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Nonlocal Elliptic Boundary Value Problems
1997In this chapter we consider mainly elliptic boundary value problems with the support of nonlocal terms inside a domain Q.
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Nonlocal Boundary Value Problems for Nonuniformly Parabolic Equations
Differential Equations, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Third order boundary value problems with nonlocal boundary conditions
Nonlinear Analysis: Theory, Methods & Applications, 2009The authors consider third order boundary value problems for nonlinear ordinary differential equations with nonlocal linear boundary conditions given by Stieltjes integrals. Conditions for the existence of multiple positive solutions are studied. Fixed point considerations in cones and index theory are employed. Two illustrative examples are given.
Graef, John R., Webb, J. R. L.
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Nonlocal Boundary-Value Problems for PDE:Well-Posedness
AIP Conference Proceedings, 2004The role played by coercive inequalities in the study of local boundary‐value problems for parabolic and elliptic differential equations is well known ( see, e.g.,[14],[21]). In present paper we consider the nonlocal boundary‐value problems for parabolic and elliptic differential equations.
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On the nonlocal boundary value problem of geophysical fluid flows
, 2021Jinrong Wang +2 more
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On Solvable Nonlocal Boundary-Value Problems
1982The nonlocal models which are being used in practice can be classified with respect to the form of their static equations into three categories: the volume-integral (VIM), the volume-surface integral (VSIM), and the integro-differential models (IDM). They will be discussed in more detail later.
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Nonlocal boundary-value problems with a shift
Mathematical Notes of the Academy of Sciences of the USSR, 1985This first part of the paper deals with strongly elliptic differential- difference equations; it is an extract of an earlier paper [J. Differ. Equations 63, 332-361 (1986; Zbl 0598.35122)]. The second part applies the results of the first part to linear elliptic boundary value problems of second order. In a domain \(D=(0,d)\times G\subset {\mathbb{R}}^
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Mathematical methods in the applied sciences, 2019
In this paper, we are going to deal with the nonlocal mixed boundary value problem for the Moore‐Gibson‐Thompson equation. Galerkin method was the main used tool for proving the solvability of the given nonlocal problem.
S. Boulaaras +2 more
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In this paper, we are going to deal with the nonlocal mixed boundary value problem for the Moore‐Gibson‐Thompson equation. Galerkin method was the main used tool for proving the solvability of the given nonlocal problem.
S. Boulaaras +2 more
semanticscholar +1 more source