Add to ORKGWe show that there exists an interesting non-uniform model of computational complexity within characteristic-two finite fields. This model regards all problems as families of functions whose domain and co-domain are characteristic-two fields. The model is both a structured and a fully general model of computation.We ask if the same is true when the characteristics of the fields are unbounded. We show that this is equivalent to asking whether arithmetic complexity over the prime fields is a fully general measure of complexity.We show that this reduces to whether or not a single canonical function is ''easy'' to compute using only modulo p arithmetic.We show that the arithmetic complexity of the above function is divided between two other...
AbstractWe present a method for multiplication in finite fields which gives multiplication algorithm...
This dissertation presents several results at the intersection ofcomplexity theory and algorithm des...
International audienceThis series of lectures concentrates on deterministic algorithms for finite fi...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
AbstractBinary representations of finite fields are defined as an injective mapping from a finite fi...
This handout covers some basic properties of finite fields that will be needed in the course and may...
We relate the arithmetic straight-line complexity over a field GF(p) (p is a prime) of the parity fu...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Recent studies of computational complexity have focused on “axioms” which characterize the “difficul...
We introduce a natural set of arithmetic expressions and define the complexity class AE to consist ...
We study the complexity of arithmetic in finite fields of characteristic two, F2n. We concentrate on...
We present a method for multiplication in finite fields which gives multiplication algorithms with i...
AbstractBinary representations of finite fields are defined as an injective mapping from a finite fi...
This series of lectures concentrates on deterministic algorithms for finite fields. The emphasis is ...
AbstractFrom the existence of algebraic function fields having some good properties, we obtain some ...
AbstractWe present a method for multiplication in finite fields which gives multiplication algorithm...
This dissertation presents several results at the intersection ofcomplexity theory and algorithm des...
International audienceThis series of lectures concentrates on deterministic algorithms for finite fi...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
AbstractBinary representations of finite fields are defined as an injective mapping from a finite fi...
This handout covers some basic properties of finite fields that will be needed in the course and may...
We relate the arithmetic straight-line complexity over a field GF(p) (p is a prime) of the parity fu...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Recent studies of computational complexity have focused on “axioms” which characterize the “difficul...
We introduce a natural set of arithmetic expressions and define the complexity class AE to consist ...
We study the complexity of arithmetic in finite fields of characteristic two, F2n. We concentrate on...
We present a method for multiplication in finite fields which gives multiplication algorithms with i...
AbstractBinary representations of finite fields are defined as an injective mapping from a finite fi...
This series of lectures concentrates on deterministic algorithms for finite fields. The emphasis is ...
AbstractFrom the existence of algebraic function fields having some good properties, we obtain some ...
AbstractWe present a method for multiplication in finite fields which gives multiplication algorithm...
This dissertation presents several results at the intersection ofcomplexity theory and algorithm des...
International audienceThis series of lectures concentrates on deterministic algorithms for finite fi...