●PREFACE
PREFACE TO REVISED EDITION
Chapter Ⅰ INTRODUCTION
1.Outline of this book
2.Further remarks
3.Notation
Chapter Ⅱ MAXIMUM PRINCIPLES
Introduction
I.The weak maximum principle
2.The strong maximum principle
3.A priori estimates
Notes
Exercises
Chapter Ⅲ INTRODUCTION TO THE THEORY OF WEAK SOLUTIONS
Introduction
1.The theory of weak derivatives
2.The method of continuity
3.Problems in small balls
4.Global existence and the Perron process
Notes
Exercises
Chapter Ⅳ HOLDER ESTIMATES
Introduction
1.Ho1der continuity
2.Campanato spaces
3.Interior estimates
4.Estimates near a flat boundary
5.Regularized distance
6.Intermediate Schauder estimates
7.Curved boundaries and nonzero boundary data
8.Two special mixed problems
Notes
Exercises
Chapter Ⅴ EXISTENCE, UNIQUENESS AND REGULARITY OF SOLUTIONS
Introduction
1.Uniqueness of solutions
2.The Cauchy-Dirichlet problem with bounded coefficients
3.The Cauchy-Dirichlet problem with unbounded coefficients
4.The oblique derivative problem
Notes
Exercises
Chapter Ⅵ FURTHER THEORY OF WEAK SOLUTIONS
Introduction
1.Notation and basic results
2.Differentiability of weak solutions
3.Sobolev inequalities
4.Poincarf's inequality
5.Global boundedness
6.Local estimates
7.Consequences of the local estimates
8.Boundary estimates
9.More Sobolev-type inequalities
10.Conormal problems
11.A special mixed problem
12.Solvability in H61der spaces
13.The parabolic DeGiorgi classes
Notes
Exercises
Chapter Ⅶ STRONG SOLUTIONS
Introduction
1.Maximum principles
2.Basic results from harmonic analysis
3.Lp estimates for constant coefficient divergence structure equations
4.Interior Lp estimates for solutions of nondivergence form constant coefficient equations
5.An interpolation inequality
6.Interior Lp estimates
7.Boundary and global estimates
8.Wp2,1 estimates for the oblique derivative problem
9.The local maximum principle
10.The weak Harnack inequality
11.Boundary estimates
Notes
Exercises
Chapter Ⅷ FIXED POINT THEOREMS AND THEIR APPLICATIONS
Introduction
1.The Schauder fixed point theorem
2.Applications of the Schauder theorem
3.A theorem of Caristi and its applications
Notes
Exercises
Chapter Ⅸ COMPARISON AND MAXIMUM PRINCIPLES
Introduction
I.Comparison principles
2.Maximum estimates
3.Comparison principles for divergence form operators
4.The maximum principle for divergence form operators
Notes
Exercises
Chapter Ⅹ BOUNDARY GRADIENT ESTIMATES
Introduction
1.The boundary gradient estimate in general domains
2.Convex-increasing domains
3.The spatial distance function
4.Curvature conditions
5.Nonexistence results
6.The case of one space dimension
7.Continuity estimates
Notes
Exercises
Chapter Ⅺ GLOBAL AND LOCAL GRADIENT BOUNDS
Introduction
1.Global gradient bounds for general equations
2.Examples
3.Local gradient bounds
4.The Sobolev theorem of Michael and Simon
5.Estimates for equations in divergence form
6.The case of one space dimension
7.A gradient bound for an intermediate situation
Notes
Exercises
Chapter Ⅻ HOLDER GRADIENT ESTIMATES AND EXISTENCE THEOREMS
Introduction
1.Interior estimates for equations in divergence form
2.Equations in one space dimension
3.Interior estimates for equations in general form
4.Boundary estimates
5.Improved results for nondivergence equations
6.Selected existence results
Notes
Exercises
Chapter ⅩⅢ THE OBLIQUE DERIVATIVE PROBLEM FOR QUASILINEAR PARABOLIC EQUATIONS
Introduction
1.Maximum estimates
2.Gradient estimates for the conormal problem
3.Gradient bounds for uniformly parabolic problems in general form
4.The H61der gradient estimate for the conormal problem
5.Nonlinear boundary conditions with linear equations
6.The H61der gradient estimate for quasilinear equations
7.Existence theorems
Notes
Exercises
Chapter ⅩⅣ FULLY NONLINEAR EQUATIONS Ⅰ. INTRODUCTION
Introduction
1.Comparison and maximum principles
2.Simple uniformly parabolic equations
3.Higher regularity of solutions
4.The Cauchy-Dirichlet problem
5.Boundary second derivative estimates
6.The oblique derivative problem
7.The case of one space dimension
Notes
Exercises
Chapter ⅩⅤ FULLY NONLINEAR EQUATIONS Ⅱ. HESSIAN EQUATIONS
Introduction
1.General results for Hessian equations
2.Estimates on solutions
3.Existence of solutions
4.Properties of symmetric polynomials
5.The parabolic analog of the Monge-Ampere equation
Notes
Exercises
Bibliography
Index

1977年，德國Springer出版了《二階橢圓偏微分方程》（Elliptic Partial Differential Equations of Second Order，D.Gilbarg, S.Trudinger)。20年之後的1996年，G.M.Lieberman撰寫了《二階拋物微分方程》，成為《二階橢圓偏微分方程》的姊妹篇。幾十年來，這兩部書的均成為受讀者歡迎的經典教科書。本書目次：導論；極大值原理；弱解理論導論；赫爾德估計；解的存在性、惟一性和解的正則性；再論弱解理論；強解；定點定理及其應用；比較原理和極大值原理；邊界梯度估計；全局和局部梯度邊界；赫爾德梯度估計和存在性定理；擬線性拋物方程用的斜微商問題；一般非線性方程。讀者對像：數學繫高年級本年生及研究生。