The minimum size of fully irregular oriented graphs

“…For more information on t and m see [4,5]. In the paper [1] parameters t and m have used to the characterization of the family of all degree sets of smallest irregular oriented graphs with given order n. In particular, n-element sets (n > 3) of the following form (2):…”

“…The class of digraphs with this property of irregularity was introduced in the paper [3]. Properties of oriented graphs (digraphs) of above class were studied in papers [1,2,3,4] and [5]. In particular, the minimum and the maximum size of these graphs have been found in papers [1] and [5].…”

“…In similar way we define a largest and a smallest digraph. The results of papers [1,3] and [5] permit to obtain in simple way the following properties.…”

“…and L 5 , R 5 be sequences described in (3), (4), (5) and (6), respectively, for p = t, q = m and z j = b s t−1 +j , j = 1, 2, . .…”

A Sokoban-type game and arc deletion within irregular digraphs of all sizes

“…For more information on t and m see [4,5]. In the paper [1] parameters t and m have used to the characterization of the family of all degree sets of smallest irregular oriented graphs with given order n. In particular, n-element sets (n > 3) of the following form (2):…”

“…The class of digraphs with this property of irregularity was introduced in the paper [3]. Properties of oriented graphs (digraphs) of above class were studied in papers [1,2,3,4] and [5]. In particular, the minimum and the maximum size of these graphs have been found in papers [1] and [5].…”

“…In similar way we define a largest and a smallest digraph. The results of papers [1,3] and [5] permit to obtain in simple way the following properties.…”

“…and L 5 , R 5 be sequences described in (3), (4), (5) and (6), respectively, for p = t, q = m and z j = b s t−1 +j , j = 1, 2, . .…”

A Sokoban-type game and arc deletion within irregular digraphs of all sizes

“…The degree pair of a vertex is the outdegree followed by the indegree of the vertex. The notion of fully irregular digraphs-introduced by the present author in 1995-is investigated in [1,2,3,5]. Some results on fully irregular digraphs were presented at international conferences held in Poland at Lubiatów '96, Gronów '97, '98, and at Kazimierz Dolny '97.…”

Problems on fully irregular digraphs

A smallest irregular oriented graph containing a given diregular one