AbstractMost results in multiplicative complexity assume that the functions to be computed are in the field of constants extended by indeterminates, that is, the variables satisfy no algebraic relation. In this paper we extend some of the known results to the case that some of the variables do satisfy some algebraic relations. We then apply these results to obtaining a lower bound on the multiplicative complexity of the Discrete Fourier Transform. In the special case of computing the Discrete Fourier Transform of a prime number of points, the lower bound is actually attainable
AbstractThe complexity of the multiplication operation in finite fields is of interest for both theo...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractMost results in multiplicative complexity assume that the functions to be computed are in th...
AbstractWe show how to compute the multiplicative complexity of the Discrete Fourier Transform on an...
AbstractMultiplicative character theory will be used to reprove results from a paper of Auslander-Fe...
AbstractWe obtain the multiplicative complexity of discrete cosine transforms in all cases. It is gi...
AbstractBy generalizing the algebraic discrete Fourier transform (ADFT) for finite commutative rings...
AbstractThe classical structure theory of an (associative unitary) algebra A over a field F is invok...
AbstractComplexity measures for sequences of elements of a finite field play an important role in cr...
AbstractFrom the existence of algebraic function fields having some good properties, we obtain some ...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
The book introduces new techniques which imply rigorous lower bounds on the complexity of some numbe...
In this thesis we consider the boolean elementary symmetric functions over a field with characterist...
AbstractWe prove new lower bounds for the complexity of polynomials, e.g., for polynomials with 0–1-...
AbstractThe complexity of the multiplication operation in finite fields is of interest for both theo...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractMost results in multiplicative complexity assume that the functions to be computed are in th...
AbstractWe show how to compute the multiplicative complexity of the Discrete Fourier Transform on an...
AbstractMultiplicative character theory will be used to reprove results from a paper of Auslander-Fe...
AbstractWe obtain the multiplicative complexity of discrete cosine transforms in all cases. It is gi...
AbstractBy generalizing the algebraic discrete Fourier transform (ADFT) for finite commutative rings...
AbstractThe classical structure theory of an (associative unitary) algebra A over a field F is invok...
AbstractComplexity measures for sequences of elements of a finite field play an important role in cr...
AbstractFrom the existence of algebraic function fields having some good properties, we obtain some ...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
The book introduces new techniques which imply rigorous lower bounds on the complexity of some numbe...
In this thesis we consider the boolean elementary symmetric functions over a field with characterist...
AbstractWe prove new lower bounds for the complexity of polynomials, e.g., for polynomials with 0–1-...
AbstractThe complexity of the multiplication operation in finite fields is of interest for both theo...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...