AbstractA behavior is a closed shift invariant subspace of the space of sequences with entries in a field k. We work out an explicit duality for k-modules. This duality is then used to derive properties of behaviors, and their noncommutative generalizations
summary:Given a topological property (or a class) $\Cal P$, the class $\Cal P^*$ dual to $\Cal P$ (w...
The K-theoretic analog of Spanier–Whitehead duality for noncommutative C*-algebras is shown to hold ...
Lambek and Rattray have developed a categorical approach to duality which encompasses many known dua...
AbstractA behavior is a closed shift invariant subspace of the space of sequences with entries in a ...
AbstractWe study the categories of discrete modules for topological rings arising as the rings of op...
AbstractThe duality for linear constant coefficient partial differential equations between behaviour...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractThe paper presents the results of the study of behavior theory as developed by J.C. Willems ...
AbstractWe study the category of discrete modules over the ring of degree-zero stable operations in ...
AbstractPrevious duality theories for discrete-time linear systems over a field K have been restrict...
International audienceWe study implicit systems of linear time-varying (LTV) difference equations wi...
AbstractWe develop a duality theory for localizations in the context of ring spectra in algebraic to...
Yassemi's "second submodules" are dualized and properties of its spectrum are studied. This is done ...
Let k be a field, and A a k-algebra. In the category of A-modules, the dual of a (faithfully) flat m...
These notes are devoted to the Local Duality Theorem for D-modules, which asserts that the topologi...
summary:Given a topological property (or a class) $\Cal P$, the class $\Cal P^*$ dual to $\Cal P$ (w...
The K-theoretic analog of Spanier–Whitehead duality for noncommutative C*-algebras is shown to hold ...
Lambek and Rattray have developed a categorical approach to duality which encompasses many known dua...
AbstractA behavior is a closed shift invariant subspace of the space of sequences with entries in a ...
AbstractWe study the categories of discrete modules for topological rings arising as the rings of op...
AbstractThe duality for linear constant coefficient partial differential equations between behaviour...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractThe paper presents the results of the study of behavior theory as developed by J.C. Willems ...
AbstractWe study the category of discrete modules over the ring of degree-zero stable operations in ...
AbstractPrevious duality theories for discrete-time linear systems over a field K have been restrict...
International audienceWe study implicit systems of linear time-varying (LTV) difference equations wi...
AbstractWe develop a duality theory for localizations in the context of ring spectra in algebraic to...
Yassemi's "second submodules" are dualized and properties of its spectrum are studied. This is done ...
Let k be a field, and A a k-algebra. In the category of A-modules, the dual of a (faithfully) flat m...
These notes are devoted to the Local Duality Theorem for D-modules, which asserts that the topologi...
summary:Given a topological property (or a class) $\Cal P$, the class $\Cal P^*$ dual to $\Cal P$ (w...
The K-theoretic analog of Spanier–Whitehead duality for noncommutative C*-algebras is shown to hold ...
Lambek and Rattray have developed a categorical approach to duality which encompasses many known dua...
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