From a1f28e45d3a3fcea57c6e2706db2cfdbef5be1ae Mon Sep 17 00:00:00 2001
From: floraachy <1622042529@gitlink.com>
Date: Wed, 21 Jan 2026 09:37:19 +0800
Subject: [PATCH] Update README.md
---
README.md | 315 +++++++++++++++++++++++++++++++++++++++++++++++++++++-
1 file changed, 314 insertions(+), 1 deletion(-)
diff --git a/README.md b/README.md
index 71ce41f..4351f69 100644
--- a/README.md
+++ b/README.md
@@ -1,2 +1,315 @@
-# openlslsls
+# 2025.04.24.
+日小结
+
+
+根据[ego模型时间接口](https://gitee.com/hyg/blog/blob/master/timeflow.md),今天绑定模版2(2c)。
+
+
+- 09:46~10:58 learn: [markdown数学公式](#20250424094600)
+- 14:00~17:59 learn: [复习数学基础](#20250424140000)
+
+---
+season stat:
+
+| task | alloc | sold | hold | todo |
+| :---: | ---: | ---: | ---: | ---: |
+| total | 13530 | 2902 | 10628 | 5970 |
+| PSMD | 4000 | 720 | 3280 | 1170 |
+| ego | 2530 | 1095 | 1435 | 1380 |
+| infra | 2000 | 240 | 1760 | 210 |
+| xuemen | 1000 | 219 | 781 | 450 |
+| raw | 1000 | 90 | 910 | 390 |
+| learn | 2000 | 418 | 1582 | 1770 |
+| js | 1000 | 120 | 880 | 600 |
+
+---
+waiting list:
+
+
+- 30分钟时间片:
+ - learn的第1号事项:clerk统一用户管理
+ - ego的第1号事项:entry的科目归并
+ - ego的第5号事项:entry的按月报表
+
+- 60分钟时间片:
+ - infra的第1号事项:范例--利用js模块组合实现合同条款的组合。
+ - raw的第1号事项:熟悉内脏之间的关系
+ - js的第1号事项:learn factory, constructor, prototype
+ - ego的第2号事项:redahomes
+
+- 90分钟时间片:
+ - PSMD的第1号事项:子1609
+ - PSMD的第2号事项:根据香港《公司條例》调整1609的部署方案 https://www.elegislation.gov.hk/hk/cap622
+ - infra的第2号事项:schema立项。
+ - learn的第2号事项:热更新
+
+- 195分钟时间片:
+ - xuemen的第1号事项:kernel模型升级
+ - xuemen的第2号事项:重新设计S2状态下的学门基本管理制度
+ - ego的第3号事项:新版基础模型
+ - ego的第4号事项:新版ego, instance or model, any manifest
+
+---
+[email] | [top](#top) | [index](#index)
+
+## 09:46 ~ 10:58
+## learn: [markdown数学公式]
+
+- https://www.jianshu.com/p/383e8149136c
+- https://www.nature.com/articles/s41467-018-05739-8 中的(2)
+
+- 网页中的代码
+```latex
+U_{{\mathrm{S}} \to {\mathrm{L}}} =\left\{ \begin{array}{l}{{\left\{ {\left| \downarrow \right\rangle } \right._{\mathrm{S}} \mapsto \left| { - \frac{1}{2}} \right\rangle _{\mathrm{L}} \equiv \left| \downarrow \right\rangle _{\mathrm{S}} \otimes \left| {{\mbox{``}}{\mathrm{z}} = - \frac{1}{2} {\mbox{''}}} \right\rangle _{\mathrm{D}} \otimes \left| {{\mbox{``}} \psi _{\mathrm{S}} = \left| \downarrow \right\rangle {\mbox{''}}} \right\rangle _{\mathrm{F}}}}\\ {{\left\{ {\left| \uparrow \right\rangle } \right._{\mathrm{S}} \mapsto \left| { + \frac{1}{2}} \right\rangle _{\mathrm{L}} \equiv \left| \uparrow \right\rangle _{\mathrm{S}} \otimes \left| {{\mbox{``}} {\mathrm{z}} = + \frac{1}{2}{\mbox{''}}} \right\rangle _{\mathrm{D}} \otimes \left| {{\mbox{``}}\psi _{\mathrm{S}} = \left| \uparrow \right\rangle {\mbox{''}}} \right\rangle _{\mathrm{F}}}}\end{array}\right. .
+```
+
+- markdown中的代码:
+
+```
+U_{{\mathrm{S}} \to {\mathrm{L}}} =
+\left\{
+ \begin{array} {l}
+ {
+ \left\{
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ -\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=-\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \downarrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }\\
+ {
+ \left\{
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ +\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=+\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \uparrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }
+ \end{array}
+\right..
+```
+
+- 用```math标签
+
+```math
+U_{{\mathrm{S}} \to {\mathrm{L}}} =
+\left\{
+ \begin{array} {l}
+ {
+ \left\{
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ -\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=-\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \downarrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }\\
+ {
+ \left\{
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ +\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=+\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \uparrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }
+ \end{array}
+\right..
+```
+
+- 用$$标签
+
+$$
+U_{{\mathrm{S}} \to {\mathrm{L}}} =
+\left\{
+ \begin{array} {l}
+ {
+ \left\{
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ -\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \downarrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=-\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \downarrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }\\
+ {
+ \left\{
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+
+ \right.
+ \mapsto
+ \left|
+ +\frac{1}{2} \rangle _\mathrm{L}
+ \right.
+ \equiv
+ \left|
+ \uparrow \rangle _\mathrm{S}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \mathrm{Z}=+\frac{1}{2}
+ \text{''}
+ \rangle _\mathrm{D}
+ \right.
+ \otimes
+ \left|
+ \text{``}
+ \psi_\mathrm{S}=
+ \left|
+ \uparrow\rangle
+ \right.
+ \text{''}
+ \rangle_\mathrm{F}
+ \right.
+ }
+ \end{array}
+\right..
+$$
+
+- 目前只实现排版正确,表示范围的{、}、\left、\right、\begin、\end等符号,还需要了解数学含义后再准确调整。
+---
+[email] | [top](#top) | [index](#index)
+
+## 14:00 ~ 17:59
+## learn: [复习数学基础]
+
+- 纯态 pure state:
+ - 能够直接以 $\mid\psi\rangle$ 这样的态矢量(state vector)来表示的量子态。
+ - 具有“精确已知状态”的量子系统称为纯态(pure state)。在这种情况下,密度算子就是ρ=|ψ><ψ|,以100%的概率处在∣ψ>。
+ - 可以借助矢量和密度算子两种形式进行描述。
+- 混合台 mixed state:
+ - 拥有好几个纯态,例如三个纯态 $\mid\psi_{1}\rangle$, $\mid\psi_{2}\rangle$, $\mid\psi_{3}\rangle$ ,该系统处在这三个纯态上的概率分别为 $\mathrm{p}_{1}$,$\mathrm{p}_{2}$,$\mathrm{p}_{3}$ ,这样的一个量子态,我们称它为混合态。
+ - 不能用向量的形式描述量子态,是借助密度矩阵的形式描述的,那么这个量子态就是混合态,系统就是处于混合态(mixed state),称为是在ρ的系综里不同纯态的混合。
+ - 只能借助密度矩阵的形式进行描述的。
+- 继续追加时间阅读:
+ - https://blog.csdn.net/qq_43270444/article/details/109206221
+ - https://zhuanlan.zhihu.com/p/136427627
+ - https://zhuanlan.zhihu.com/p/499570837
+ - https://zhuanlan.zhihu.com/p/266248900
+ - https://www.zhihu.com/tardis/zm/art/163484824