Paratingent cone

Let ${\displaystyle S}$  be a nonempty subset of a real normed vector space ${\displaystyle (X,\|\cdot \|)}$ .

1. Let some ${\displaystyle {\bar {x}}\in \operatorname {cl} (S)}$  be a point in the closure of ${\displaystyle S}$ . An element ${\displaystyle h\in X}$  is called a tangent (or tangent vector) to ${\displaystyle S}$  at ${\displaystyle {\bar {x}}}$ , if there is a sequence ${\displaystyle (x_{n})_{n\in \mathbb {N} }}$  of elements ${\displaystyle x_{n}\in S}$  and a sequence ${\displaystyle (\lambda _{n})_{n\in \mathbb {N} }}$  of positive real numbers ${\displaystyle \lambda _{n}>0}$  such that ${\displaystyle {\bar {x}}=\lim _{n\to \infty }x_{n}}$  and ${\displaystyle h=\lim _{n\to \infty }\lambda _{n}(x_{n}-{\bar {x}}).}$ 
2. The set ${\displaystyle T(S,{\bar {x}})}$  of all tangents to ${\displaystyle S}$  at ${\displaystyle {\bar {x}}}$  is called the contingent cone (or the Bouligand tangent cone) to ${\displaystyle S}$  at ${\displaystyle {\bar {x}}}$ .^[1]

An equivalent definition is given in terms of a distance function and the limit infimum. As before, let ${\displaystyle (X,\|\cdot \|)}$  be a normed vector space and take some nonempty set ${\displaystyle S\subset X}$ . For each ${\displaystyle x\in X}$ , let the distance function to ${\displaystyle S}$  be

${\displaystyle d_{S}(x):=\inf\{\|x-x'\|\mid x'\in S\}.}$ 

Then, the contingent cone to ${\displaystyle S\subset X}$  at ${\displaystyle x\in \operatorname {cl} (S)}$  is defined by^[2]

${\displaystyle T_{S}(x):=\left\{v:\liminf _{h\to 0^{+}}{\frac {d_{S}(x+hv)}{h}}=0\right\}.}$