Add to ORKGThe so-called l0 pseudonorm on the Euclidean space Rd counts the number of nonzero components of a vector. We say that a sequence of norms is strictly increasingly graded (with respect to the l0 pseudonorm) if it is nondecreasing and that the sequence of norms of a vector~x becomes stationary exactly at the index l0(x). In this paper, with any (source) norm, we associate sequences of generalized top-k and k-support norms, and we also introduce the new class of orthant-strictly monotonic norms (that encompasses the lp norms, but for the extreme ones). Then, we show that an orthant-strictly monotonic source norm generates a sequence of generalized top-k norms which is strictly increasingly graded. With this, we provide a systematic way to gen...
AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” t...
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
We introduce a linearly ordered set Z and use it to prove a necessity condition for the existence of...
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. We say that a...
The so-called l0 pseudonorm on the Euclidean space Rd counts the number of nonzero components of a...
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. It is used in...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. It is used in...
International audienceThe so-called l0 pseudonorm, or cardinality function, counts the number of non...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” t...
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
We introduce a linearly ordered set Z and use it to prove a necessity condition for the existence of...
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. We say that a...
The so-called l0 pseudonorm on the Euclidean space Rd counts the number of nonzero components of a...
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. It is used in...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
The so-called l0 pseudonorm on Rd counts the number of nonzero components of a vector. It is used in...
International audienceThe so-called l0 pseudonorm, or cardinality function, counts the number of non...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
In this paper, we propose a unified theory for convex structured sparsity-inducing norms on vectors ...
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” t...
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
We introduce a linearly ordered set Z and use it to prove a necessity condition for the existence of...