Andere Kunden interessierten sich auch für
![Introduction to Intuitionistic Fuzzy Sets and its Extensions]( "Introduction to Intuitionistic Fuzzy Sets and its Extensions")
Introduction to Intuitionistic Fuzzy Sets and its Extensions44,99 €![Strict Topological Extensions and Power-objects for b-convergence]( "Strict Topological Extensions and Power-objects for b-convergence")
Strict Topological Extensions and Power-objects for b-convergence16,99 €![Extensions Of Some Ring Theoretic Concepts To Modules: A Survey]( "Extensions Of Some Ring Theoretic Concepts To Modules: A Survey")
Extensions Of Some Ring Theoretic Concepts To Modules: A Survey36,99 €![Classical Sets and their Extensions in Non-Classical Topology]( "Classical Sets and their Extensions in Non-Classical Topology")
Classical Sets and their Extensions in Non-Classical Topology74,90 €![Stochastic Volatility Extensions of the Swap Market Model]( "Stochastic Volatility Extensions of the Swap Market Model")
Stochastic Volatility Extensions of the Swap Market Model32,99 €![Infinitesimally Central Extensions of Chevalley Groups]( "Infinitesimally Central Extensions of Chevalley Groups")
Infinitesimally Central Extensions of Chevalley Groups20,99 €![Universal Extensions and One Dimensional Crystalline Cohomology]( "Universal Extensions and One Dimensional Crystalline Cohomology")
Universal Extensions and One Dimensional Crystalline Cohomology20,99 €
The maximum principle is one of the most useful and best known tools employed in the study of partial differential equations. The maximum principle enables us to obtain information about uniqueness, approximation, boundedness and symmetry of the solution, bounds for the first eigenvalue, quantities of physical interest, necessary conditions of solvability for some boundary value problems, etc. The book is divided into two parts. Part I contains two chapters and presents the classical maximum principle for linear equations, some of its direct extensions for nonlinear equations and their applications. Part II of this book is divided into three chapters and is devoted to the P function method and its applications. The book is addressed to graduate students in mathematics and to professional mathematicians, with an interest in elliptic partial differential equations.