#Contents# * table of contents {:toc} ## Definition ## ### In premetric spaces ### Let $T$ be a [[directed type]], and let $S$ be a $T$-[[premetric space]]. Given a [[directed type]] $I$, a __limit of a net__ $x: I \to S$ is a term $l:S$ with $$\lambda: \prod_{\epsilon:T} \Vert \sum_{N:I} \prod_{i:I} (i \geq N) \to (x_i \sim_{\epsilon} l) \Vert$$ ### Cauchy approximations ### Let $T$ be a [[directed type]] and [[codirected type]] where the directed type operation $\oplus$ is associative. A limit of a $T$-[[Cauchy approximation]] $x: T \to S$ is a term $l:S$ with $$x:T \to S \vdash c(x):\prod_{\delta:T} \prod_{\eta:T} x_\delta \sim_{\delta \oplus \eta} l$$ ### In convergence spaces ### ... ### Sequences ### A __limit of a sequence__ is a limit of a net that happens to be a sequence. ## See also ## * [[premetric space]] * [[modulus of Cauchy convergence]] * [[Cauchy structure]] * [[Cauchy approximation]] * [[HoTT book real numbers]]