AbstractThis is an expository account of a constructive theorem on the shortest linear recurrences of a finite sequence over an arbitrary integral domainR. A generalization of rational approximation, which we call “realization”, plays a key role throughout the paper.We also give the associated “minimal realization” algorithm, which has a simple control structure and is division-free. It is easy to show that the number ofR-multiplications required isO(n2), wherenis the length of the input sequence.Our approach is algebraic and independent of any particular application. We view a linear recurring sequence as a torsion element in a naturalR[X]-module. The standardR[X]-module of Laurent polynomials overRunderlies our approach to finite sequence...
Labeled infinite trees provide combinatorial interpretations for many integer sequences generated by...
We consider the problem of deciding ω-regular properties on infinite traces produced by linear loops...
A lower bound for the minimal length of the polynomial recurrence of a binomial sum is obtained. 200...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
AbstractWe develop a theory of minimal realizations of a finite sequence over an integral domain R, ...
AbstractWe derive an upper bound for the minimal length of a linear recurrence satisfied by a sequen...
A linear recurrence is a linear operator which maps rn into rn-1, where (rn) is a (recursive) sequen...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
Recurrence sequences are of great intrinsic interest and have been a central part of number theory f...
15 pages. Version longue, 34 pages : https://specfun.inria.fr/bostan/BoMo20.pdfInternational audienc...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
This thesis deals with fundamental concepts of linear recurring sequences over the finite fields. Th...
We study the growth behaviour of rational linear recurrence sequences. We show that for loworder seq...
In this thesis we study three topics within the broad fi eld of nonlinear recurrences. First we will...
We introduce a subclass of linear recurrence sequences which we call poly-rational sequences because...
Labeled infinite trees provide combinatorial interpretations for many integer sequences generated by...
We consider the problem of deciding ω-regular properties on infinite traces produced by linear loops...
A lower bound for the minimal length of the polynomial recurrence of a binomial sum is obtained. 200...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
AbstractWe develop a theory of minimal realizations of a finite sequence over an integral domain R, ...
AbstractWe derive an upper bound for the minimal length of a linear recurrence satisfied by a sequen...
A linear recurrence is a linear operator which maps rn into rn-1, where (rn) is a (recursive) sequen...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
Recurrence sequences are of great intrinsic interest and have been a central part of number theory f...
15 pages. Version longue, 34 pages : https://specfun.inria.fr/bostan/BoMo20.pdfInternational audienc...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
This thesis deals with fundamental concepts of linear recurring sequences over the finite fields. Th...
We study the growth behaviour of rational linear recurrence sequences. We show that for loworder seq...
In this thesis we study three topics within the broad fi eld of nonlinear recurrences. First we will...
We introduce a subclass of linear recurrence sequences which we call poly-rational sequences because...
Labeled infinite trees provide combinatorial interpretations for many integer sequences generated by...
We consider the problem of deciding ω-regular properties on infinite traces produced by linear loops...
A lower bound for the minimal length of the polynomial recurrence of a binomial sum is obtained. 200...