We characterize all finite linear spaces with p ≤ n2points where n ≥ 8 for p ≠ n2 — 1 and n ≥ 23 for p = n2— 1. and the line range is {n - 1, n, n + 1}. All such linear spaces are shown to be embeddable in finite projective planes of order a function of n. We also describe the exceptional linear spaces arising from p < n2 - 1 and n ≥ 4. © 1980, Australian Mathematical Society. All rights reserved.SCOPUS: ar.jinfo:eu-repo/semantics/publishe
AbstractIn this note we examine the problem of embedding into finite projective planes finite linear...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
We characterize all finite linear spaces with p ≤ n2points where n ≥ 8 for p ≠ n2 — 1 and n ≥ 23 for...
AbstractIt is shown that a finite linear space with maximal point degree n + 1 can be embedded in a ...
Let L be a non-trivial finite linear space in which every line has n or n+1 points. We describe L co...
AbstractCharacterizations of finite linear spaces on v points, n2⩽v<(n+1)2and b=n2+n+1 lines, and on...
AbstractWe show that any finite linear space on v=n2 points and b=n2+n+2 lines has n⩽4. We also desc...
Characterizations of finite linear spaces on v points, n2≤v<(n+1)2and b=n2+n+1 lines, and on v point...
AbstractLinear spaces with υ >n2 − 12n + 1 points, b⩽n2 + n + 1 lines and not constant point degree ...
We show that any finite linear space on v=n2 points and b=n2+n+2 lines has n≤4. We also describe all...
AbstractLinear spaces with υ >n2 − 12n + 1 points, b⩽n2 + n + 1 lines and not constant point degree ...
AbstractIn 1948, De Bruijn and Erdös proved that a finite linear space on ν points has at least ν li...
In 1948, De Bruijn and Erdös proved that a finite linear space on ν points has at least ν lines, wit...
AbstractWe show that any finite linear space on v=n2 points and b=n2+n+2 lines has n⩽4. We also desc...
AbstractIn this note we examine the problem of embedding into finite projective planes finite linear...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
We characterize all finite linear spaces with p ≤ n2points where n ≥ 8 for p ≠ n2 — 1 and n ≥ 23 for...
AbstractIt is shown that a finite linear space with maximal point degree n + 1 can be embedded in a ...
Let L be a non-trivial finite linear space in which every line has n or n+1 points. We describe L co...
AbstractCharacterizations of finite linear spaces on v points, n2⩽v<(n+1)2and b=n2+n+1 lines, and on...
AbstractWe show that any finite linear space on v=n2 points and b=n2+n+2 lines has n⩽4. We also desc...
Characterizations of finite linear spaces on v points, n2≤v<(n+1)2and b=n2+n+1 lines, and on v point...
AbstractLinear spaces with υ >n2 − 12n + 1 points, b⩽n2 + n + 1 lines and not constant point degree ...
We show that any finite linear space on v=n2 points and b=n2+n+2 lines has n≤4. We also describe all...
AbstractLinear spaces with υ >n2 − 12n + 1 points, b⩽n2 + n + 1 lines and not constant point degree ...
AbstractIn 1948, De Bruijn and Erdös proved that a finite linear space on ν points has at least ν li...
In 1948, De Bruijn and Erdös proved that a finite linear space on ν points has at least ν lines, wit...
AbstractWe show that any finite linear space on v=n2 points and b=n2+n+2 lines has n⩽4. We also desc...
AbstractIn this note we examine the problem of embedding into finite projective planes finite linear...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
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