DOIAbstract
AbstractIn this paper we provide a ball separation property of bounded convex sets in a Hilbert space. As a consequence, we obtain a representation form of convex closures and two results about convex functionals
AbstractIn this paper we provide a ball separation property of bounded convex sets in a Hilbert space. As a consequence, we obtain a representation form of convex closures and two results about convex functionals
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
AbstractIn this paper we provide a ball separation property of bounded convex sets in a Hilbert spac...
Convex sets separation is very important in convex programming, a very powerful mathematical tool fo...
The separation theorems are the key results for convex programming. They are important consequences ...
AbstractLet S be a convex subset of a Banach space L, and G a subset of L∗. We prove that if G does ...
AbstractThis is the second of a series of three papers dealing with convexity spaces. In the first p...
A convex subset B of a real locally convex space X is said to have the separation property if it can...
Bounded closed convex sets in Euclidean space can be characterised by two distinct ball separation p...
The convex sets strict separation is very useful to obtain mathematical optimization results. The mi...
After presenting some structural notions on Hilbert spaces, which constitute fundamental support for...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
AbstractIn this paper we provide a ball separation property of bounded convex sets in a Hilbert spac...
Convex sets separation is very important in convex programming, a very powerful mathematical tool fo...
The separation theorems are the key results for convex programming. They are important consequences ...
AbstractLet S be a convex subset of a Banach space L, and G a subset of L∗. We prove that if G does ...
AbstractThis is the second of a series of three papers dealing with convexity spaces. In the first p...
A convex subset B of a real locally convex space X is said to have the separation property if it can...
Bounded closed convex sets in Euclidean space can be characterised by two distinct ball separation p...
The convex sets strict separation is very useful to obtain mathematical optimization results. The mi...
After presenting some structural notions on Hilbert spaces, which constitute fundamental support for...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
For a nonempty separable convex subset X of a Hilbert space H(Omega), it is typical (in the sense of...
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