Linear recurrent sequences are those whose elements are defined as linear combinations of preceding elements, and finding recurrence relations is a fundamental problem in computer algebra. In this paper, we focus on sequences whose elements are vectors over the ring $\mathbb{A} = \mathbb{K}[x]/(x^d)$ of truncated polynomials. Finding the ideal of their recurrence relations has applications such as the computation of minimal polynomials and determinants of sparse matrices over $\mathbb{A}$. We present three methods for finding this ideal: a Berlekamp-Massey-like approach due to Kurakin, one which computes the kernel of some block-Hankel matrix over $\mathbb{A}$ via a minimal approximant basis, and one based on bivariate Pad\'e approximation....
AbstractWe exploit a connection between decimations and products to deduce the generating polynomial...
AbstractThe n coefficients of a fixed linear recurrence can be expressed through its m≤2n terms or, ...
AbstractLetfandgbe polynomials over some field, thought of as elements of the ring of one-sided Laur...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
AbstractThe known fast algorithms for computations with general Toeplitz, Hankel, Toeplitz-like, and...
International audienceGiven a multi-index sequence $σ$, we present a new efficient algorithm to comp...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
International audienceGiven several $n$-dimensional sequences, we first present an algorithmfor comp...
International audienceWe propose a slight modification of the Berlekamp-Massey Algorithm for obtaini...
AbstractThis is an expository account of a constructive theorem on the shortest linear recurrences o...
AbstractIn this paper two methods to compute Padé approximants are given. These methods are based on...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
Abstract. In this paper we derive factorizations and representations of a polynomial analogue of an ...
International audienceNew algorithms are presented for computing annihilating polynomials of Toeplit...
AbstractWe exploit a connection between decimations and products to deduce the generating polynomial...
AbstractThe n coefficients of a fixed linear recurrence can be expressed through its m≤2n terms or, ...
AbstractLetfandgbe polynomials over some field, thought of as elements of the ring of one-sided Laur...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
AbstractThe known fast algorithms for computations with general Toeplitz, Hankel, Toeplitz-like, and...
International audienceGiven a multi-index sequence $σ$, we present a new efficient algorithm to comp...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
International audienceGiven several $n$-dimensional sequences, we first present an algorithmfor comp...
International audienceWe propose a slight modification of the Berlekamp-Massey Algorithm for obtaini...
AbstractThis is an expository account of a constructive theorem on the shortest linear recurrences o...
AbstractIn this paper two methods to compute Padé approximants are given. These methods are based on...
AbstractWe relate sequences generated by recurrences with polynomial coefficients to interleaving an...
Abstract. In this paper we derive factorizations and representations of a polynomial analogue of an ...
International audienceNew algorithms are presented for computing annihilating polynomials of Toeplit...
AbstractWe exploit a connection between decimations and products to deduce the generating polynomial...
AbstractThe n coefficients of a fixed linear recurrence can be expressed through its m≤2n terms or, ...
AbstractLetfandgbe polynomials over some field, thought of as elements of the ring of one-sided Laur...
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