AbstractScale invariance is a property shared by the operational operators xD, Dx and a whole class of linear operators. We give a complete characterization of this class and derive some of the common properties of its members. As an application, we show that a number of classical combinatorial results, such as Boole's additive formula or the Akiyama–Tanigawa transformation, can be derived in this setting
Scale invariance is a property shared by many covariance structure models employed in practice. An e...
Additive representation theory on subsets of Cartesian products has characteristics different from a...
Scale invariance refers to aspects of visual perception that remain constant with changes in viewing...
AbstractScale invariance is a property shared by the operational operators xD, Dx and a whole class ...
Abstract. The invariant and reducing subspaces of composition operators, multiplication operators an...
A frequent motivation for the use of Scale Invariance in the bankruptcy literature is that it impose...
In this paper we consider multipliers satisfying some invariance con-ditions coming from O(p, q). We...
The notion of multi-scale representation is essential to many aspects of early visual processing. Th...
It is well known that cyclic codes are very useful because of their applications, since they are not...
Abstract. Let {Dn} be a sequence of bounded invertible operators on Hilbert space H. It is shown tha...
textabstractAdditive representation theory on subsets of Cartesian products has characteristics diff...
ABSTRACT:- TThe paper introduces the concepts of covariance differences of a sequence and establishe...
Abstract Scales are a fundamental concept of musical practice around the world. They commonly exhib...
We study invariants under gauge transformations of linear partial differential operators on two vari...
Many significant research areas of contemporary analysis lie in noncommutative general-isations of m...
Scale invariance is a property shared by many covariance structure models employed in practice. An e...
Additive representation theory on subsets of Cartesian products has characteristics different from a...
Scale invariance refers to aspects of visual perception that remain constant with changes in viewing...
AbstractScale invariance is a property shared by the operational operators xD, Dx and a whole class ...
Abstract. The invariant and reducing subspaces of composition operators, multiplication operators an...
A frequent motivation for the use of Scale Invariance in the bankruptcy literature is that it impose...
In this paper we consider multipliers satisfying some invariance con-ditions coming from O(p, q). We...
The notion of multi-scale representation is essential to many aspects of early visual processing. Th...
It is well known that cyclic codes are very useful because of their applications, since they are not...
Abstract. Let {Dn} be a sequence of bounded invertible operators on Hilbert space H. It is shown tha...
textabstractAdditive representation theory on subsets of Cartesian products has characteristics diff...
ABSTRACT:- TThe paper introduces the concepts of covariance differences of a sequence and establishe...
Abstract Scales are a fundamental concept of musical practice around the world. They commonly exhib...
We study invariants under gauge transformations of linear partial differential operators on two vari...
Many significant research areas of contemporary analysis lie in noncommutative general-isations of m...
Scale invariance is a property shared by many covariance structure models employed in practice. An e...
Additive representation theory on subsets of Cartesian products has characteristics different from a...
Scale invariance refers to aspects of visual perception that remain constant with changes in viewing...
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