幺半范畴

$\mathcal{C}$ 是范畴.

$\otimes$ 是二元函子$$\begin{array}{rl}\otimes :\mathcal{C}\times \mathcal{C}& \to \mathcal{C},\\ (x,y)& \mapsto x\otimes y,\end{array}$$称为张量积.

$1\in \mathcal{C}$ 是对象, 称为 $\mathcal{C}$ 的单位对象.

$a,l,r$ 是自然同构$$\begin{array}{rlrl}{a}_{x,y,z}:& & (x\otimes y)\otimes z& \simeq x\otimes (y\otimes z),\\ l_x:& & 1\otimes x& \simeq x,\\ r_x:& & x\otimes 1& \simeq x,\end{array}$$分别称为结合子、左单位子、右单位子.

(三角形公理) 对任意 $x,y\in \mathcal{C}$, 有交换图$$(x\otimes 1)\otimes yx\otimes (1\otimes y)x\otimes y\text{ .}{a}_{x,1,y}{r}_x\otimes 1_y{1}_x\otimes l_y$$

(五边形公理) 对任意 $x,y,z,w\in \mathcal{C}$, 有交换图$$(x\otimes y)\otimes (z\otimes w)((x\otimes y)\otimes z)\otimes wx\otimes (y\otimes (z\otimes w))(x\otimes (y\otimes z))\otimes wx\otimes ((y\otimes z)\otimes w)\text{ .}{a}_{x,y,z\otimes w}{a}_{x\otimes y,z,w}{a}_{x,y,z}\otimes 1_w{a}_{x,y\otimes z,w}{1}_x\otimes a_{y,z,w}$$