AbstractA binary linear code in F2n with dimension k and minimum distance d is called an [n,k,d] code. A t-(n,m,λ) design D is a set X of n points together with a collection of m-subsets of X (called a block) such that every t-subset of X is contained in exactly λ blocks. A constant length code which corrects different numbers of errors in different code words is called a non-uniform error correcting code. Parity sectioned reduction of a linear code gives a non-uniform error correcting code. In this paper a new code, [2n−1,n,2n−1], is developed. The error correcting capability of this code is 2n−2−1=e. It is shown that this code holds a 2-(2n−1,2n−1,2n−2) design. Also the parity sectioned reduction code after deleting the same g(≤e) positio...
AbstractLet P=ij,(i,j=0,1,2,…) and D=diag((−1)0,(−1)1,(−1)2,…). As a linear transformation of the in...
AbstractIn this paper, we introduce the concept of second order duality for the variational problems...
In this paper some inequalities for Dirichlet\u27s and Fejer\u27s kernels proved in [6] are refined ...
AbstractWe extend the results of [J.F. Qian, L.N. Zhang, S.X. Zhu, (1+u)-constacyclic and cyclic cod...
This paper studies a special class of linear codes, called skew cyclic codes, over the ring R= Fq+uF...
It is well known that each solution of the Toda lattice can be represented by a tridiagonal matrix J...
AbstractIn the present paper, the difference sequence spaces cs0λ(Δ),csλ(Δ) and bsλ(Δ) of nonabsolut...
AbstractIn this paper we consider quadrature formulas which use the derivative of only an arbitrary ...
AbstractSuppose m, n, and k are positive integers, and let 〈·,·〉 be the standard inner product on th...
AbstractIn this paper, some new results about the existence of positive solutions for singular semi-...
AbstractIn this paper, we characterize an associative ring over which any n×n(n⩾2) square matrix A c...
AbstractIn this note, we present two sufficient conditions for determining the signs of three-term r...
AbstractWe give a short proof of Miki's identity for Bernoulli numbers,∑i=2n-2βiβn-i-∑i=2n-2niβiβn-i...
In the present paper, a general theorem on ${mid{bar{N},p_n;delta}mid}_k$ summability factors of in...
A 2-monomial matrix over a commutative ring $R$ is by definition any matrix of the form $M(t,k,n)=\P...
AbstractLet P=ij,(i,j=0,1,2,…) and D=diag((−1)0,(−1)1,(−1)2,…). As a linear transformation of the in...
AbstractIn this paper, we introduce the concept of second order duality for the variational problems...
In this paper some inequalities for Dirichlet\u27s and Fejer\u27s kernels proved in [6] are refined ...
AbstractWe extend the results of [J.F. Qian, L.N. Zhang, S.X. Zhu, (1+u)-constacyclic and cyclic cod...
This paper studies a special class of linear codes, called skew cyclic codes, over the ring R= Fq+uF...
It is well known that each solution of the Toda lattice can be represented by a tridiagonal matrix J...
AbstractIn the present paper, the difference sequence spaces cs0λ(Δ),csλ(Δ) and bsλ(Δ) of nonabsolut...
AbstractIn this paper we consider quadrature formulas which use the derivative of only an arbitrary ...
AbstractSuppose m, n, and k are positive integers, and let 〈·,·〉 be the standard inner product on th...
AbstractIn this paper, some new results about the existence of positive solutions for singular semi-...
AbstractIn this paper, we characterize an associative ring over which any n×n(n⩾2) square matrix A c...
AbstractIn this note, we present two sufficient conditions for determining the signs of three-term r...
AbstractWe give a short proof of Miki's identity for Bernoulli numbers,∑i=2n-2βiβn-i-∑i=2n-2niβiβn-i...
In the present paper, a general theorem on ${mid{bar{N},p_n;delta}mid}_k$ summability factors of in...
A 2-monomial matrix over a commutative ring $R$ is by definition any matrix of the form $M(t,k,n)=\P...
AbstractLet P=ij,(i,j=0,1,2,…) and D=diag((−1)0,(−1)1,(−1)2,…). As a linear transformation of the in...
AbstractIn this paper, we introduce the concept of second order duality for the variational problems...
In this paper some inequalities for Dirichlet\u27s and Fejer\u27s kernels proved in [6] are refined ...