ZKP Tips https://www.zkp.tips/ by <a href="https://kurtpan.xyz">Kurt Pan</a> Fri, 17 Apr 2026 18:49:44 +0000 https://i.snap.as/OSToF0K8.png ZKP Tips https://www.zkp.tips/ Let \\(Ep\\) be an elliptic curve https://www.zkp.tips/let-ep-be-an-elliptic-curve-over-a-finite-field-mathbb-f-p-where?pk_campaign=rss-feed <![CDATA[Let \\(Ep\\) be an elliptic curve over a finite field \\(\mathbb{F}p\\), where \\(p\\) is a prime. We denote this by \\(Ep / \mathbb{F}p\\). and we denote the group of points of \\(Ep\\) over \\(\mathbb{F}p\\), with order \\(q=\# E\left(\mathbb{F}p\right)\\). For this curve, we call \\(\mathbb{F}p\\) the "base field" and \\(\mathbb{F}_q\\) the "scalar field".]]> Let \(Ep\) be an elliptic curve over a finite field \(\mathbb{F}p\), where \(p\) is a prime. We denote this by \(Ep / \mathbb{F}p\). and we denote the group of points of \(Ep\) over \(\mathbb{F}p\), with order \(q=# E\left(\mathbb{F}p\right)\). For this curve, we call \(\mathbb{F}p\) the “base field” and \(\mathbb{F}_q\) the “scalar field”.

]]> https://www.zkp.tips/let-ep-be-an-elliptic-curve-over-a-finite-field-mathbb-f-p-where Thu, 21 Aug 2025 05:22:11 +0000 test inline math \\( \pi \\) https://www.zkp.tips/frac-1-n?pk_campaign=rss-feed <![CDATA[test inline math \\( \pi \\) $$ \begin{align\} y &\approx f\\theta \circ g\\phi (y) \\\ x &\approx g\\phi \circ f\\theta (x) \\\ \end{align\} $$]]> test inline math \( \pi \)

$$ \begin{align*} y &\approx f_\theta \circ g_\phi (y) \\ x &\approx g_\phi \circ f_\theta (x) \\ \end{align*} $$

]]> https://www.zkp.tips/frac-1-n Wed, 20 Aug 2025 12:08:24 +0000