Hedging EA3.8.8.7 能否增加净仓单数量管理功能
首先非常感谢eabang的高老师,在qq中回答了我的大量的问题,让我受益匪浅。在这里再次感谢。开发需求:净仓单数量管理功能
目前在Hedging EA3.8.8.7中可以从信息,盈亏面板出看到实时的净仓数据,如下图。
在单边行情中,马丁对冲策略(无脑开仓,多空对冲)是否能控制好风险很大程度上取决于这个净仓量的大小。在单边的行情中,通常盈利的方向的单会用多个单数(n单)加总的盈利对冲到少量的几个亏损单(m单),就是说这个数量上N>M,经过多次对冲后,就会形成亏损的单单数越积累越多,盈利始终只有1-2单的局面。如下图中多单已经22笔,空单只有2笔,多单净仓为0.78手。
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
为了说明问题,我再贴一下行情继续单边后的仓位图。更好的说明问题。
继续单边后多单变成1.13手,空单只有0.01手,净仓单继续扩大到1.12手。
这个时候如果继续单边下去,这个ea可能就爆仓了。因为空单永远无法及时对冲掉越来越大的多单。
反过来,只要马丁对冲策略能够盈利的时候,这个净仓会非常的小,因为马丁适合震荡行情,只要不断震荡,这个净仓量就会保持在一个很小的幅度里来回震荡。而一旦净仓量突破一个数值了,那就说明单边行情来了。
我经过大量的回测,马丁策略的理论研究,和参考了其他一些马丁策略的做法,我个人认为如果可以实时的管理这个净仓量,可以很好的加强这个ea的抗风险的能力。主要有两种管理的办法。
1. 消极管理。 设置一个最大净仓值,一旦到达这个值,停止净仓方向的加仓,等待行情转向后,净仓量回归到最大值内,自动恢复加仓功能。
2. 积极管理, 设置一个最大净仓值,一旦到达这个值,反向加仓,保值净仓值始终在最大值内。然后该加仓的继续加仓,该对冲的继续对冲。只要净仓量超过最大值了,就反向开仓,如果单边行情继续,这个过程会一直持续下去,这样做一方面可以大大减轻账户的压力,另一方面对冲掉的反向单会不断地对冲掉一些亏损单。一直到净仓值减小到最大值以下。
有人可能第一反应是,这个是不是就是反向对冲面板里的锁仓功能?但是经过多次回测,发现锁仓功能并不起到这个作用。因为单边行情中,亏损越来越多,锁仓的量也越锁越大,最后造成一个巨大的浮亏直到爆仓。即使使用了锁仓后关闭加仓功能,那这个锁住的亏损就一直存在下去了,不是一个解决的好办法。同样的现在的加仓和开仓面板中的最大手数控制功能只能计算单边,或者双边数量,并不计算净仓量,无法起到这个目的。
使用了净仓量管理的办法,ea不需要停,可以继续对冲,同时锁定了亏损的单数,虽然行情继续单边,亏损还会加大,但是会得到很好的控制,而且反向单会不断地通过对冲贡献一些盈利。如果可以同时控制反向单的数量(比如设置一个倍数x),慢慢会直接冲掉所有亏损。
举一个积极管理的具体例子,再说明一下需求。
净仓管理开关设置
最大净仓值,( 0.5 )手
反向单数量倍数 (2 )倍
当净仓值变成0.53时,净仓管理功能启动,ea开反向单0.03*2=0.06手,这时净仓变成0.47,净仓管理功能关闭,ea其它功能继续,行情继续单边,ea逆势加仓,净仓再次变成0.54手,净仓管理功能再次启动,反向开仓0.08手。行情反转,多空对冲,净仓变成0.47手,净仓管理功能关闭。
这是功能可以放在对冲版面中。
希望我表达的清楚了,欢迎讨论和问题。谢谢。
第一次发帖,这个图片黏贴再帖子里的不见了。第一张图没有保存,但是看第二张图就可以了。 这个需求应该在实盘中有很大帮助,希望唐老师可以考虑加急开发,我愿意参与均摊加急费用。 谢谢楼上汇友。
补充一点情况。我按照这个思路用手动对一个欧美去年一年的行情做了回测。
我打开信息盈亏面板,只要看到净仓多单大于0.5手了,就手动开0.3空单。欧美去年的单边,一路上全是多单一大堆,空单1-2个的情况,手动开了n多次空。没有手动,这个ea最后是50%以上的浮亏,加了这个粗糙的手动操作,浮亏3%,证明这个思路是对的。
然后我又做了一次,这次每次开空不是0.3,而是0.8手,这个ea最后大幅盈利。这说明这个功能不仅可以减少亏损,其实也可以用来做单边行情。
补充开发需求,
补反向单的数量处,除了可以选择倍数,再加一个加减(x)手数选项。倍数不容易精确控制,加减法容易控制。
谢谢老师。
是在反向对冲中,与锁仓功能类似,加入一个净仓位的控制功能是吗?
是不是这样的交易逻辑。
以多单来说,净仓位设置的是0.5手,净仓位多开0.02手。
行情下行,多单现在加仓有总0.5手,空单0手。
多单再次加仓0.08手,现在0.58手多单,净仓位0.58。
这时空单开仓0.08+0.02=0.1手,净仓位0.48。
行情下跌,多单又加仓0.15手,现在0.73多单,0.1空单,净仓位多单0.63。
空单保持净仓位,又下单0.13+0.02=0.15手,这时空单总0.25手,净仓位0.48手。
如果行情继续下跌,多单一直加仓,就按上面的方法,一直开仓空单,保持净仓位。
假设现在行情上涨,多单平仓,空单有0.25手,没有达到0.5手的净仓位,ea就不会自动开仓多单。
你这个净仓位的思路,我觉得也是有点问题,就是空单为了保持净仓位,一直在开仓,结果空单大于了0.5手,这时行情上涨,多单止盈全平了,现在空单的仓位是大于0.5手的,这时空单加仓,就又要补多单,是这样吗?
mchal 发表于 2022-8-30 19:30
这个需求应该在实盘中有很大帮助,希望唐老师可以考虑加急开发,我愿意参与均摊加急费用。 ...
你也在关注啊,这个想法,我觉得值得研究。
唐老师 发表于 2022-8-31 11:28
你也在关注啊,这个想法,我觉得值得研究。
我认为这个需要配合对冲方式来进行, 譬如在某些条件下,不进行正冲(多冲多or空冲空)。
同时nv1 末单对冲增加反冲模式。当前的反冲是用一个方向的全部单去冲另一方向的单子。改成或者增加一个用一个方向的盈利单子去对冲另一方向的单子的方式会更好一些。
我自己目前对于套得比较深的单子采取的方式是计算多空单距离现价的平均点数,优先对冲离现价距离较远&仓位较重的那个方向的单子。这样虽然解套时间变长,但浮亏增加的速度得到了明显的控制。
mchal 发表于 2022-8-31 12:46
我认为这个需要配合对冲方式来进行, 譬如在某些条件下,不进行正冲(多冲多or空冲空)。
同时nv1 末单 ...
大哥,你们的讨论我完全看不懂,感觉像一门新的语言一样。太厉害了。
เงิน 发表于 2022-8-31 13:17
大哥,你们的讨论我完全看不懂,感觉像一门新的语言一样。太厉害了。
我们做了篇小白入门文章,相信可以带你进入程序化交易的大门: https://www.eabang.com/help/HedgingMartin/post/254.html
净仓管理开关设置
最大净仓值,( 0.5 )手
反向单数量倍数 (2 )倍
↑你是怎么知道2倍可以满足你想要对冲掉的量的?
你可以想象一下下面这个场景
打个比方,正好来了一波非常急的拉升,实际需要5倍手数才能满足你要对冲的量,但是你只设了2倍,怎么办?
5倍手数的话可以让净仓位恢复到0.5手以下,但是你只开了2倍,等待对冲的过程中又来了一波拉升,之前的开的2倍反向单对冲完发现无法对冲掉想要的量,净仓位变成0.52手了,继续2倍,又来了一波拉升,相对拉升量来说,2倍依然不够,对冲完净仓位变成0.54手了,继续2倍,但是相对拉升量2倍依然不够,亏损单照样会越积越多。
那你会说加大倍数,倍数加大,行情翻转之后,这些加倍的单会反过来勒住脖子。
其实做回测有一个逻辑硬伤,只要看过一次走势,你这个人本身就变成未来函数了。
不知道你能不能理解未来函数的意思,就好比坐着时间机器回到过去解决问题,某个问题可以解决的非常好,但是这个解决的方法一定是没有普遍性的,因为如果有普遍性的话就不存在你要坐着时间机器回去解决问题这件事了,这就是一个悖论了。