Add to ORKGInternational audienceThe formal integrability of systems of partial differential equations plays a fundamental role in different analysis and synthesis problems for both linear and nonlinear differential control systems. Following Spencer's theory, to test the formal integrability of a system of partial differential equations, we must study when the symbol of the system, namely, the top-order part of the linearization of the system, is 2-acyclic or involutive, i.e., when certain Spencer cohomology groups vanish. Combining the fact that Spencer cohomology is dual to Koszul homology and symbolic computation methods, we show how to effectively compute the homology modules defined by the Koszul complex of a finitely presented module over a com...
AbstractI first define Koszul modules, which are a generalization to arbitrary rank of complete inte...
We define generalized Koszul modules and rings and develop a generalized Koszul theory for $\mathbb{...
The Koszul homology algebra of a commutative local (or graded) ring R tends to reflect i...
International audienceThe formal integrability of systems of partial differential equations plays a ...
AbstractA method is given of computing the E1-terms of the Vinogradov spectral sequence of involutiv...
AbstractIf A is a differential module, then the computation of its homology may frequently be simpli...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
23 pagesInternational audienceWe extend the Koszul duality theory of associative algebras to algebra...
We generalize the notion of involutivity to systems of differential equa-tions of different orders a...
In the formal theory of partial differential equations a central issue is the Spencer cohomol-ogy [4...
v1: 29 pages; v2: 41 pages, many details added; v3: 42 pages, minor modifications (final version, to...
Let k be a field and R a standard graded k-algebra. We denote by HR the homology algebra of the Kosz...
We consider an algebraic $D$-module, i.e. a system of linear partial differential equations with pol...
This paper addresses systems of linear functional equations from an algebraic point of view. We give...
AbstractIn this paper we apply Weil bundle techniques to the study of formal integrability for syste...
AbstractI first define Koszul modules, which are a generalization to arbitrary rank of complete inte...
We define generalized Koszul modules and rings and develop a generalized Koszul theory for $\mathbb{...
The Koszul homology algebra of a commutative local (or graded) ring R tends to reflect i...
International audienceThe formal integrability of systems of partial differential equations plays a ...
AbstractA method is given of computing the E1-terms of the Vinogradov spectral sequence of involutiv...
AbstractIf A is a differential module, then the computation of its homology may frequently be simpli...
AbstractThis paper studies a new class of modules over noetherian local rings, called Koszul modules...
23 pagesInternational audienceWe extend the Koszul duality theory of associative algebras to algebra...
We generalize the notion of involutivity to systems of differential equa-tions of different orders a...
In the formal theory of partial differential equations a central issue is the Spencer cohomol-ogy [4...
v1: 29 pages; v2: 41 pages, many details added; v3: 42 pages, minor modifications (final version, to...
Let k be a field and R a standard graded k-algebra. We denote by HR the homology algebra of the Kosz...
We consider an algebraic $D$-module, i.e. a system of linear partial differential equations with pol...
This paper addresses systems of linear functional equations from an algebraic point of view. We give...
AbstractIn this paper we apply Weil bundle techniques to the study of formal integrability for syste...
AbstractI first define Koszul modules, which are a generalization to arbitrary rank of complete inte...
We define generalized Koszul modules and rings and develop a generalized Koszul theory for $\mathbb{...
The Koszul homology algebra of a commutative local (or graded) ring R tends to reflect i...