Volume 56, Issue 2
Neighbor Sum Distinguishing Total Chromatic Number of Graphs with Lower Average Degree

Danjun Huang & Dan Bao

J. Math. Study, 56 (2023), pp. 206-218.

Published online: 2023-06

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  • Abstract

For a given simple graph $G = (V(G),E(G)),$ a proper total-$k$-coloring $c : V(G)∪E(G)→ \{1,2,...,k\}$ is neighbor sum distinguishing if $f(u) ≠ f(v)$ for each edge $uv ∈ E(G),$ where $f(v) = \sum_{wv∈E(G)} c(wv)+c(v).$ The smallest integer $k$ in such a coloring of $G$ is the neighbor sum distinguishing total chromatic number, denoted by $\chi^{''}_{\sum} (G).$ It has been conjectured that $\chi ^{''}_{\sum} (G) ≤ ∆(G)+3$ for any simple graph $G.$ Let $mad (G)=max\{ \frac{2|E(H)|}{ |V(H)|} :H⊆G\}$ be the maximum average degree of $G.$ In this paper, by using the famous Combinatorial Nullstellensatz, we prove $\chi^{''} _{\sum}(G) ≤ max\{9,∆(G)+2\}$ for any graph $G$ with $mad (G)<4.$ Furthermore, we characterize the neighbor sum distinguishing total chromatic number for every graph $G$ with $mad (G)<4$ and $∆(G)≥8.$

  • AMS Subject Headings

53A07, 53C24, 53C40

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COPYRIGHT: © Global Science Press

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@Article{JMS-56-206, author = {Huang , Danjun and Bao , Dan}, title = {Neighbor Sum Distinguishing Total Chromatic Number of Graphs with Lower Average Degree}, journal = {Journal of Mathematical Study}, year = {2023}, volume = {56}, number = {2}, pages = {206--218}, abstract = {

For a given simple graph $G = (V(G),E(G)),$ a proper total-$k$-coloring $c : V(G)∪E(G)→ \{1,2,...,k\}$ is neighbor sum distinguishing if $f(u) ≠ f(v)$ for each edge $uv ∈ E(G),$ where $f(v) = \sum_{wv∈E(G)} c(wv)+c(v).$ The smallest integer $k$ in such a coloring of $G$ is the neighbor sum distinguishing total chromatic number, denoted by $\chi^{''}_{\sum} (G).$ It has been conjectured that $\chi ^{''}_{\sum} (G) ≤ ∆(G)+3$ for any simple graph $G.$ Let $mad (G)=max\{ \frac{2|E(H)|}{ |V(H)|} :H⊆G\}$ be the maximum average degree of $G.$ In this paper, by using the famous Combinatorial Nullstellensatz, we prove $\chi^{''} _{\sum}(G) ≤ max\{9,∆(G)+2\}$ for any graph $G$ with $mad (G)<4.$ Furthermore, we characterize the neighbor sum distinguishing total chromatic number for every graph $G$ with $mad (G)<4$ and $∆(G)≥8.$

}, issn = {2617-8702}, doi = {https://doi.org/10.4208/jms.v56n2.23.06}, url = {http://global-sci.org/intro/article_detail/jms/21836.html} }
TY - JOUR T1 - Neighbor Sum Distinguishing Total Chromatic Number of Graphs with Lower Average Degree AU - Huang , Danjun AU - Bao , Dan JO - Journal of Mathematical Study VL - 2 SP - 206 EP - 218 PY - 2023 DA - 2023/06 SN - 56 DO - http://doi.org/10.4208/jms.v56n2.23.06 UR - https://global-sci.org/intro/article_detail/jms/21836.html KW - Neighbor sum distinguishing total coloring, combinatorial nullstellensatz, maximum average degree. AB -

For a given simple graph $G = (V(G),E(G)),$ a proper total-$k$-coloring $c : V(G)∪E(G)→ \{1,2,...,k\}$ is neighbor sum distinguishing if $f(u) ≠ f(v)$ for each edge $uv ∈ E(G),$ where $f(v) = \sum_{wv∈E(G)} c(wv)+c(v).$ The smallest integer $k$ in such a coloring of $G$ is the neighbor sum distinguishing total chromatic number, denoted by $\chi^{''}_{\sum} (G).$ It has been conjectured that $\chi ^{''}_{\sum} (G) ≤ ∆(G)+3$ for any simple graph $G.$ Let $mad (G)=max\{ \frac{2|E(H)|}{ |V(H)|} :H⊆G\}$ be the maximum average degree of $G.$ In this paper, by using the famous Combinatorial Nullstellensatz, we prove $\chi^{''} _{\sum}(G) ≤ max\{9,∆(G)+2\}$ for any graph $G$ with $mad (G)<4.$ Furthermore, we characterize the neighbor sum distinguishing total chromatic number for every graph $G$ with $mad (G)<4$ and $∆(G)≥8.$

Huang , Danjun and Bao , Dan. (2023). Neighbor Sum Distinguishing Total Chromatic Number of Graphs with Lower Average Degree. Journal of Mathematical Study. 56 (2). 206-218. doi:10.4208/jms.v56n2.23.06
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