Add to ORKGWe study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls Bn={x∈Rn:|x-x0|<ρ}. The quantity c(1) is known by our paper [F.G. Avkhadiev, K.-J. Wirths, Unified Poincaré and Hardy inequalities with sharp constants for convex domains, ZAMM Z. Angew. Math. Mech. 87 (8-9) 26 (2007) 632-642]. In the present paper we prove the estimate c(2)≥2 and the assertion limn→∞c(n)n2=14, which gives that the known lower estimates in [G. Barbatis, S. Filippas, and A. Tertikas in Comm. Cont. Math. 5 (2003), no. 6, 869-881] for c(n),n≥3, are asymptotically sharp as n→∞. Also, for the 3-dimensional ball B30={x∈R3:|x|<1} we obtain a new Brezis-Marcus type inequality which contains two parameters m∈(0,∞), ν∈(0,1/m) and has th...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
AbstractWe study the best possible constants c(n) in the Brezis–Marcus inequalities ∫Bn|∇u|2dx≥14∫Bn...
For each natural number n and any bounded, convex domain Ω ⊂ R n we characterize the sharp constant ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
AbstractLet ‖·‖ be the weighted L2-norm with Laguerre weight w(t)=tαe−t, α>−1. Let Pn be the set of ...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
We study the best possible constants c(n) in the Brezis-Marcus inequalities for u∈H01(Bn) in balls B...
AbstractWe study the best possible constants c(n) in the Brezis–Marcus inequalities ∫Bn|∇u|2dx≥14∫Bn...
For each natural number n and any bounded, convex domain Ω ⊂ R n we characterize the sharp constant ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...
AbstractLet ‖·‖ be the weighted L2-norm with Laguerre weight w(t)=tαe−t, α>−1. Let Pn be the set of ...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
Balls are shown to have the smallest optimal constant, among all admissible Euclidean domains, in Po...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
© 2019, Sobolev Institute of Mathematics. Hardy-type inequalities with an additional term are proved...
Let Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove the inequ...