AbstractA natural Hadamard matrix Hn is a 2n × 2n matrix defined recursively as Hn+1=111-1⊗ Hn, where ⊗ denotes the Kronecker product. Some properties of such matrices which follow from the above definition are shown in this paper. These include a certain relation between defined reduction and expansion properties, parity considerations in the Hadamard domain and some dyadic properties
AbstractThe Hadamard matrix H2m of order 2m can be obtained by m−1 times of Kronercker products from...
In this paper we study the Hadamard matrices and some algorithms to generate them. We review some th...
In this paper, the matrix QnB ◦ Q−nB which is the Hadamard product of both balancing QnB matrix and ...
AbstractA natural Hadamard matrix Hn is a 2n × 2n matrix defined recursively as Hn+1=111-1⊗ Hn, wher...
The strong Kronecker product The strong Kronecker product has proved a powerful new multiplication t...
AbstractIn this paper, we use the Sylvester's approach to construct another Hadamard matrix, namely ...
AbstractThe strong Kronecker product has proved a powerful new multiplication tool for orthogonal ma...
We are concerned with Kronecker and Hadamard convolution products and present some important connect...
We are concerned with Kronecker and Hadamard convolution products and present some important connec...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
We are concerned with Kronecker and Hadamard convolution products and present some important connect...
We present some inequality/equality for traces of Hadamard product and Kronecker product of matrices...
AbstractThe purpose of this paper is to offer an independent verification of recent computer results...
AbstractWe define a generalized Kronecker product for block matrices, mention some of its properties...
In this paper we study the Hadamard matrices and some algorithms to generate them. We review some th...
AbstractThe Hadamard matrix H2m of order 2m can be obtained by m−1 times of Kronercker products from...
In this paper we study the Hadamard matrices and some algorithms to generate them. We review some th...
In this paper, the matrix QnB ◦ Q−nB which is the Hadamard product of both balancing QnB matrix and ...
AbstractA natural Hadamard matrix Hn is a 2n × 2n matrix defined recursively as Hn+1=111-1⊗ Hn, wher...
The strong Kronecker product The strong Kronecker product has proved a powerful new multiplication t...
AbstractIn this paper, we use the Sylvester's approach to construct another Hadamard matrix, namely ...
AbstractThe strong Kronecker product has proved a powerful new multiplication tool for orthogonal ma...
We are concerned with Kronecker and Hadamard convolution products and present some important connect...
We are concerned with Kronecker and Hadamard convolution products and present some important connec...
Let A = (aij) andB = (bij) be matrices of the same size. Then their Hadamard product (also called S...
We are concerned with Kronecker and Hadamard convolution products and present some important connect...
We present some inequality/equality for traces of Hadamard product and Kronecker product of matrices...
AbstractThe purpose of this paper is to offer an independent verification of recent computer results...
AbstractWe define a generalized Kronecker product for block matrices, mention some of its properties...
In this paper we study the Hadamard matrices and some algorithms to generate them. We review some th...
AbstractThe Hadamard matrix H2m of order 2m can be obtained by m−1 times of Kronercker products from...
In this paper we study the Hadamard matrices and some algorithms to generate them. We review some th...
In this paper, the matrix QnB ◦ Q−nB which is the Hadamard product of both balancing QnB matrix and ...
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