OIST-Oxford-SLMath Summer School 2024
OIST-Oxford-SLMath Summer Graduate School on Analysis of Partial Differential Equations to be held on July 29 – August 9, 2024, at Okinawa, Japan
Organizing committee:
- Prof. Ugur G. Abdulla, Professor and Head of the Analysis & PDE Unit, Okinawa Institute of Science and Technology (OIST), Okinawa, Japan
- Prof. Gui-Qiang G. Chen, Statutory Professor in the Analysis of PDEs, Director of the Oxford Centre for Nonlinear PDEs (OxPDE), University of Oxford, United Kingdom
Lecturers:
- Prof. Ugur G. Abdulla, Professor and Head of the Analysis & PDE Unit, Okinawa Institute of Science and Technology (OIST), Okinawa, Japan
- Prof. Gui-Qiang G. Chen, Statutory Professor in the Analysis of PDEs, Director of the Oxford Centre for Nonlinear PDEs (OxPDE), University of Oxford, United Kingdom
- Prof. Monica Torres, Professor of Mathematics, Purdue University, USA
Plenary Lecturers:
- Prof. Ugur G. Abdulla, Professor and Head of the Analysis & PDE Unit, Okinawa Institute of Science and Technology (OIST), Okinawa, Japan
- Prof. Gui-Qiang G. Chen, Statutory Professor in the Analysis of PDEs, Director of the Oxford Centre for Nonlinear PDEs (OxPDE), University of Oxford, Oxford, United Kingdom
- Prof. L. Craig Evans, University of California, Berkeley, USA
- Prof. Juan Manfredi, University of Pittsburgh, Pittsburgh, USA
Teaching Assistants:
- Dr. Jose Rodrigues, Staff Scientist, Analysis & PDE Unit, OIST
- Dr. Daniel Tietz, Postdoctoral Scientist, Analysis & PDE Unit, OIST
Scientific Description: SGS will offer two mini-courses during the two-week long school:
- Course I: Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form (Gui-Qiang G. Chen & Monica Torres)
In this course, we will present some recent developments in the theory of divergence-measure fields via measure-theoretical analysis and its applications to the analysis of nonlinear PDEs of conservative form – nonlinear conservation laws. We plan to start with an introduction to measure theory, BV functions, and a set of finite perimeter, and then present the theory of divergence-measure fields in L∞, Lp, and the space of Radon measures, respectively. With these, we will discuss applications of the theory of divergence-measure fields in several fundamental research directions, including the mathematical formulation of the balance law and derivation of systems of balance laws via the Cauchy fluxes, and the analysis of entropy solutions of nonlinear conservation laws (especially, nonlinear hyperbolic conservation laws), among others. Some further developments, open problems, and current trends on the research topics will also be addressed.
References
- Chen, G.-Q. and Torres, M. Lecture Notes (to be available for the summer school).
- Chen, G.-Q. and Torres, M. (2021): Divergence-Measure Fields: Gauss-Green Formulas and Normal Traces. Notices Amer. Math. Soc. 68 (2021), no. 8, 1282–1290.
- Chen, G.-Q. and Frid, H. (1999): Divergence-measure fields and hyperbolic conservation laws. Arch. Ration. Mech. Anal. 147(2): 89 – 118.
- Chen, G.-Q., Torres, M., and Ziemer, W. P. (2009): Gauss-Green theorem for weakly differentiable vector fields, sets of finite perimeter, and balance laws. Comm. Pure Appl. Math. 62(2): 242 – 304.
- Chen, G.-Q., Comi, G. E., Torres, M. (2019): Cauchy fluxes and Gauss-Green formulas for divergence-measure fields over general open sets. Arch. Ration. Mech. Anal. 233: 87–166.
- Dafermos, C. M. (2016): Hyperbolic Conservation Laws in Continuum Physics, 4th Ed., Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences], 325, Springer-Verlag: Berlin, 2016.
- Evans, L. C. and Gariepy, R. F. (1992): Measure Theory and Fine Properties of Functions. Studies in Advanced Mathematics. CRC Press: Boca Raton, FL, 1992.
- Federer, H.: Geometric Measure Theory. Springer-Verlag New York Inc.: New York, 1969.
Additional References:
- L. Ambrosio, N. Fusco, and D. Pallara (2000): Functions of Bounded Variation and Free Discontinuity Problems. Oxford Mathematical Monographs. The Clarendon Press, Oxford University Press: New York.
- Anzellotti, G. (1984): Pairings between measures and bounded functions and compensated compactness. Ann. Mat. Pura Appl. (4), 135: 293–318.
- Chen, G.-Q. and Frid, H. (2003): Extended divergence-measure fields and the Euler equations for gas dynamics. Commun. Math. Phys. 236: 251–280.
- Chen, G.-Q. and M. Torres, M. (2005): Divergence-measure fields, sets of finite perimeter, and conservation laws. Arch. Ration. Mech. Anal. 175: 245–267.
- Maz'ya, V. G. (2011): Sobolev Spaces with Applications to Elliptic Partial Differential Equations. Springer-Verlag: Berlin-Heidelberg.
- Pfeffer, W. F. (2012): The Divergence Theorem and Sets of Finite Perimeter, Chapman & Hall/CRC: Boca Raton, FL.
- Course II: Perron’s method and Wiener-type criteria in the potential theory of elliptic and parabolic PDEs (Ugur Abdulla )
Norbert Wiener's celebrated result on the boundary regularity of harmonic functions is one of the most beautiful and delicate results in XX-century mathematics. It has shaped the boundary regularity theory for elliptic and parabolic PDEs and has become a central result in the development of potential theory at the intersection of functional analysis, PDE, and measure theories. In this course, we will present some recent developments precisely characterizing the regularity of the point at \(\infty\) for second-order elliptic and parabolic PDEs and broadly extending the role of the Wiener test in classical analysis. We preface the description of the course with a citation from a classical paper by Wiener: the Dirichlet Problem (DP) divides itself into two parts, the first of which is the determination of the harmonic function corresponding to certain boundary conditions, while the second is the investigation of the behavior of this function in the neighborhood of the boundary. In the first week of the course, we focus on proving the existence of the solution to the DP for the Laplace equation, and its parabolic counterpart for the heat/diffusion equation. Solvability, in some generalized sense, of the Dirichlet problem in an arbitrary open set with prescribed data on its topological boundary is realized within the class of resolutive boundary functions, identified by Perron's method, and its Wiener and Brelot refinements. Such a method is referred to as the PWB method and the corresponding solutions are the PWB solutions. In the second week of the course, our focus will be on the boundary regularity of PWB solutions. The regularity of a boundary point is a problem of local nature and it depends on the measure-geometric properties of the boundary in the neighborhood of the boundary point and the differential operator. After introducing the concept of Newtonian capacity we discuss Wiener’s celebrated criterion which expresses the boundary regularity in terms of the divergence of the Wiener integral with the integrand being a capacity of the exterior set in the neighborhood of the boundary point. The high point of the course is the new concept of regularity or irregularity of the point at \(\infty\) defined according as to the harmonic (or parabolic) measure of \(\infty\) is null or positive, and discussion of the proof of the new Wiener criterion for the regularity of \(\infty\). The Wiener test at \(\infty\) arises as a global characterization of uniqueness in boundary value problems for arbitrary unbounded open sets. From a topological point of view, the Wiener test at \(\infty\) arises as a thinness criterion at \(\infty\) in fine topology. In a probabilistic context, the Wiener test at \(\infty\) characterizes asymptotic laws for the characteristic Markov processes whose generator is the given differential operator. The counterpart of the new Wiener test at a finite boundary point leads to uniqueness in the Dirichlet problem for a class of unbounded functions growing at a certain rate near the boundary point; a criteria for the removability of singularities and/or for unique continuation at the finite boundary point.
Participants: The school will be well suited for an audience of graduate students with a wide range of abilities and knowledge. Both courses are designed in a way that the first week’s material mostly overlaps with the material taught in the standard graduate courses on Analysis and PDEs. Therefore, even first-year graduate students with solid undergraduate math backgrounds will have the potential for a comfortable and engaging start. Both courses will offer a tour de force for the transition from standard material to cutting-edge discoveries in the frontline of the field of PDEs. The structure of the courses will aim to create an active learning environment through a combination of classical and flipped classroom teaching. Every working day each course will present a classical-style lecture given by the professor followed by an active learning session. The goal of the second lecture is twofold: first to sharpen the comprehension of the material of the given lecture, and second, to prepare students for the forthcoming lecture. Both professors and assistants will be involved in active learning sessions to help students. Starting from day 2, active learning sessions will include student presentations of the assignments given in the previous day’s lecture. To address the variance of academic backgrounds, students will be divided into groups, each group including students with varying backgrounds. Each group will have at least one presentation during the course, which will include the participation of all group members. In order to make active learning sessions more effective an online discussion forum will be created, and students will be encouraged to post their questions and comments following every lecture. This discussion forum will define the major discussion topics of the following active learning sessions.
References
- U.G. Abdulla, Wiener’s Criterion at ∞ for the Heat Equation, Advances in Differential Equations, 13(5-6), (2008), 457-488.
- U.G. Abdulla, Wiener’s Criterion for the Unique Solvability of the Dirichlet Problem in Arbitrary Open Sets with Non-Compact Boundaries, Nonlinear Analysis, 67(2), (2007), 563-578.
- U.G. Abdulla, Regularity of ∞ for Elliptic Equations with Measurable Coefficients and Its Consequences, Discrete and Continuous Dynamical Systems - Series A (DCDS-A), 32, 10(2012), 3379-3397.
- U.G. Abdulla, Removability of the Logarithmic Singularity for the Elliptic PDEs with Measurable Coefficients and its Consequences, Calculus of Variations and Partial Differential Equations, 57, (6), (2018), 57-157.
- U.G. Abdulla, First Boundary Value Problem for the Diffusion Equation. I. Iterated Logarithm Test for the Boundary Regularity and Solvability, SIAM J. Math. Anal., 34(6), (2003), 1422–1434.
- U.G. Abdulla, Well-posedness of the Dirichlet Problem for the Nonlinear Diffusion Equation in Non-smooth Domains, Trans. Amer. Math. Soc., 357(1), (2005), 247–265.
- U.G. Abdulla, On the Dirichlet problem for the nonlinear diffusion equation in non-smooth domains, J. Math. Anal. Appl., 246, 2, 2001, 384-403
- D.H. Armitage and S.J. Gardiner, Classical Potential Theory, Springer Monographs in Mathematics, Springer, 2001.
- H. Bauer, Harmonische Raume und ihre Potentialtheorie, Lecture Notes in mathematics, Springer, 1966.
- M.Brelot, Lectures on Potential Theory, Tata Institute of Fundamental Research, Bombay, 1967.
- J.L. Doob, Classical Potential Theory and its Probabilistic Counterpart, Springer, 1984.
- L.C. Evans and R.F. Gariepy, Wiener’s criterion for the heat equation, Arch. Ration. Mech. Anal., 78, 1982, 293-314.
- L.C. Evans, Partial Differential Equations, AMS, 2nd edition, 2010.
- L.L. Helms, Potential Theory, Universitext, Springer, 2009.
- E. Lanconelli, Sul problema di Dirichlet per l’equazione del cslore, Ann. Math. Pura Appl., 97, 1973, 83-114.
- I.G. Petrowsky, Zur Ersten Randwertaufgabe der Warmeleitungsgleichung, Composito Math., 1, 1935, 383-419.
- N. A. Watson, Introduction to Heat Potential Theory, Mathematical Surveys and Monographs, vol. 182, Amer. Math. Soc., Providence RI, 2012.
- N. Wiener, Certain notions in potential theory, J. Math. Phys., 3, 1924, 24-51.
- N. Wiener, The Dirichlet problem, J. Math. Phys., 3, 1924, 127-146.
Lesson plan/Syllabus: Daily schedule of the SGS in week 1 will be as follows;
Monday, July 29
- 9:00-10:15. Course II – Lecture 1. Ugur Abdulla, Harmonic functions - the mathematical representation of physical quantities in equilibrium; fundamental harmonic function; representation formula for the gravitational potential via Poisson's PDE.
- 10:30-11:45. Course II – Lecture 2/active learning session (als). Ugur Abdulla, Mean value formulas, maximum/minimum principle for smooth sub-/superharmonic functions; uniqueness of the solution to the Dirichlet problem in bounded open sets;
12:00-13:00. Lunch
- 13:00-14:15. Course II - Lecture 3. Ugur Abdulla, Green's function, Green representation formula; Green's function for a ball; Poisson integral;
- 14:15-14:45. Tea and Coffee
- 14:45-16:00. Course II – Lecture 4/als. Ugur Abdulla, Properties of the Poisson integral with Lebesgue integrable boundary function; solvability of the classical Dirichlet problem in a ball for any continuous boundary function;
Tuesday, July 30
- 9:00-10:15. Course I – Lecture 1. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form I
- 10:30-11:45. Course I – Lecture 2/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form II
- 12:00-13:00. Lunch
- 13:00-14:15. Course I - Lecture 3. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form III
Zoom recording
14:15-14:45. Tea and Coffee
- 14:45-16:00. Course I – Lecture 4/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form IV
Wednesday, July 31
- 9:00-10:15. Course II – Lecture 5. Ugur Abdulla, Harnack inequality, interior estimates of derivatives and convergence theorems.
- 10:30-11:45. Course II – Lecture 6/ als. Ugur Abdulla, Superharmonic functions
- 12:00-13:00. Lunch
- 13:00-14:00 Plenary Lecture: Gui-Qiang Chen, Entropy Analysis and Singularities of Solutions for Nonlinear Hyperbolic Conservation Laws
- 14:00-14:30 Tea and Coffee
- 14:30-15:45. Course I - Lecture 5. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form V
- 16:00-17:00. Course I – Lecture 6/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form VI
Thursday, August 1
- 9:00-10:15. Course II – Lecture 7. Ugur Abdulla, Superharmonic function minimum principle. Perron's method
- 10:30-11:45. Course II – Lecture 8/ als. Ugur Abdulla, Boundary regularity of harmonic functions. The criterion for uniqueness.
(Video Recording)
12:00-13:00. Lunch
- 13:00-14:15. Course I - Lecture 7. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form VII
- 14:15-14:45 Tea and Coffee
- 14:45-16:00. Course I – Lecture 8/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form VIII
Friday, August 2
- 9:00-10:15. Course II – Lecture 9. Ugur Abdulla, Boundary regularity and barrier, Bouligand's theorem.
- 10:30-11:45. Course II – Lecture 10/ als. Ugur Abdulla, Exterior cone condition for the boundary regularity. Example of boundary irregularity - Lebesgue's cusp.
- 12:00-13:00. Lunch
- 13:00-14:00 Plenary Lecture: Juan Manfredi, Analysis and nonlinear PDE in the Heisenberg Group
- 14:00-14:30 Tea and Coffee
- 14:30-15:45. Course I - Lecture 9. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form IX
- 16:00-17:00. Course I – Lecture 10/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form X
Saturday, August 3
- Field trip to Naha, Okinawa.
Sunday, August 4
- Free day
Monday, August 5
- 9:00-10:15. Course I - Lecture 11. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XI
- 10:30-11:45. Course I – Lecture 12/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XII
- 12:00-13:00. Lunch
- 13:00-14:00 Plenary Lecture: Lawrence C Evans, Streamlines and "Soft Shocks" for the Infinity Laplacian
- 14:00-14:30 Tea and Coffee
- 14:30-15:45. Course II – Lecture 11. Ugur Abdulla, Newtonian potential and Capacity.
(Zoom recording)
16:00-17:00. Course II – Lecture 12/als. Ugur Abdulla, Existence and uniqueness of the capacitary measure for the compact sets. Properties of equilibrium measures and their potentials. Wiener's criterion for the boundary regularity.
Tuesday, August 6
- 9:00-10:15. Course I - Lecture 13. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XIII
- 10:30-11:45. Course I – Lecture 14/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XIV
- 12:00-13:00. Lunch
- 13:00-14:00 Plenary Lecture: Lawrence C Evans, Weak convergence methods and limits of solutions to nonlinear differential equations
- 14:00-14:30 Tea and Coffee
- 14:30-15:45. Course II – Lecture 13. Ugur Abdulla, Wiener crieterion at \(\infty\) for the unique solvability of the Dirichlet problem in arbitrary open sets (Abdulla, 2007). Proof of the irregularity of \(\infty\) and non-uniqueness under the convergence of Wiener series at \(\infty\).
16:00-17:00. Course II – Lecture 14/als. Ugur Abdulla, Wiener crieterion at \(\infty\) for the unique solvability of the Dirichlet problem in arbitrary open sets (Abdulla, 2007). Proof of the regularity of \(\infty\) and uniqueness under the divergence of Wiener series at \(\infty\).
Wednesday, August 7
- 9:00-10:15. Course II - Lecture 15. Ugur Abdulla, Heat equation and parabolic Dirichlet problem. Perron's solution. Exterior hyperbolic paraboloid condition for the boundary regularity of the finite boundary point.
- 10:30-11:45. Course I – Lecture 15. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XV
- 12:00-13:00. Lunch
- 13:00-14:00 Plenary Lecture: Ugur G. Abdulla, Kolmogorov Problem and Wiener-type criteria for the Removability of Fundamental Singularity for the Parabolic PDEs
- 14:30-21:00 Field trip to Okinawa Aquarium
Thursday, August 8
- 9:00-10:15. Course I - Lecture 16. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XVI
- 10:30-11:45 Course I – Lecture 17/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XVII
- 12:00-13:00. Lunch
- 13:00-14:15 . Course II – Lecture 16. Ugur Abdulla, Parabolic measure. Regularity of \(\infty\). Equivalency lemma: regularity of \(\infty\) is equivalent to uniqueness and the regularity of solution at \(\infty\). Exterior hyperbolic paraboloid condition at \(\infty\).
Video recording
- 14:15-14:45 Tea and Coffee
- 14:45-16:00. . Course II – Lecture 17/als. Ugur Abdulla, Heat potentials, caloric capacity and their properties. Formulation of the Wiener criterion at \(\infty\) for the heat equation.
Friday, August 9
- 9:00-10:15. Course I - Lecture 18. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XVIII
- 10:30-11:45 Course I – Lecture 19/als. Gui-Qiang Chen & Monica Torres, Measure-theoretical analysis, divergence-measure fields, and nonlinear PDEs of divergence form XIX
- 12:00-13:00. Lunch
- 13:00-14:15 . Course II – Lecture 18. Ugur Abdulla, Proof of the Wiener crieterion at \(\infty\) for the uniqueness of the bounded solutions of the parabolic Dirichlet problem (Abdulla, 2008) - Part I.
- 14:15-14:45 Tea and Coffee
- 14:45-16:00. . Course II – Lecture 19/als. Ugur Abdulla, Proof of the Wiener criterion at \(\infty\) for the uniqueness of the bounded solutions of the parabolic Dirichlet problem (Abdulla, 2008) - Part II.
Course 1: Topics covered during the 1st week (Gui-Qiang G. Chen & Monica Torres):
- Measure Theory and BV Functions.
Radon and Hausdorff measures, week convergence of measures, convolutions and representation of BV functions.
- Sets of Finite Perimeter.
Basic properties of sets of finite perimeter, structure of sets of finite perimeter, almost one-sided smooth approximation of sets of finite perimeter, the approximation of sets of finite perimeter with respect to any measure that is absolutely continuous with respect to the co-dimension-one Hausdorff measure, the main approximation results.
- Smooth One-Side Approximations to General Open Sets.
Smooth one-side approximations of the boundaries of general open Sets, smooth regular one-side deformation of the boundaries of Lipschitz open sets.
4. Divergence-Measure Fields.
Basic properties, product rules for divergence-measure fields, etc.
Course 1: Topics covered during the 2nd week (Gui-Qiang G. Chen & Monica Torres):
5. Divergence-Measure Fields in L∞
The Gauss-Green formula over sets of finite perimeter, the divergence-measures of jump sets via the normal traces, consistency of the normal traces with the classical traces, extensions of divergence-measure fields, Gauss-Green formula over general open sets.
6. Divergence-Measure Fields in Lp and the Space of Radon Measures
Gauss-Green formula over Lipschitz domains, Gauss-Green formula over general open sets, etc.
7. Cauchy Flux, Balance Laws, and Entropy Solutions.
Cauchy fluxes and divergence-measure fields, mathematical formulation of the balance law and derivation of systems of balance laws, entropy solutions of hyperbolic conservation laws, applications of divergence-measure fields to conservation laws.
Course 2: Topics covered during the 1st week ( Ugur Abdulla ):
5. Perron’s method for the Laplacian.
Harmonic functions, Gauss mean value formula, superharmonic functions, solution of the Dirichlet problem for Euclidean balls, the Poisson kernel, generalized solution of the Dirichlet problem in the sense of Perron-Wiener-Brelot, boundary behavior of the PWB solution, ouligand’s theorem.
6. Perron’s method for the Heat operator.
The parabolic maximum principle, mean value theorem for caloric, super- and subcaloric functions, the existence of a basis of resolutive open sets for the Heat operator, convergence theorems and parabolic Harnack inequality, PWB solutions for the parabolic Dirichlet problem.
Course 2: Topics covered during the 2nd week (Ugur Abdulla):
7. Wiener criterion at \(\infty\) for the Laplace equation.
Newtonian potentials, Newtonian capacity, minimization of energy functional in Hilbert space setting, Wiener criterion at finite boundary points, geometric tests for boundary regularity, harmonic measure, regularity of \(\infty\), Wiener criterion for the regularity of \(\infty\), fine topology, asymptotic laws for the Brownian motion
8. Wiener criterion at \(\infty\)for the heat equation:
Thermal potentials, thermal capacity, geometric iterated logarithm test, parabolic measure, regularity of \(\infty\), boundary Harnack inequality for the heat equation, proof of the Wiener criterion at \(\infty\) for the heat equation, measure-theoretical, topological and probabilistic consequences of the Wiener test at \(\infty\).
Prerequisites:
- Basic Measue Theory, Distribution Theory, Sobolve Spaces, Functional Analysis
- In the Graduate Textbook: Lawrence C. Evans, Partial Differential Equations, AMS, 2nd edition, 2010:
- Reviewing calculus facts outlined in Appendix C: Calculus
- Reviewing facts outlined in Appendices D and E: Fundational Analysis and Measure Theory
- Review Section 2.2. Laplace’s Equation; and Section 2.3. Heat Equation;
- Solve exercises 2-17 from Section 2.3 Problems.
- Review Section 2.4, Section 3, and Section 5
Math Subject Clasification numbers:
Course 1: Primary: 28C05; 26B20; 28A05; 26B12; 35L65; 35L67, 35L50, 76A02, 35D30; 76L05; Secondary: 28A75; 28A25; 26B05; 26B30; 26B40; 35M30; 35B35; 35B40; 74J40.
Key Words: divergence-measure fields; PDE of divergence form; nonlinear conservation laws; hyerbolic conservation laws; sets of finite perimeter; BV functions; approximation; sets with Lipschitz boundary;open sets; Cauchy flux; balance laws; entropy solutions; foundation of continuum mechanics.
Course 2: Primary: 35J05; 35J25; 35K05; 35K20; 31C05; 31C15; 31C40; 31D05; 31A15; Secondary: 60J45; 60J65;54C50; 30C85; 32U20.
Key words: potential theory; elliptic and parabolic PDEs; Laplace equation; heat equation; Dirichlet problem; super- and subharmonic functions; Wiener criterion; boundary regularity; regularity (or irregularity) of \(\infty\); caloric function; super- and subcaloric functions; harmonic measure; parabolic measure; capacity; Newtonian potential; thermal capacity; thermal potential; Radon measure; fine topology; Brownian motion; Wiener processes;
Location description: The description of the facilities for the SGS is given in the following link
Title and Abstract of Plenary Lectures
July 31(Wed) 13:00 - 14:00 . Prof. Gui-Qiang G. Chen (University of Oxford)
Title: Entropy Analysis and Singularities of Solutions for Nonlinear Hyperbolic Conservation Laws
Abstract: In this talk, we present some reflections and recent developments in solving several longstanding open problems involving the singularities of entropy solutions for nonlinear hyperbolic conservation laws and related nonlinear partial differential equations through entropy analysis and associated methods. These problems especially include the minimal entropy conditions for well-posedness, the understanding of the phenomena of cavitation/decavitation and concentration/deconcentration, and the rigorous analysis for entropy solutions via the theory of divergence-measure fields, among others. Further related topics, perspectives, and open problems will also be addressed.
Aug.2(Fro) 13:00 - 14:00 Prof. Juan J. Manfredi (University of Pittsburgh)
Title: Analysis and nonlinear PDE in the Heisenberg Group
Abstract: The Heisenberg group H has a rich history originating in quantum mechanics. It is the simplest non-commutative nilpotent Lie group. It provides the analytic and geometric structure to study degenerate partial differential equations.
This lecture begins with an introduction to the Heisenberg group, starting with the basic definitions and theorems. We then move to partial differential equations. Topics include: the horizontal Laplacian, horizontal Mean Value Gauss-Koebe formula, Brownian motion Viscosity solutions the p-Laplacian, and Tug of War.
Aug.5 (Mon) 13:00 - 14:00 Prof. Lawrence C Evans (University of California, Berkeley)
Title: Streamlines and "Soft Shocks" for the Infinity Laplacian PDE
Abstract: I will first discuss how to linearize the two-dimensional Infinity Laplacian PDE, a very strange nonlinear equation arising from sup-norm variational problems.
I will then show how this linearization lets us describe in some detail the geometry of gradient streamlines and their intersections at cusps, forming patterns of ``soft shocks''.
Aug. 6 (Tue) 13:00 - 14:00 Prof. Lawrence C Evans (University of California, Berkeley)
Title: Weak Convergence and Limits of Solutions to Nonlinear Differntial Equations
Abstract: This will be a very informal talk, in which I will first present a brief overview of challenges and prospects for passing to limits involving solutions of nonlinear differential equations.
I will next present a fairly detailed illustration of these issues for the special case of a nonlinear inverted pendulum.
Aug. 7 (Wed) 13:00 - 14:00 Prof. Ugur Abdulla (OIST)
Title: Kolmogorov Problem and Wiener-type Criteria for the Removability of the Fundamental Singularity for the Elliptic and Parabolic PDEs
Abstract: Wiener's celebrated result on the boundary regularity of harmonic functions is one of the most beautiful and delicate results of 20th-century mathematics. It has shaped the boundary regularity theory for elliptic and parabolic PDEs and has become a central result in the development of potential theory at the intersection of functional analysis, PDE, probability and measure theories. This talk will address themajor problem in the Analysis of PDEs on the nature of singularities reflecting the natural phenomena. I will present my solution of the Kolmogorov's Problem (1928) expressed in terms of the new Wiener-type criterion for the removability of the fundamental singularity for the heat equation. The new concept of regularity or irregularity of singularity point for the parabolic (or elliptic) PDEs is defined according to whether or not the caloric (or harmonic) measure of the singularity point is null or positive. The new Wiener-type criterion precisely characterizes the uniqueness of boundary value problems with singular data, reveal the nature of the harmonic or caloric measure of the singularity point, asymptotic laws for the conditional Markov processes, and criteria for thinness in minimal-fine topology. The talk will end with the description of some outstanding open problems and perspectives of the development of the potential theory of nonlinear elliptic and parabolic PDEs.