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Liouville‐type theorems for a nonlinear fractional Choquard equation
Mathematische Nachrichten, 2023AbstractIn this paper, we are concerned with the fractional Choquard equation on the whole space with , and . We first prove that the equation does not possess any positive solution for . When , we establish a Liouville type theorem saying that if then the equation has no positive stable solution.
Anh Tuan Duong +3 more
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Liouville-type theorems for semilinear elliptic systems
Nonlinear Analysis: Theory, Methods & Applications, 2012zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wang, Weimin, Hong, Li
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Liouville-type theorems for real sub-Laplacians
manuscripta mathematica, 2001Let \({\mathcal L}\) be a real sub-Laplacian on \(\mathbb{R}^N\), \(N\geq 3\), and denote by \(G= (\mathbb{R}^N,0)\) its related homogeneous group. Let \(Q\) be the homogeneous dimension of \(G\). The main result is the following generalization of the classical Harnack inequality. Let \(Q/2< p\leq\infty\).
Bonfiglioli, Andrea, Lanconelli, Ermanno
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Liouville type theorems for Hartree and Hartree–Fock equations
Nonlinear Analysis, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Jianfu Yang, Xiaohui Yu
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The submartingale property and Liouville type theorems
manuscripta mathematica, 2016zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Statistical Convergence via q-Calculus and a Korovkin’s Type Approximation Theorem
Axioms, 2022Mohammad Ayman Mursaleen +1 more
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Liouville type theorems for some nonlocal problems
2004Various nonlocal problems are considered. Using capacity methods nonexistence of positive solutions is showed.
MITIDIERI, ENZO, POHOZAEV S.
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Derivatives of symplectic eigenvalues and a Lidskii type theorem
Canadian Journal of Mathematics, 2022Tanvi Jain
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