In this note we give an axiomatization of Boolean algebras based on weaklydicomplemented lattices: an algebra $(L,\wedge,\vee,\tu)$ of type $(2,2,1)$ isa Boolean algebra iff $(L,\wedge,\vee)$ is a non empty lattice and $(x\wedgey)\vee(x\wedge y\tu)=(x\vee y)\wedge(x\vee y\tu)$ for all $x,y\in L$. Thisprovides a unique equation to encode distributivity and complementation onlattices.
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机译:在本说明中,我们给出了基于弱二补格的布尔代数的公理化:类型为((2,2,1)$)的代数$(L,\ wedge,\ vee,\ tu)$是布尔代数iff $(L, \ wedge,\ vee)$是一个非空格子,$(x \ wedgey)\ vee(x \ wedge y \ tu)= {x \ vee y)\ wedge(x \ vee y \ tu)$ x,y \ in L $。这提供了一个独特的方程来编码晶格上的分布和互补。
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