Add to ORKGWe discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexistence result for solutions for some nonlinear elliptic equations having measure data, the second one to a capacitary estimate useful for proving an extension, due to J. Mal\'y, D. Swanson and W. P. Ziemer [Trans. Amer. Math. Soc. 355 (2003), no. 2, 477--492 (electronic); MR1932709 (2004a:46037)], of the area and co-area formula
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
Abstract. We study the sequence un, which is solution of −div(a(x,run)) + ′′(junj)un = fn + gn in Ω ...
We study the sequence un, which is solution of $-{\rm div}(a(x,{\nabla}u_n)) + \Phi''(|u_n|)\,u_n= ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence un, which is solution of −div(a(x,∇un))+ Φ′′(|un|)un = fn + gn in Ω an open bo...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
We discuss two applications of the notion of Orlicz capacity. The first one is related to a nonexist...
Abstract. We study the sequence un, which is solution of −div(a(x,run)) + ′′(junj)un = fn + gn in Ω ...
We study the sequence un, which is solution of $-{\rm div}(a(x,{\nabla}u_n)) + \Phi''(|u_n|)\,u_n= ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence un, which is solution of −div(a(x,∇un))+ Φ′′(|un|)un = fn + gn in Ω an open bo...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
We study the sequence u(n), which is solution of -div(a(x, del u(n))) + Phi" (\u(n)\) u(n) = f(n) + ...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
In this paper a new relation between a capacity of second order and an Orlicz capacity of first orde...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...
We define Orlicz-Sobolev spaces on an arbitrary metric space with a Borel reg-ular outer measure, an...