In this paper, we give sharp estimates of the smallest principal curvature k1 of level sets of n-dimensional p-harmonic functions which extends the result of 2-dimensional minimal surface case due to Longinetti [Longinetti, On minimal surfaces bounded b
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
[[abstract]]It is important and interesting to study harmonic functions on a Riemannian manifold. In...
It is known that the L2L2-norms of a harmonic function over spheres satisfy some convexity inequalit...
The convexity of level sets of solutions to the mean curvature equation is a long standing open prob...
Let u = (u1; : : : ; un) be a p-harmonic mapping in a domain Ω Rn for n 2. We investigate level se...
Abstract. In this paper we study conformal properties of properly embedded minimal surfaces in flat ...
We prove the convexity of the set which is delimited by the free bound- ary corresponding to a quasi...
ABSTRACT. – We prove the convexity of the set which is delimited by the free boundary corresponding ...
Abstract. In this paper, we study the family C0H of sense-preserving complex-valued harmonic functio...
We prove the convexity of the set which is delimited by the free bound- ary corresponding to a quasi...
We prove a growth theorem for a function to belong to the class Sigma(mu; a) and generalize a Weiers...
Abstract. We prove the convexity of the set which is delimited by the free bound-ary corresponding t...
Abstract. In 1984, Clunie and Sheil-Small proved that a sense-preserving harmonic function whose ana...
Consider an open Riemann surface R of Heins type, i.e., a parabolic Riemann surface with a single id...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
[[abstract]]It is important and interesting to study harmonic functions on a Riemannian manifold. In...
It is known that the L2L2-norms of a harmonic function over spheres satisfy some convexity inequalit...
The convexity of level sets of solutions to the mean curvature equation is a long standing open prob...
Let u = (u1; : : : ; un) be a p-harmonic mapping in a domain Ω Rn for n 2. We investigate level se...
Abstract. In this paper we study conformal properties of properly embedded minimal surfaces in flat ...
We prove the convexity of the set which is delimited by the free bound- ary corresponding to a quasi...
ABSTRACT. – We prove the convexity of the set which is delimited by the free boundary corresponding ...
Abstract. In this paper, we study the family C0H of sense-preserving complex-valued harmonic functio...
We prove the convexity of the set which is delimited by the free bound- ary corresponding to a quasi...
We prove a growth theorem for a function to belong to the class Sigma(mu; a) and generalize a Weiers...
Abstract. We prove the convexity of the set which is delimited by the free bound-ary corresponding t...
Abstract. In 1984, Clunie and Sheil-Small proved that a sense-preserving harmonic function whose ana...
Consider an open Riemann surface R of Heins type, i.e., a parabolic Riemann surface with a single id...
Abstract: "We develop a level set theory for the mean curvature evolution of surfaces with arbitrary...
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
[[abstract]]It is important and interesting to study harmonic functions on a Riemannian manifold. In...
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