布林代數恆等式

符號

$a \lor (b \lor c) = (a \lor b) \lor c$	$a \land (b \land c) = (a \land b) \land c$	结合律
$a \lor b = b \lor a$	$a \land b = b \land a$	交换律
$a \lor (a \land b) = a$	$a \land (a \lor b) = a$	吸收律
$a \lor (b \land c) = (a \lor b) \land (a \lor c)$	$a \land (b \lor c) = (a \land b) \lor (a \land c)$	分配律
$a \lor \neg a = 1$	$a \land \neg a = 0$	互补律
$a \lor a = a$	$a \land a = a$	幂等律
$a \lor 0 = a$	$a \land 1 = a$	有界律
$a \lor 1 = 1$	$a \land 0 = 0$	有界律
$\neg 0 = 1$	$\neg 1 = 0$	0和1是互补的
$\neg (a \lor b) = \neg a \land \neg b$	$\neg (a \land b) = \neg a \lor \neg b$	德·摩根定律
$\neg \neg a = a$		对合律

a \Rightarrow b = \neg a \lor b

a \Leftrightarrow b = \neg a \lor b

a \oplus b = \neg a \cdot b \lor a \cdot \neg b

a \oplus 1 = \neg a

x_{i}^{σ_{i}} = {\begin{matrix} x_{i}, σ_{i} = 1, \\ \neg x_{i}, σ_{i} = 0, \end{matrix} x_{i} \in {0, 1}