AbstractA simple interpretation of the Berlekamp-Massey algorithm in the light of the Hankel matrix is presented. The salient result is that the jump of the linear feedback shift register (LFSR) length is derived almost trivially from the so-called Iohvidov index of the Hankel matrix, prior to making any reference to the Berlekamp-Massey algorithm itself. Next, the Hankel system of equations that yields the updated connection polynomial is solved via the natural LU factorization of the Hankel matrix, which itself leads to the Berlekamp-Massey algorithm in a simple and transparent manner
In the theory for continuous-time linear systems, the system Hankel operator plays an important role...
© 2017 Elsevier Inc. We give a new short proof of a version of a Hankel matrix rank theorem. That ve...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
AbstractA simple interpretation of the Berlekamp-Massey algorithm in the light of the Hankel matrix ...
Abstract In this paper we interpret the Berlekamp-Massey algorithm (BMA) for synthesis of linear fee...
We analyze the Matrix Berlekamp/Massey algorithm, which generalizes the Berlekamp/Massey algorithm [...
We propose a slight modification of the Berlekamp-Massey Algorithm for obtaining the minimal polynom...
AbstractThis article presents a new algorithm for obtaining a block diagonalization of Hankel matric...
[EN] The Berlekamp-Massey algorithm solves the problem of finding the shortest linear feedback shift...
AbstractWe explore the connections between the Lanczos algorithm for matrix tridiagonalization and t...
We give a new algorithm for the blocs diagonalization of Hankel matrices. When the matrix correspond...
We compare thoroughly the Berlekamp – Massey – Sakata algorithm and the Scalar-FGLM algorithm, which...
International audienceWe propose a slight modification of the Berlekamp-Massey Algorithm for obtaini...
Special issue on the conference ISSAC 2015: Symbolic computation and computer algebraInternational a...
AbstractWe derive an explicit count for the number of singular n×n Hankel (Toeplitz) matrices whose ...
In the theory for continuous-time linear systems, the system Hankel operator plays an important role...
© 2017 Elsevier Inc. We give a new short proof of a version of a Hankel matrix rank theorem. That ve...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...
AbstractA simple interpretation of the Berlekamp-Massey algorithm in the light of the Hankel matrix ...
Abstract In this paper we interpret the Berlekamp-Massey algorithm (BMA) for synthesis of linear fee...
We analyze the Matrix Berlekamp/Massey algorithm, which generalizes the Berlekamp/Massey algorithm [...
We propose a slight modification of the Berlekamp-Massey Algorithm for obtaining the minimal polynom...
AbstractThis article presents a new algorithm for obtaining a block diagonalization of Hankel matric...
[EN] The Berlekamp-Massey algorithm solves the problem of finding the shortest linear feedback shift...
AbstractWe explore the connections between the Lanczos algorithm for matrix tridiagonalization and t...
We give a new algorithm for the blocs diagonalization of Hankel matrices. When the matrix correspond...
We compare thoroughly the Berlekamp – Massey – Sakata algorithm and the Scalar-FGLM algorithm, which...
International audienceWe propose a slight modification of the Berlekamp-Massey Algorithm for obtaini...
Special issue on the conference ISSAC 2015: Symbolic computation and computer algebraInternational a...
AbstractWe derive an explicit count for the number of singular n×n Hankel (Toeplitz) matrices whose ...
In the theory for continuous-time linear systems, the system Hankel operator plays an important role...
© 2017 Elsevier Inc. We give a new short proof of a version of a Hankel matrix rank theorem. That ve...
lt has been shown in the literature that a formulation of the minimal partial realization problem in...