A subset $S\subseteq V$ in a graph $G=(V,E)$ is a total $[1,2]$-set if, for every vertex $v\in V$, $1\leq |N(v)\cap S|\leq 2$. The minimum cardinality of a total $[1,2]$-set of $G$ is called the total $[1,2]$-domination number, denoted by $��_{t[1,2]}(G)$. We establish two sharp upper bounds on the total [1,2]-domination number of a graph $G$ in terms of its order and minimum degree, and characterize the corresponding extremal graphs achieving these bounds. Moreover, we give some sufficient conditions for a graph without total $[1,2]$-set and for a graph with the same total $[1,2]$-domination number, $[1,2]$-domination number and domination number.

17 pages