We review classical concepts of resultants of algebraic polynomials, and we adapt some of these concepts to objects in differential algebra, such as linear differential operators and differential polynomials
AbstractFounded by J.F. Ritt, Differential Algebra is a true part of Algebra so that constructive an...
SIAM short course at 5th SIAM conference on optimization, Victoria (CA), May 19, 1996SIGLEAvailable ...
AbstractComputer algebra can be used to prove identities in the algebra of operators on polynomials ...
We review classical concepts of resultants of algebraic polynomials, and we adapt some of these conc...
Consider two differential operators L 1 = P a i d i and L 2 = P b j d j with coefficients in...
Consider two differential operators L1 = � aid i and L2 = � bjd j with coefficients in a different...
The linear complete differential resultant of a finite set of linear or-dinary differential polynomi...
A resultant is a purely algebraic criterion for determining when a finite collection of polynomials...
Founded by J. F. Ritt, Differential Algebra is a true part of Algebra so that constructive and algor...
Differential resultant formulas are defined, for a system $\cP$ of $n$ ordinary Laurent differential...
We propose two algebraic structures for treating integral operators in conjunction with derivations:...
Abstract. We establish a connection between the D-resultant of two polynomials f(t) and g(t) and the...
Let P be a system of n linear nonhomogeneous ordinary differential polynomials in a set U of n-1 dif...
Complete thesisThis thesis is essentially concerned with the connections between the classical ortho...
A matrix representation of the sparse differential resultant is the basis for efficient computation ...
AbstractFounded by J.F. Ritt, Differential Algebra is a true part of Algebra so that constructive an...
SIAM short course at 5th SIAM conference on optimization, Victoria (CA), May 19, 1996SIGLEAvailable ...
AbstractComputer algebra can be used to prove identities in the algebra of operators on polynomials ...
We review classical concepts of resultants of algebraic polynomials, and we adapt some of these conc...
Consider two differential operators L 1 = P a i d i and L 2 = P b j d j with coefficients in...
Consider two differential operators L1 = � aid i and L2 = � bjd j with coefficients in a different...
The linear complete differential resultant of a finite set of linear or-dinary differential polynomi...
A resultant is a purely algebraic criterion for determining when a finite collection of polynomials...
Founded by J. F. Ritt, Differential Algebra is a true part of Algebra so that constructive and algor...
Differential resultant formulas are defined, for a system $\cP$ of $n$ ordinary Laurent differential...
We propose two algebraic structures for treating integral operators in conjunction with derivations:...
Abstract. We establish a connection between the D-resultant of two polynomials f(t) and g(t) and the...
Let P be a system of n linear nonhomogeneous ordinary differential polynomials in a set U of n-1 dif...
Complete thesisThis thesis is essentially concerned with the connections between the classical ortho...
A matrix representation of the sparse differential resultant is the basis for efficient computation ...
AbstractFounded by J.F. Ritt, Differential Algebra is a true part of Algebra so that constructive an...
SIAM short course at 5th SIAM conference on optimization, Victoria (CA), May 19, 1996SIGLEAvailable ...
AbstractComputer algebra can be used to prove identities in the algebra of operators on polynomials ...
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