TY - JOUR
T1 - Regular subgraphs of almost regular graphs
AU - Alon, N.
AU - Friedland, S.
AU - Kalai, G.
PY - 1984/8
Y1 - 1984/8
N2 - Suppose every vertex of a graph G has degree k or k + 1 and at least one vertex has degree k + 1. It is shown that if k ≥ 2q - 2 and q is a prime power then G contains a q-regular subgraph (and hence an r-regular subgraph for all r < q, r ≡ q (mod 2)). It is also proved that every simple graph with maximal degree Δ ≥ 2q - 2 and average degree d > ( (2q - 2) (2q - 1))(Δ + 1), where q is a prime power, contains a q-regular subgraph (and hence an r-regular subgraph for all r < q, r ≡ q (mod 2)). These results follow from Chevalley's and Olson's theorems on congruences.
AB - Suppose every vertex of a graph G has degree k or k + 1 and at least one vertex has degree k + 1. It is shown that if k ≥ 2q - 2 and q is a prime power then G contains a q-regular subgraph (and hence an r-regular subgraph for all r < q, r ≡ q (mod 2)). It is also proved that every simple graph with maximal degree Δ ≥ 2q - 2 and average degree d > ( (2q - 2) (2q - 1))(Δ + 1), where q is a prime power, contains a q-regular subgraph (and hence an r-regular subgraph for all r < q, r ≡ q (mod 2)). These results follow from Chevalley's and Olson's theorems on congruences.
UR - http://www.scopus.com/inward/record.url?scp=0001999289&partnerID=8YFLogxK
U2 - 10.1016/0095-8956(84)90047-9
DO - 10.1016/0095-8956(84)90047-9
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AN - SCOPUS:0001999289
SN - 0095-8956
VL - 37
SP - 79
EP - 91
JO - Journal of Combinatorial Theory. Series B
JF - Journal of Combinatorial Theory. Series B
IS - 1
ER -