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Star order automorphisms on the poset of type 1 operators

Let $\mathcal{H}$ be a complex infinite dimensional Hilbert space and $\mathcal{B}(\mathcal{H})$ the algebra of all bounded linear operators on $\mathcal H$. The star partial order is defined by $A\overset{*}{\leq}B$ if and only if $A^*A=A^*B$ and $AA^*=AB^*$ for any $A$ and $B$ in $\mathcal B(\mathcal H)$. We give a type decomposition of operators with respect to star order. For any $A\in\mathcal B(\mathcal H)$, there are unique type 1 operator $A_1 $ which is $0$ or the supremum of those rank 1 operators less than $A_1$ and type 2 operator $A_2$ which is not greater than any rank 1 operator in star order such that $A_i\overset{*}{\leq}A$$(i=1,2)$ and $A=A_1+A_2$. Moreover, we determine all automorphisms on the poset of type 1 operators. As a consequence, we characterize continuous automorphisms on $\mathcal B(\mathcal H)$.