Add to ORKGProjective plane of order 10 does not exist. Proof of this assertion was finished in 1989 and is based on the nonexistence of a binary code C generated by the incidence vectors of the plane's lines. As part of the proof of the nonexistence of code C, the coefficients of its weight enumerator were studied. It was shown that coefficients A12, A15, A16 and A19 have to be equal to zero, which contradicted other findings about the relationship among the coefficients. Presented diploma thesis elaborately analyses the phases of the proof and, in several places, enhances them with new observations and simplifications. Part of the proof is generalized for projective planes of order 8m + 2.
We discuss the class of projective systems whose supports are the complement of the union of two lin...
In this paper, we study the p-ary linear code C(PG(n,q)), q = p(h), p prime, h >= 1, generated by th...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...
AbstractThe weight enumerator of the binary error-correcting code generated by the rows of the incid...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
We present a fairly elementary, self-contained proof of the nonexistence of a finite projective plan...
We determine the weight enumerator of the code of the projective plane of order 5 by hand. The main ...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
We study the higher weights of codes formed from planes and biplanes. We relate the higher weights o...
AbstractLet O be a conic in the classical projective plane PG(2,q), where q is an odd prime power. W...
In this paper we consider binary linear codes spanned by incidence matrices of Steiner 2-designs ass...
In the presented work we define a class of error-correcting codes based on incidence vectors of proj...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
We show how to get a 1-1 correspondence between projective linear codes and 2-weight linear codes. A...
AbstractThe notion of a projective system, defined as a set X of n-points in a projective space over...
We discuss the class of projective systems whose supports are the complement of the union of two lin...
In this paper, we study the p-ary linear code C(PG(n,q)), q = p(h), p prime, h >= 1, generated by th...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...
AbstractThe weight enumerator of the binary error-correcting code generated by the rows of the incid...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
We present a fairly elementary, self-contained proof of the nonexistence of a finite projective plan...
We determine the weight enumerator of the code of the projective plane of order 5 by hand. The main ...
A linear [n, k]-code C is a k-dimensional subspace of V (n, q), where V (n, q) denotes the n-dimensi...
We study the higher weights of codes formed from planes and biplanes. We relate the higher weights o...
AbstractLet O be a conic in the classical projective plane PG(2,q), where q is an odd prime power. W...
In this paper we consider binary linear codes spanned by incidence matrices of Steiner 2-designs ass...
In the presented work we define a class of error-correcting codes based on incidence vectors of proj...
Many research in coding theory is focussed on linear error-correcting codes. Since these codes are s...
We show how to get a 1-1 correspondence between projective linear codes and 2-weight linear codes. A...
AbstractThe notion of a projective system, defined as a set X of n-points in a projective space over...
We discuss the class of projective systems whose supports are the complement of the union of two lin...
In this paper, we study the p-ary linear code C(PG(n,q)), q = p(h), p prime, h >= 1, generated by th...
The minimum weight of the code generated by the incidence matrix of points versus lines in a project...