The Forcing Circular Number of a Graph

S. Sheeja
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Abstract

Let S be a cr-set of graph G and let G be a connected graph. If S is the only cr-set that contains T, then a subset T⊆S is referred to be a forcing subset for S. A minimum forcing subset of S is a forcing subset for S of minimum cardinality. The cardinality of a minimum forcing subset of S is the forcing circular number of S, represented by the notation f_cr(S). f_cr (G) = min {f_cr(S)} is the forcing circular number of G, where the minimum is the sum of all minimum forcing circular-sets S in G. For several standard graphs, the forcing circular number is identified. It is demonstrated that there exists a connected graph G such that f_g (G)=a and f_cr (G)=b for every integer a≥0, and b≥0.
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图形的强制循环数
设 S 是图 G 的一个 cr 集,G 是一个连通图。如果 S 是唯一包含 T 的 cr 集,那么子集 T⊆S 就是 S 的强制子集。S 的最小强制子集的卡片数是 S 的强制循环数,用符号 f_cr(S) 表示。f_cr (G) = min {f_cr(S)} 是 G 的强制循环数,其中最小值是 G 中所有最小强制循环集 S 的和。证明存在一个连通图 G,对于每一个整数 a≥0 和 b≥0,f_g (G)=a 和 f_cr (G)=b 。
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