用Hedging对冲,这样的结果算什么水平?
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从5月29日开始,到12月24日结束,起始资金2000美金,固定仓位,用Hedging对冲,这样的结果算什么水平?风险是不是看相对亏损?哪个大佬指点一下
我本来上传了截图的,发出来怎么没有截图了 唐老师视频《回测报告最应该关注的项目》里讲过的,重点看“相对亏损”,你可以把视频找出来看一下
就你发的图片来看,我觉得你的策略还是很不错的,不过要用极端行情年份测试一下,只有通过极端行情不爆仓,才是好的策略。 你说的《回测报告最应该关注的项目》我搜索半天没有搜索到啊
本帖最后由 tradegod 于 2025-1-8 12:07 编辑
你选择的这半年时间恰好没有遇到大亏,可以说“运气不错”。不过不知道你的测试数据怎么样?是否比较粗、比较少?如果不公布具体配置,很难估计你的策略是否赚钱。回测时能赚结果实盘时爆仓的,占绝大多数。
其实看浮亏比例,也未必一定能看出什么。比如说一些“毛刺”,如果你加入了一个砍仓过滤,而这个过滤对平常的运行毫无影响,那么结果浮亏比例一下子就削掉了尖峰;而你不削的时候,就会误以为策略好像处处都是大山——而不是毛刺——似地。看极端的浮亏比例,容易把毛刺看作是必然,容易误会。这就好像是统计师看样本中问题的概率分布图形是否集中还是发散,而不会统计的人才会只针对极值“抬杠”。 你的测试数据,某些人可能认为你冒着超过了40%的浮亏去搏收益,那会说你的策略“坚决不可行”。但是你肯定会强调你最终的收益。
我是认为仅看这些根本看不出什么来。就好像相亲只给看一张整容照片。 火钳刘明 老师有视频讲解的
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