We prove unique continuation and maximum modulus principle for solutions to systems of differential equations and inequalities, involving complex vector fields, under conditions that generalize some weak-pseudoconcavity assumptions for the tangential Cauchy-Riemann complex
Much of this paper will be concerned with the proof of the following Theorem 1. Suppose d = 3, r = m...
We prove that a smooth generic embedded CR submanifold of C^n obeys the maximum principle for contin...
This paper is concerned with the maximum principle for subsolutions of second-order linear elliptic...
We prove unique continuation and maximum modulus principle for solutions to systems of differential ...
Abstract. We present an extension of Jensen’s uniqueness theorem for viscosity solutions of second o...
Abstract. We present an extension of Jensen’s uniqueness theorem for viscosity solutions of second o...
AbstractWe prove suitable versions of the weak maximum principle and of the maximum propagation for ...
AbstractA complex Banach space X is complex strictly convex if and only if X-valued analytic functio...
AbstractNecessary and sufficient conditions for uniqueness of analytic continuation are investigated...
We discuss continuation and uniqueness of solutions to the Cauchy problem for a three dimensional Mi...
Abstract. We prove some quantitative versions of the Thorp-Whitley max-imum modulus principle as wel...
AbstractThis work presents results on the boundary properties of solutions of a complex, planar, smo...
AbstractSuppose M is a C∞ real k-dimensional CR-submanifold of Cn, n > 1, and suppose that ∂̄t6M is ...
The aim of this paper is to study a new equivalent form of the weak maximum principle for a large cl...
The main goal of this book is to present results pertaining to various versions of the maximum princ...
Much of this paper will be concerned with the proof of the following Theorem 1. Suppose d = 3, r = m...
We prove that a smooth generic embedded CR submanifold of C^n obeys the maximum principle for contin...
This paper is concerned with the maximum principle for subsolutions of second-order linear elliptic...
We prove unique continuation and maximum modulus principle for solutions to systems of differential ...
Abstract. We present an extension of Jensen’s uniqueness theorem for viscosity solutions of second o...
Abstract. We present an extension of Jensen’s uniqueness theorem for viscosity solutions of second o...
AbstractWe prove suitable versions of the weak maximum principle and of the maximum propagation for ...
AbstractA complex Banach space X is complex strictly convex if and only if X-valued analytic functio...
AbstractNecessary and sufficient conditions for uniqueness of analytic continuation are investigated...
We discuss continuation and uniqueness of solutions to the Cauchy problem for a three dimensional Mi...
Abstract. We prove some quantitative versions of the Thorp-Whitley max-imum modulus principle as wel...
AbstractThis work presents results on the boundary properties of solutions of a complex, planar, smo...
AbstractSuppose M is a C∞ real k-dimensional CR-submanifold of Cn, n > 1, and suppose that ∂̄t6M is ...
The aim of this paper is to study a new equivalent form of the weak maximum principle for a large cl...
The main goal of this book is to present results pertaining to various versions of the maximum princ...
Much of this paper will be concerned with the proof of the following Theorem 1. Suppose d = 3, r = m...
We prove that a smooth generic embedded CR submanifold of C^n obeys the maximum principle for contin...
This paper is concerned with the maximum principle for subsolutions of second-order linear elliptic...
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