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发表于 2004-9-5 20:13
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However, there are a couple things to watch out for if you use this kind of analysis:
1.This kind of analysis is not always relevant. If the difference between the average time in a trade for two systems is less than twenty percent, it is probably not necessary to worry about. (Twenty percent is a rule of thumb, and can be effected by the size of the account and the type of trading system.)
2.In terms of optimizing the margin efficiency, make sure it is relevant to your system. As mentioned above, if you do not have a method for increasing the number of signals, there is no way to increase the margin efficiency for your system.
One last thought, the profit over time ratio is not a static number. It can, and does, change from month to month. If traders see a change in the profit over time ratio, it can often be an early signal that the market is changing. For example, it is reasonable to see a change in the profit over time ratio when the market is changing from a trending to a choppy market.
How Important is the System's Percent Win Ratio?
In the trading systems the authors have found and used, the reliability of the winning percentage of the system was not a major factor in selecting it over other systems. There are trading systems that win 65% of the time and have the same profit and draw down as trading systems that win only 35% of the time. To some extent, given that most of the other parameters can remain the same, choosing a high reliability versus a low reliability can be a function of taste. Some people prefer trading systems that win frequently, others prefer to go for the big win. Ironically, there are many traders who have good systems that take a reliable profit by exiting the market early in a trend.
These are also the same traders who often kick themselves for the rest of the trend, due exiting too early, even though they have a good system.
Many traders tend to focus on the percentage of winners. There seems to be an assumption that systems that win more often make more money. In some instances this is true. However, in many instances it is not. It is definitely not a conclusion to assume without thorough analysis of the system. It is the authors' experience, that most of the trading systems that traders will find, will only win approximately 50% of the time. Additionally, many money managers have systems that win more like 35% of the time. (Part of the reason for this is because most money managers select trending systems.)
What is strange is that most traders/investors know that professionals use lower probability systems, but their eyes bug out and their mouths start salivating when they hear about an 85% winning system. The simple fact is, the profitability of a system is not directly related to how often it wins.
While reliability is not a major factor in the viability of a trading system, it can have some major effects on the results of the system. Often times, the percentage of winning trades tells traders much more about the potential for loss than gain. In this respect, looking at the downside potential for a system is important. Let's look at a trading system that has a 50% winning percentage. The following table reflects the possible outcomes after ten trades:
Looking at this table, it is clear that traders with 50% winning systems have a 17.2% chance of getting seven losses or worse in a sample of ten trades. (This is calculated by adding the bold figures together.) This level of confidence may not be acceptable to all traders, especially in situations where they have limited capital. Another way of explaining this phenomenon is that after ten trades, there is a 17.2% chance that a 50% wining system will appear as a 30% winning system. (In fact, there is a 75.4% chance a 50% winning system will appear to be anything but a 50% system after ten trades.) In this sense, it can become very hard to trust the value for the percentage of winners in any trading system.
Another issue with the percentage winning value of a system is that it can effect the worst run of a system. From a statistical point of view, the reliability of a system influences the maximum number of consecutive losers a system can be expected to have. The maximum number of consecutive losses can become relevant to traders because it is often associated with the drawdown period of a system. To give the reader a sense about what kind of losses to expect in a row, consider the following table. It contrasts the winning percentage of a system and in turn the probability of getting a run of losing trades in a row:
To use an example from this table, if traders have a 50% system, for any run of three trades, they will have a 12.5% (bold) chance of getting three losses in a row. This table illustrates how the percentage of winning trades can effect the drawdown period for a system.
All things considered, this table is probably more valuable to traders mentally than to their accounts. It is valuable for traders to have realistic expectations of the worst run in a system. It is often during these periods that traders feel their system has "broken down." Unfortunately, it is during this "broken down" period that many traders give up on good systems.
Therefore, is the percentage of winners an important statistic to look at? On one hand, it can help traders have reasonable expectations about the performance of a system. On the other hand, the profitability of a system is only partially linked to the reliability of winning trades. So, the truth lies some where in the middle.
Z-Scores and Confidence Limits
Looking at the percentage of winners and losers only tells part of the story when it comes to trading. This kind of analysis assumes that all the trades in a sample happened independently of each other. A good example of this kind of independent relationship between examples (trades) would be a coin toss. If you flip a coin, there is a 50% chance you will get heads, regardless of the result of the last coin toss. For independent situations, past events do not effect the probability of current events.
The markets, however, can have a dependency between trades, where the outcomes of the trades effect each other. For example, the fact that a system has lost on a long trade can effect the chances of winning in the future. A good analogy of this kind of situation is most card games. Once a card is played, and it isn't returned to the deck, it will effect the probability of the other cards to be played. However, the next card to be played is still a random occurrence. In this sense the way a deck is played is both random and dependent on past events. This type of situation can apply to trading, where past events effect the future.
Traders may find systems where the wins or losses come in streaks. Conversely, traders may also find that after a win they usually receive losses, or vice a versa. It is also possible to find dependency in the profitability of the trades. For example, traders may find that highly profitable trades are followed by low profit trades, or they may find the profitability going in streaks.
The Z-score is a statistical value that helps traders analyze the dependence between trades. The Z-score is calculated by comparing the number of runs there are in a set of trades, with the number of runs that would be expected statistically. This number is then usually transformed into another value called the Confidence limit. The Confidence limit is expressed in terms of a percentage, such as "90%." However, when the value is expressed this way, it can be a bit confusing to laymen of statistics. We are usually conditioned to consider a 90% value as pretty reliable, but this is not the case when examining the Confidence limit. The reason for the confusion is that unless a system has a Confidence limit of 94% or better, it is probably not a very reliable conclusion. It is possible for traders to make some valid conclusions about a trading system if the Confidence limit is 90-94%. However, usually in this range, it is more likely the traders are only viewing a statistical anomaly, and the system does not have any exploitable dependence.
In order to calculate the Z-score and the Confidence limits, it is necessary for traders to have at least thirty trades in the sample. This is due to the calculations relying on the standard deviation of the system. (The Confidence limit is actually the amount of examples one would statistically expect within X standard deviations. For example, one standard deviation represents the area where 68% of all the events will fall. If the Z-score was one then the confidence limit would be 68%.)
The Confidence level is only a positive number. However, the Z-score can be either positive or negative. Each has a slightly different meaning to traders.
1.A negative Z-score means there are fewer streaks in the sample of trades tested than would be expected statistically. This means winning trades tend to follow wining trades and losing trades tend to follow losers.
2.A positive Z-score means there are more streaks in the trading system than would be expected. This means winning trades tend to follow losing trades and vice a versa.
If traders find a system with a reasonable Confidence level, it is possible to begin to exploit this aspect of the system. The rest of this section will focus on two examples to demonstrate the possible application of this type of analysis.
1.The first example trading system has a positive Z-Score.
2.The second example trading system has a negative Z-Score.
Keep in mind these are select examples. These types of calculations can be used with and/or applied to other techniques of money management equally as well. The point of these examples is NOT to show which is the best method, but to stimulate thinking on this subject.
Example 1 - Positive Z-Score
These are the basic results of a system before any money management method is applied. Basically it made $8,455 on a drawdown of 8%.
System Information:
Total Profit : $ 8455.00
Gross Profit : $ 18765.00
Gross Loss : $(-10310.00)
Worst Drawdown on a Percentage Basis
Drawdown as a Percent : -08%
Drawdown From : $ 36025.00
Drawdown Dollar Value : $(-2860.00)
Drawdown To : $ 33165.00
Number of Trades : 45
Number of Wins : 24
Percent Wins : 53%
Number of Losses : 21
Interdependence of trade results
Z score : 2.15
Confidence Limit : 96%
As you can see from the values given, this trading system has a positive Z-score of 2.15. This translates into a confidence limit of 96%. Having a positive Z-score means in this system, wins tend to be followed by losses and via versa. Based on this information, it would seem reasonable to try a Martingale or pyramid money management approach to the system. For example, after traders experience a loss, they will take additional units/contracts on the next signal as a way of recouping losses and/or increasing the system's overall profitability. The following table shows a few methods associated with using this approach to money management:
As this table illustrates, application of the Z-Score can have a dramatic effect on a trading the system. If you would please look at example A, you will see the normal results from this system. If traders had used a Martingale method like in example B, the designated trades would have reduced the drawdown to the account by more than 50% and doubled the profit. Additionally, if traders had used a method like in example C, they would have quadrupled the profit of the system, while only increasing the overall drawdown to the account by 1%. This has moved a fairly average system into a very positive system.
At this point it is often easy to get trade dependence and independence mixed up and say something like, "If I'm doubling up on losing trades and I lose four trades in a row, that would be a loss of fifteen units/contracts! What are the chances of getting four losers in a row?"
Naturally we would grab our calculators and find that for a 53% system, the odds of getting four losing trades in a row is approximately 11%. But this is not true. The chances of getting four losers in a row is less than 11% because we know there is a dependency between the trades and that winners follow losers and losers follow winners.
In summary, a positive Z- score can easily be exploited by using a pyramiding method to correct for losers and winners. Aggressive traders, who have a positive Z-Score for their systems, can turn this fact into cash if they apply proper money management intelligently.
Example 2 - Negative Z-Score
The following results are for a different system with no money management applied to it:
System Information:
Total Profit : $ 3045.00
Gross Profit : $ 17505.00
Gross Loss : $ (-14460.00)
Worst Drawdown on a Percentage Basis
Drawdown as Percent: -22%
Drawdown From: $ 28210.00
Drawdown Dollar Value: $(-6300.00)
Drawdown To : $ 21910.00
Number of Trades : 41
Number of Wins : 20
Percent Win : 49%
Number of Losses : 21
Interdependence of trade results
Z score : -2.21
Confidence limit : 97%
Basically this trading system made $3,045 on a 22% drawdown and has a negative Z-score. This means it has fewer streaks than one would statistically expect from a set of trades. (In other words, the wins and losses tend to come in runs.) One method of maximizing this approach would be to use crossing equity curves to insure that the system is in the market during the good phases and out when it's bad. (Please reference the section of this book on crossing equity curves for more details on this method.)
The following table illustrates the performance of a trading account using different lengths for the moving averages, for the cross over.
As you can see from the table, this approach had a dramatic effect on the account. Consider the bolded combination above, it made $9,470 with only a 7% drawdown. This is an incredible improvement over the results from not using money management. ($3,045 on a 22% drawdown.) Basically, it tripled the profit of the system and reduced the drawdown by two thirds. This is effective money management! Additionally, for a system that has a good negative Z-Score, almost any two averages will work to improve the results of a system.
For systems that have a negative Z-Score, using crossing equity curves is a natural fit for money management. The crossing equity curves technique is an approach designed especially for catching the winning and losing waves in a system, which is what a negative Z-Score implies. Other techniques may also work as well. For example, a pyramiding method that increases the risk after a win and decreases after a loss would also work suitably.
If you have read this book in a sequential manner, then you have already been through the sections describing the "Amount Traded on a Win or Loss" and "Crossing Equity Curves". Both sections warn traders about the pit falls of applying these two forms of money management when there is a low Z-score and Confidence limit. The examples given in these sections also show how the results can be extremely sensitive to optimization, if the Z-scores are too low. If the examples in the other sections did have reliable Z-scores, it is reasonable to assume they would show results similar to the ones above. The examples in the other sections of this book are meant as a warning to traders who blindly try to exploit a trading system in this manner, without having the proper knowledge about the anomalies and characteristics of the system in question.
Knowing the Z-score about a trading system is one of the best things traders can do. It will allow traders to squeeze additional profit out of a system, without changing any of the parameters of the trading signals to enter the market. It is also one of the most direct ways traders can turn knowledge into money.
Optimal f
Some traders believe the Optimal f is the single best way to analyze a trading system. Others never use this method and do just fine without it.
When comparing the Optimal f value of two systems, all other things being equal, it is wise to pick the account with the larger value. The system with the largest Optimal f value will have the potential to grow the quickest, if the proper Optimal f money management technique/approach is used.
The Optimal f graph is usually displayed as an arch, similar to the one shown below. The optimal value is the peak of the curve. This peak is usually called the Optimal f. (Other places on the graph are usually called, "other values of f".)
In this optimal value lies the tools for growing an account the fastest. But it is necessary to go through a few steps before the data is truly useful to traders. To apply the Optimal f and find the optimal value to risk for an account, follow the steps below:
1.Establish the account size. This is the starting account size and should be obvious to traders.
2.Establish the size of the single largest losing trade. Traders will need to look at the trades to figure this out.
3.Get the Optimal f value from the software.
4.Divide the largest loss by the Optimal f.
5.Divide the account value by the results of step 4.
6.Repeat after each trade.
The results from step 5 will tell traders how many units/contracts to take on each trading signal for maximum growth to their accounts. The following traces through the aforementioned steps with a real example:
1.The account size is $25,000.
2.The largest losing trade is $2,050.
3.The Optimal f is 27%.
4.$7,592 = ( $2,050 / 0.27 ).
5.3.29 = $25,000 / $7,592.
6.Repeat for the next trade.
In a perfect world, traders would enter the next trading signal with 3.29 contracts. Since it is not a perfect world, they need to round the number down to three. Due to the necessity to round down in real-time trading, some traders may find that a value near, but not the optimal, may produce the fastest gain to an account.
Although analyzing different trading systems on the basis of the Optimal f value gives traders insight into which system has the greatest potential for growth, it also has some disadvantages. The Optimal f does not give traders any insight into the risks of using this approach. In many cases, having a high Optimal f, and applying this form of money management to maximize an account, can leave traders susceptible to large draw downs or greatly increase the probability of ruin for an account.
Probability of Ruin
The Probability of Ruin (POR) is the "statistical possibility" a trading system will deplete an account to the point of ruin, before achieving a dollar level deemed as being successful. Ruin is defined as the level of an account when traders will stop trading. Knowing this value can be very important to traders. The POR illustrates to traders the statistical possibility that their trading systems will naturally, by the laws of probability, drift to a point of success or ruin.
To calculate the Probability of Ruin, traders must slog though a horribly long equation. (However, just let the kNOW Software do the math.) In short, the following represents some basic outcomes/elements of the equation:
All other things being equal:
1.The greater the size of the average wins, the lower the POR.
2.The larger the average risk per trade, the greater the POR.
3.The larger the initial account size, ,the lower the POR
4.The higher the percentage of winning trades, the lower the POR.
5.The smaller the account, the greater the POR.
Some authors, have said that the probability of ruin (POR) is not a relevant concept because it does not tell traders anything they can capitalize on. In this sense they are correct. Additionally, it tends to be a small value in winning systems. However, all other things being equal, when given the choice between two trading systems, pick the one with the lowest POR. Also, the probability of ruin should be a value that many small investors/traders look at. Since small investors/traders usually have small accounts, the aggressive forms of money management methods can have PORs that deserve attention.
For the most part, PORs tend to be low. It is usual to see trading systems that have 0-5% for their PORs. For trading systems that work normally and have a reasonable account size, this is what should be expected. The second most common POR is 100%, meaning that failure is almost completely guaranteed. These tend to be trading systems that would fail under most circumstances anyway. Every now and then you get something in the middle range.
In summary, the POR is a method/value that should be curious to all traders, but it usually offers little additional insight, since most of the time the values are below 5%. However, under some circumstances, it can show traders they have a significant risk of ruining their account. When traders are faced with this reality, it means they are risking far too much on each individual trade. With this knowledge, traders should then limit the risk per trade, in an attempt to bring the POR down to an appropriate level. By trading small portions of their accounts, traders are giving themselves, in essence, more chances to win.
Conclusion- For Now
It is the sincere desire of the authors that through the reading of this book and the using of the kNOW Software users of the kNOW Program will become not only very successful monetarily but also very happy traders and investors.
Trading/investing is not easy, even if all you have to do is throw old chicken bones over your shoulder to make a decision to get in or out of the market. Therefore, we hope the kNOW Program will give you the knowledge and the initial foundation to make sound money management decisions and the desire to learn more about the arcane world of "risk management."
It is the authors intent to continue updating this book and adding new money management techniques/approaches and options as they become known and tested.
These new ideas/methods will also be included into the kNOW Software, as they become available. However, in order to expedite this updating effort we will need all the help we can get, so please, forward to us any ideas, questions or new techniques you would like to have us explore and add to the Program.
Thank you again for your time and effort in reading this book and we hope it has been a rewarding experience for you. Creating it has been a real pleasure. |
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发表于 2005-5-28 01:26