Principle of restricted choice (bridge)
Encyclopedia
In contract bridge
, the principle of restricted choice states that play of a particular card decreases the probability its player holds any equivalent card. For example, South leads a low spade, West plays a low one, North plays the queen, East wins with the king. The ace and king are equivalent cards; East's play of the king decreases the probability East holds the ace – and increases the probability West holds the ace. The principle helps other players infer the locations of unobserved equivalent cards such as that spade ace after observing the king. The increase or decrease in probability is an example of Bayesian updating as evidence accumulates and particular applications of restricted choice are similar to the Monty Hall problem.
Jeff Rubens (1964, 457) stated the principle thus: "The play of a card which may have been selected as a choice of equal plays increases the chance that the player started with a holding in which his choice was restricted." Crucially, it helps play "in situations which used to be thought of as guesswork." In many of those situations the rule derived from the principle is to play for split honors. After observing one equivalent card, that is, one should continue play as if two equivalents were split between the opposing players, so that there was no choice about which one to play. Whoever played the first one doesn't have the other one.
When the number of equivalent cards is greater than two, the principle is complicated because their equivalence may not be manifest. When one partner holds ♣Q and ♣10, say, and the other holds ♣J, it is usually true that those three cards are equivalent but the one who holds two of them does not know it. Restricted choice is always introduced in terms of two touching cards – consecutive ranks in the same suit, such as ♥QJ or ♦KQ – where equivalence is manifest.
If there is no reason to prefer a specific card (for example to signal to partner), a player holding two or more equivalent cards should sometimes randomize their order of play (see the note on Nash equilibrium). The probability calculations in coverage of restricted choice often take uniform randomization for granted but that is problematic.
The principle of restricted choice even applies to an opponent's choice of an opening lead from equivalent suits. See Kelsey & Glauert (1980).
represented in the figure. There are four spade cards 8754 in the South (closed hand) and five AJ1096 in the North (dummy, visible to all players). West and East hold the other four spades KQ32 in their two closed hands.
South leads a small spade, West plays the 2 or 3, dummy North plays the J, and East wins with the K. Later South leads another small spade and West follows low again. Now only one spade card is "unknown" to South, not yet observed or inferred, with North and East yet to play on the second spade trick. Is it better to play A, hoping to drop Q from East, or to finesse
again with 10, hoping to drop Q from West on the third round of the suit? That is, should declarer play for the defenders' original holdings to be 32 and KQ or Q32 and K? The principle of restricted choice explains why the latter is now about twice as likely, so that to finesse again by playing 10 is nearly twice as likely to succeed.
Prior to play, 16 possible West and East spade holdings or "lies" are possible from the perspective of South. These are listed at left, ordered first by "split" from equal to unequal numbers of cards, then by West's holding from strongest to weakest.
After West follows to the second spade, which is the moment of decision referred to above, only two of 16 original lies remain possible (bold), for West has played both low cards and East the king. At first galnce, it may seem that the odds are now even, 1:1, so that South should expect to do equally well with either of the two possible continuations.
However, this is not the case because if East had KQ, he could equally well have played the queen instead of the king. Thus some deals with original lie 32 and KQ would not reach this stage; they would instead reach the parallel stage with K alone missing, South having observed 32 and Q. In contrast, every deal with original lie Q32 and K would reach this stage, for East played the king perforce (without choice, or by "restricted choice").
If East would win the first trick with the king or queen uniformly at random from KQ, then that original lie 32 and KQ would reach this stage half the time and would take the other fork in the road half the time. Thus on the actual sequence of play, the odds are not even but one-half to one, or 1:2. East would retain queen from original KQ about one-third of the time and retain no spades from original K about two-thirds of the time.
Importantly, this assumes that the defenders have no signalling system, so that the play by west of (say) the 3 followed by the 2 does not signal a doubleton. During the course of many equivalent deals, East with KQ should in theory win the first trick with the king or queen uniformly at random; that is, half each without any pattern.
A priori, four outstanding cards "split" as shown in the first two columns of the table. For example, three cards are together and the fourth is alone, a "3-1 split" with probability 49.74%. To understand the "number of specific lies" refer to the preceding list of all lies.
The last column gives the a priori probability of any specific original holding such as 32 and KQ; that one is represented by row one covering the 2-2 split. The other lie featured in our example play of the spade suit, Q32 and K, is represented by row two covering the 3-1 split.
Thus the table shows that the a priori odds on these two specific lies were not even but slightly in favor of the former, about 6.78 to 6.22 for KQ against K.
What are the odds a posteriori, at the moment of truth in our example play of the spade suit? If East does with KQ win the first trick uniformly at random with the king or the queen – and with K win the first trick with the king, having no choice – the posterior odds are 3.39 to 6.22, a little more than 1:2, in percentage terms a little more than 35% for KQ. To play the ace A from North on the second round should win about 35% while to finesse again with the ten 10 wins about 65%.
The principle of restricted choice is general but this specific probability calculation does suppose East would win with the king from KQ precisely half the time (which is best). If East would win with the king from KQ more or less than half the time, then South wins more or less than 35% by playing the ace. Indeed, if East would win with the king 92% of the time (=6.22/6.78), then South wins 50% by playing the ace and 50% by repeating the finesse. If that is true, however, South wins almost 100% by repeating the finesse after East wins with the queen – for the queen from that East player almost denies the king.
. Increases and decreases in the probabilities of original lies of the opposing cards, as the play of the hand proceeds, are examples of Bayesian updating as evidence accumulates.
in the Contract Bridge Journal"; he does not give a date for the Truscott article. Published in the USA in 1960 as Master Play. George Coffin (Waltham MA).
Contract bridge
Contract bridge, usually known simply as bridge, is a trick-taking card game using a standard deck of 52 playing cards played by four players in two competing partnerships with partners sitting opposite each other around a small table...
, the principle of restricted choice states that play of a particular card decreases the probability its player holds any equivalent card. For example, South leads a low spade, West plays a low one, North plays the queen, East wins with the king. The ace and king are equivalent cards; East's play of the king decreases the probability East holds the ace – and increases the probability West holds the ace. The principle helps other players infer the locations of unobserved equivalent cards such as that spade ace after observing the king. The increase or decrease in probability is an example of Bayesian updating as evidence accumulates and particular applications of restricted choice are similar to the Monty Hall problem.
Jeff Rubens (1964, 457) stated the principle thus: "The play of a card which may have been selected as a choice of equal plays increases the chance that the player started with a holding in which his choice was restricted." Crucially, it helps play "in situations which used to be thought of as guesswork." In many of those situations the rule derived from the principle is to play for split honors. After observing one equivalent card, that is, one should continue play as if two equivalents were split between the opposing players, so that there was no choice about which one to play. Whoever played the first one doesn't have the other one.
When the number of equivalent cards is greater than two, the principle is complicated because their equivalence may not be manifest. When one partner holds ♣Q and ♣10, say, and the other holds ♣J, it is usually true that those three cards are equivalent but the one who holds two of them does not know it. Restricted choice is always introduced in terms of two touching cards – consecutive ranks in the same suit, such as ♥QJ or ♦KQ – where equivalence is manifest.
If there is no reason to prefer a specific card (for example to signal to partner), a player holding two or more equivalent cards should sometimes randomize their order of play (see the note on Nash equilibrium). The probability calculations in coverage of restricted choice often take uniform randomization for granted but that is problematic.
The principle of restricted choice even applies to an opponent's choice of an opening lead from equivalent suits. See Kelsey & Glauert (1980).
Example
Consider the suit combinationSuit combinations
In the partnership card game contract bridge, a suit combination is the holdings of one suit in declarer's and dummy's hands. The holdings in two opposing hands are unknown; one suit combination covers all possible lies of the remaining cards in those two closed hands. A bridge deal diagram usually...
represented in the figure. There are four spade cards 8754 in the South (closed hand) and five AJ1096 in the North (dummy, visible to all players). West and East hold the other four spades KQ32 in their two closed hands.
South leads a small spade, West plays the 2 or 3, dummy North plays the J, and East wins with the K. Later South leads another small spade and West follows low again. Now only one spade card is "unknown" to South, not yet observed or inferred, with North and East yet to play on the second spade trick. Is it better to play A, hoping to drop Q from East, or to finesse
Finesse
In contract bridge and similar games, a finesse is a technique which allows one to promote tricks based on a favorable position of one or more cards in the hands of the opponents....
again with 10, hoping to drop Q from West on the third round of the suit? That is, should declarer play for the defenders' original holdings to be 32 and KQ or Q32 and K? The principle of restricted choice explains why the latter is now about twice as likely, so that to finesse again by playing 10 is nearly twice as likely to succeed.
| 2-2 Split | 3-1 Split | 4-0 Split | |||
|---|---|---|---|---|---|
| West | East | West | East | West | East |
| KQ | 32 | KQ3 | 2 | KQ32 | — |
| K3 | Q2 | KQ2 | 3 | — | KQ32 |
| K2 | Q3 | K32 | Q | ||
| Q3 | K2 | Q32 | K | ||
| Q2 | K3 | K | Q32 | ||
| 32 | KQ | Q | K32 | ||
| |3 | KQ2 | ||||
| |2 | KQ3 |
After West follows to the second spade, which is the moment of decision referred to above, only two of 16 original lies remain possible (bold), for West has played both low cards and East the king. At first galnce, it may seem that the odds are now even, 1:1, so that South should expect to do equally well with either of the two possible continuations.
However, this is not the case because if East had KQ, he could equally well have played the queen instead of the king. Thus some deals with original lie 32 and KQ would not reach this stage; they would instead reach the parallel stage with K alone missing, South having observed 32 and Q. In contrast, every deal with original lie Q32 and K would reach this stage, for East played the king perforce (without choice, or by "restricted choice").
If East would win the first trick with the king or queen uniformly at random from KQ, then that original lie 32 and KQ would reach this stage half the time and would take the other fork in the road half the time. Thus on the actual sequence of play, the odds are not even but one-half to one, or 1:2. East would retain queen from original KQ about one-third of the time and retain no spades from original K about two-thirds of the time.
Importantly, this assumes that the defenders have no signalling system, so that the play by west of (say) the 3 followed by the 2 does not signal a doubleton. During the course of many equivalent deals, East with KQ should in theory win the first trick with the king or queen uniformly at random; that is, half each without any pattern.
Better calculation of odds
This is an attempt at a more accurate calculation of the odds as explained in the previous section.A priori, four outstanding cards "split" as shown in the first two columns of the table. For example, three cards are together and the fourth is alone, a "3-1 split" with probability 49.74%. To understand the "number of specific lies" refer to the preceding list of all lies.
| Split | Probability of Split |
Number of specific lies |
Probability of any specific lie |
|---|---|---|---|
| 2-2 | 40.70% | 6 | 6.78% |
| 3-1 | 49.74% | 8 | 6.22% |
| 4-0 | 9.57% | 2 | 4.78% |
Thus the table shows that the a priori odds on these two specific lies were not even but slightly in favor of the former, about 6.78 to 6.22 for KQ against K.
What are the odds a posteriori, at the moment of truth in our example play of the spade suit? If East does with KQ win the first trick uniformly at random with the king or the queen – and with K win the first trick with the king, having no choice – the posterior odds are 3.39 to 6.22, a little more than 1:2, in percentage terms a little more than 35% for KQ. To play the ace A from North on the second round should win about 35% while to finesse again with the ten 10 wins about 65%.
The principle of restricted choice is general but this specific probability calculation does suppose East would win with the king from KQ precisely half the time (which is best). If East would win with the king from KQ more or less than half the time, then South wins more or less than 35% by playing the ace. Indeed, if East would win with the king 92% of the time (=6.22/6.78), then South wins 50% by playing the ace and 50% by repeating the finesse. If that is true, however, South wins almost 100% by repeating the finesse after East wins with the queen – for the queen from that East player almost denies the king.
Better yet
A more complete treatment would consider all of the choices, not only the choices of high card from two equals. In the example spades suit, we must incorporate the choice of low card by West from 32 and from Q32. The 2 and 3 are manifestly equivalent cards which West should play uniform randomly from both original holdings – that is, randomly on the first two tricks, always retaining the queen from Q32. The preceding probability calculation depends on West doing so.Mathematic theory
The principle of restricted choice is an application of Bayes LawBayes' theorem
In probability theory and applications, Bayes' theorem relates the conditional probabilities P and P. It is commonly used in science and engineering. The theorem is named for Thomas Bayes ....
. Increases and decreases in the probabilities of original lies of the opposing cards, as the play of the hand proceeds, are examples of Bayesian updating as evidence accumulates.
Further reading
The article on Restricted Choice was originated by Jeff Rubens in the first Encyclopedia (1964 edition). In it and subsequent editions (eg. on page 381 of the 6th edition) Rubens states that Reese in his book Master Play "unified" the "underlying principles ... first discussed by Alan TruscottAlan Truscott
Alan Fraser Truscott was a bridge player, author and columnist. He wrote the daily bridge column for The New York Times for 41 years, from 1964 to 2005 and served as Executive Editor for all six editions of The Official Encyclopedia of Bridge, 1964 to 2002.- Britain :Truscott was born in Brixton,...
in the Contract Bridge Journal"; he does not give a date for the Truscott article. Published in the USA in 1960 as Master Play. George Coffin (Waltham MA).