loc.gov/vocabulary/relators/aut Title is part of eBook package: De Gruyter EBOOK PACKAGE COMPLETE 2023 English 9783111319292 Title is part of eBook package: De Gruyter EBOOK PACKAGE COMPLETE 2023 9783111318912 ZDB-23-DGG Title is part of eBook package: De Gruyter EBOOK PACKAGE Mathematics 2023 English 9783111319209 Title is part of eBook package: De Gruyter EBOOK PACKAGE Mathematics 2023 9783111318608 ZDB-23-DMA Title is part of eBook package: De Gruyter Princeton University Press Complete eBook-Package 2023 9783110749748 print 9780691249544 https://doi.org/10.1515/9780691249568?locatt=mode:legacy https://www.degruyter.com/isbn/9780691249568 Cover https://www.degruyter.com/document/cover/isbn/9780691249568/original |
| language |
English |
| format |
eBook |
| author |
Buckmaster, Tristan, Buckmaster, Tristan, Masmoudi, Nader, Novack, Matthew, |
| spellingShingle |
Buckmaster, Tristan, Buckmaster, Tristan, Masmoudi, Nader, Novack, Matthew, Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / Annals of Mathematics Studies ; Frontmatter -- Contents -- 1. Introduction -- 1.1 Context and motivation -- 1.2 Ideas and difficulties -- 1.3 Organization of the book -- 1.4 Acknowledgments -- 2. Outline of the convex integration scheme -- 2.1 A Guide to the Parameters -- 2.2 Inductive Assumptions -- 2.3 Intermittent Pipe Flows -- 2.4 Higher Order Stresses -- 2.5 Cutoff Functions -- 2.6 The Perturbation -- 2.7 The Reynolds Stress Error and Heuristic Estimates -- 3. Inductive Assumptions -- 3.1 General Notations -- 3.2 Inductive Estimates -- 3.3 Main Inductive Proposition -- 3.4 Proof of Theorem 1.1 -- 4. Building Blocks -- 4.1 A Careful Construction of Intermittent Pipe Flows -- 4.2 Deformed Pipe Flows and Curved Axes -- 4.3 Placements Via Relative Intermittency -- 5. Mollification -- 6. Cutoffs -- 6.1 Definition of the Velocity Cutoff Functions -- 6.2 Properties of the Velocity Cutoff Functions -- 6.3 Definition of the Temporal Cutoff Functions -- 6.4 Estimates on Flow Maps -- 6.5 Stress Estimates on the Support of the New Velocity Cutoff Functions -- 6.6 Definition of the Stress Cutoff Functions -- 6.7 Properties of the Stress Cutoff Functions -- 6.8 Definition and Properties of the Checkerboard Cutoff Functions -- 6.9 Definition of the Cumulative Cutoff Function -- 7. From q to q + 1: Breaking Down the Main Inductive Estimates -- 7.1 Induction on Q -- 7.2 Notations -- 7.3 Induction on ñ -- 8. Proving the Main Inductive Estimates -- 8. 1 Definition of R̊q, n̄, p̄ and Wq+1, n̄, p̄ -- 8. 2 Estimates For Wq+1, n̄, p̄ -- 8.3 Identification of Error Terms -- 8.4 Transport Errors -- 8.5 Nash Errors -- 8.6 Type 1 Oscillation Errors -- 8.7 Type 2 Oscillation Errors -- 8.8 Divergence Corrector Errors -- 8.9 Time Support of Perturbations and Stresses -- 9. Parameters -- 9.1 Definitions and Hierarchy of the Parameters -- 9.2 Definitions of the Q-Dependent Parameters -- 9.3 Inequalities and Consequences of the Parameter Definitions -- 9.4 Mollifiers and Fourier Projectors -- 9.5 Notations -- Appendix A: Useful Lemmas -- Introduction -- A.1 Transport Estimates -- A.2 Proof of Lemma 6.2 -- A.3 Lp Decorrelation -- A.4 Sobolev Inequality with Cutoffs -- A.5 Consequences of the Faà di Bruno Formula -- A.6 Bounds for Sums and Iterates of Operators -- A.7 Commutators with Material Derivatives -- A.8 Intermittency-Friendly Inversion of the Divergence -- Bibliography -- Index |
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| title |
Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / |
| title_sub |
(AMS-217) / |
| title_full |
Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / Matthew Novack, Vlad Vicol, Nader Masmoudi, Tristan Buckmaster. |
| title_fullStr |
Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / Matthew Novack, Vlad Vicol, Nader Masmoudi, Tristan Buckmaster. |
| title_full_unstemmed |
Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / Matthew Novack, Vlad Vicol, Nader Masmoudi, Tristan Buckmaster. |
| title_auth |
Intermittent Convex Integration for the 3D Euler Equations : (AMS-217) / |
| title_alt |
Frontmatter -- Contents -- 1. Introduction -- 1.1 Context and motivation -- 1.2 Ideas and difficulties -- 1.3 Organization of the book -- 1.4 Acknowledgments -- 2. Outline of the convex integration scheme -- 2.1 A Guide to the Parameters -- 2.2 Inductive Assumptions -- 2.3 Intermittent Pipe Flows -- 2.4 Higher Order Stresses -- 2.5 Cutoff Functions -- 2.6 The Perturbation -- 2.7 The Reynolds Stress Error and Heuristic Estimates -- 3. Inductive Assumptions -- 3.1 General Notations -- 3.2 Inductive Estimates -- 3.3 Main Inductive Proposition -- 3.4 Proof of Theorem 1.1 -- 4. Building Blocks -- 4.1 A Careful Construction of Intermittent Pipe Flows -- 4.2 Deformed Pipe Flows and Curved Axes -- 4.3 Placements Via Relative Intermittency -- 5. Mollification -- 6. Cutoffs -- 6.1 Definition of the Velocity Cutoff Functions -- 6.2 Properties of the Velocity Cutoff Functions -- 6.3 Definition of the Temporal Cutoff Functions -- 6.4 Estimates on Flow Maps -- 6.5 Stress Estimates on the Support of the New Velocity Cutoff Functions -- 6.6 Definition of the Stress Cutoff Functions -- 6.7 Properties of the Stress Cutoff Functions -- 6.8 Definition and Properties of the Checkerboard Cutoff Functions -- 6.9 Definition of the Cumulative Cutoff Function -- 7. From q to q + 1: Breaking Down the Main Inductive Estimates -- 7.1 Induction on Q -- 7.2 Notations -- 7.3 Induction on ñ -- 8. Proving the Main Inductive Estimates -- 8. 1 Definition of R̊q, n̄, p̄ and Wq+1, n̄, p̄ -- 8. 2 Estimates For Wq+1, n̄, p̄ -- 8.3 Identification of Error Terms -- 8.4 Transport Errors -- 8.5 Nash Errors -- 8.6 Type 1 Oscillation Errors -- 8.7 Type 2 Oscillation Errors -- 8.8 Divergence Corrector Errors -- 8.9 Time Support of Perturbations and Stresses -- 9. Parameters -- 9.1 Definitions and Hierarchy of the Parameters -- 9.2 Definitions of the Q-Dependent Parameters -- 9.3 Inequalities and Consequences of the Parameter Definitions -- 9.4 Mollifiers and Fourier Projectors -- 9.5 Notations -- Appendix A: Useful Lemmas -- Introduction -- A.1 Transport Estimates -- A.2 Proof of Lemma 6.2 -- A.3 Lp Decorrelation -- A.4 Sobolev Inequality with Cutoffs -- A.5 Consequences of the Faà di Bruno Formula -- A.6 Bounds for Sums and Iterates of Operators -- A.7 Commutators with Material Derivatives -- A.8 Intermittency-Friendly Inversion of the Divergence -- Bibliography -- Index |
| title_new |
Intermittent Convex Integration for the 3D Euler Equations : |
| title_sort |
intermittent convex integration for the 3d euler equations : (ams-217) / |
| series |
Annals of Mathematics Studies ; |
| series2 |
Annals of Mathematics Studies ; |
| publisher |
Princeton University Press, |
| publishDate |
2023 |
| physical |
1 online resource (256 p.) : 11 b/w illus. |
| contents |
Frontmatter -- Contents -- 1. Introduction -- 1.1 Context and motivation -- 1.2 Ideas and difficulties -- 1.3 Organization of the book -- 1.4 Acknowledgments -- 2. Outline of the convex integration scheme -- 2.1 A Guide to the Parameters -- 2.2 Inductive Assumptions -- 2.3 Intermittent Pipe Flows -- 2.4 Higher Order Stresses -- 2.5 Cutoff Functions -- 2.6 The Perturbation -- 2.7 The Reynolds Stress Error and Heuristic Estimates -- 3. Inductive Assumptions -- 3.1 General Notations -- 3.2 Inductive Estimates -- 3.3 Main Inductive Proposition -- 3.4 Proof of Theorem 1.1 -- 4. Building Blocks -- 4.1 A Careful Construction of Intermittent Pipe Flows -- 4.2 Deformed Pipe Flows and Curved Axes -- 4.3 Placements Via Relative Intermittency -- 5. Mollification -- 6. Cutoffs -- 6.1 Definition of the Velocity Cutoff Functions -- 6.2 Properties of the Velocity Cutoff Functions -- 6.3 Definition of the Temporal Cutoff Functions -- 6.4 Estimates on Flow Maps -- 6.5 Stress Estimates on the Support of the New Velocity Cutoff Functions -- 6.6 Definition of the Stress Cutoff Functions -- 6.7 Properties of the Stress Cutoff Functions -- 6.8 Definition and Properties of the Checkerboard Cutoff Functions -- 6.9 Definition of the Cumulative Cutoff Function -- 7. From q to q + 1: Breaking Down the Main Inductive Estimates -- 7.1 Induction on Q -- 7.2 Notations -- 7.3 Induction on ñ -- 8. Proving the Main Inductive Estimates -- 8. 1 Definition of R̊q, n̄, p̄ and Wq+1, n̄, p̄ -- 8. 2 Estimates For Wq+1, n̄, p̄ -- 8.3 Identification of Error Terms -- 8.4 Transport Errors -- 8.5 Nash Errors -- 8.6 Type 1 Oscillation Errors -- 8.7 Type 2 Oscillation Errors -- 8.8 Divergence Corrector Errors -- 8.9 Time Support of Perturbations and Stresses -- 9. Parameters -- 9.1 Definitions and Hierarchy of the Parameters -- 9.2 Definitions of the Q-Dependent Parameters -- 9.3 Inequalities and Consequences of the Parameter Definitions -- 9.4 Mollifiers and Fourier Projectors -- 9.5 Notations -- Appendix A: Useful Lemmas -- Introduction -- A.1 Transport Estimates -- A.2 Proof of Lemma 6.2 -- A.3 Lp Decorrelation -- A.4 Sobolev Inequality with Cutoffs -- A.5 Consequences of the Faà di Bruno Formula -- A.6 Bounds for Sums and Iterates of Operators -- A.7 Commutators with Material Derivatives -- A.8 Intermittency-Friendly Inversion of the Divergence -- Bibliography -- Index |
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This book belongs to such a program, one that has brought convex integration techniques into hydrodynamics. Convex integration techniques have been used to produce solutions with precise regularity, which are necessary for the resolution of the Onsager conjecture for the 3D Euler equations, or solutions with intermittency, which are necessary for the construction of dissipative weak solutions for the Navier-Stokes equations. In this book, weak solutions to the 3D Euler equations are constructed for the first time with both non-negligible regularity and intermittency. These solutions enjoy a spatial regularity index in L^2 that can be taken as close as desired to 1/2, thus lying at the threshold of all known convex integration methods. This property matches the measured intermittent nature of turbulent flows. The construction of such solutions requires technology specifically adapted to the inhomogeneities inherent in intermittent solutions. The main technical contribution of this book is to develop convex integration techniques at the local rather than global level. This localization procedure functions as an ad hoc wavelet decomposition of the solution, carrying information about position, amplitude, and frequency in both Lagrangian and Eulerian coordinates.</subfield></datafield><datafield tag="538" ind1=" " ind2=" "><subfield code="a">Mode of access: Internet via World Wide Web.</subfield></datafield><datafield tag="546" ind1=" " ind2=" "><subfield code="a">In English.</subfield></datafield><datafield tag="588" ind1="0" ind2=" "><subfield code="a">Description based on online resource; title from PDF title page (publisher's Web site, viewed 08. Aug 2023)</subfield></datafield><datafield tag="650" ind1=" " ind2="7"><subfield code="a">MATHEMATICS / Applied.</subfield><subfield code="2">bisacsh</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Annals of Mathematics Studies.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Euler equations.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Intermittent Convex Integration for the 3D Euler Equations: (AMS-217).</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Kolmogorov.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Matthew Novack.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Nader Masmoudi.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Nash iteration.</subfield></datafield><datafield tag="653" ind1=" " ind2=" "><subfield code="a">Navier-Stokes 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