Grube F, Hensiek T. Maximum principle for stable operators. Mathematische Nachrichten. 2023.We prove a weak maximum principle for nonlocal symmetric stable operatorsincluding the fractional Laplacian. The main focus of this work is on minimalregularity assumptions of the functions under consideratio
In this thesis we deal with maximum principles for a class of linear, degenerate elliptic differenti...
We give a unified approach to strong maximum principles for a large class of nonlocal operators of ...
We prove a strong maximum principle for Schrödinger operators defined on a class of postcritically f...
We study the validity of the comparison and maximum principles and their relation with principal eig...
This paper is devoted to the study of maximum principles holding for some nonlocal diffusion operato...
Abstract. In this note, we study the existence of a strong maximum principle for the nonlocal operat...
We study different maximum principles for non-local non-linear operators with non-standard growth th...
We study the existence and positivity of solutions to problems involving higher-order fractional Lap...
In this paper we study the strong maximum principle for equations of the form F[u] = H(u, |Du|) wher...
We develop a systematic study of the superpositions of elliptic operators with different orders, mix...
A class of linear operators L + lambda I between suitable function spaces is considered, when 0 is a...
In this note, we prove a strong maximum principle for weak supersolutions of (−Δ)psu+(−Δ)qsu+c(x)(|u...
We establish a maximum principle for the weighted $(p,q)$-Laplacian, which extends the general Pucci...
We investigate and prove the validity of the maximum principle in narrow, possibly unbounded domains...
In these notes we prove some versions of the maximum principle and some applications, particularly u...
In this thesis we deal with maximum principles for a class of linear, degenerate elliptic differenti...
We give a unified approach to strong maximum principles for a large class of nonlocal operators of ...
We prove a strong maximum principle for Schrödinger operators defined on a class of postcritically f...
We study the validity of the comparison and maximum principles and their relation with principal eig...
This paper is devoted to the study of maximum principles holding for some nonlocal diffusion operato...
Abstract. In this note, we study the existence of a strong maximum principle for the nonlocal operat...
We study different maximum principles for non-local non-linear operators with non-standard growth th...
We study the existence and positivity of solutions to problems involving higher-order fractional Lap...
In this paper we study the strong maximum principle for equations of the form F[u] = H(u, |Du|) wher...
We develop a systematic study of the superpositions of elliptic operators with different orders, mix...
A class of linear operators L + lambda I between suitable function spaces is considered, when 0 is a...
In this note, we prove a strong maximum principle for weak supersolutions of (−Δ)psu+(−Δ)qsu+c(x)(|u...
We establish a maximum principle for the weighted $(p,q)$-Laplacian, which extends the general Pucci...
We investigate and prove the validity of the maximum principle in narrow, possibly unbounded domains...
In these notes we prove some versions of the maximum principle and some applications, particularly u...
In this thesis we deal with maximum principles for a class of linear, degenerate elliptic differenti...
We give a unified approach to strong maximum principles for a large class of nonlocal operators of ...
We prove a strong maximum principle for Schrödinger operators defined on a class of postcritically f...
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