(Note: This method is in the very early stages, so I'm trying to generate some useful feedback more than anything else. Be warned that the results are very rough.)

If you're a regular visitor here at Basketball-Reference, I think it's pretty safe to say that you're interested in all-time player ranking arguments -- it's okay, I am too. We love to try to make order out of the chaos that is the history of pro basketball, and one of our chief means of doing that is putting together lists and rating players to see where they fit in the larger context of the game. In fact, that was the motivation behind this next series of posts, to try to put together some semblance of an objective player ranking, encompassing the entire Win Shares era (1951-52 to the present).

The main problem I've had with these types of all-time rankings in the past is this: how do you deal with the playoffs, in terms of weighting them against regular-season results? Many fans place a lot of value on the postseason, but without a lot of thought going into why, other than "Player X is clutch," or "I think titles matter the most because as a fan I want my team to win them, so I'll rank Player Y higher than Player Z because he has more rings". What I want to determine, though, is an objective way of valuing the playoffs vs. the regular season, so we can achieve what I'm going to call "Championship Probability Added", or the amount by which a player increased his team's chances of winning a title through his Win Shares.

Here's a thought experiment: on average, how much is each regular-season win worth, in terms of increasing a team's probability of making the playoffs? Well, the average NBA team has a 1/30 16/30 chance of making the playoffs at the start of the season. Win 1 game, and you really don't increase that number very much, but win 20, and then 10 more, then 10 more again, and suddenly you're looking at pretty good odds of playing in the postseason. So not all wins are created equal; the 39th win of the season is worth more than the 29th or the 49th in terms of making the playoffs, because the marginal value is higher in that sweet spot around the 8th seed -- each single win takes on more importance because it can be the difference between playing on or going home. On average, though, not every win comes in that sweet spot; some come early in the year, some even come after a team has locked up a playoff berth. And Win Shares doesn't discriminate between early or late-season wins, so we have to find how much the typical NBA win is worth in terms of playoff probability added. Fortunately, this pretty easy: as we said, at the start of the year, each team has a 1/30 chance of playing in the playoffs, and by the end of the regular season, 16 of those teams have a 100% chance of making the playoffs. League-wide, there were 1230 wins, and 16 teams moved from (1/30) to (1), so the average win increases playoff probability by ((1 - (1 / 30)) * 16) / 1230 = .0126, or 1.26%.

How do we convert this to championship probability? Well, for the average playoff team, 100% playoff probability gives them a 1/16 chance of winning a ring, so replace 1 in the above equation with (1/16), and you get 0.0004, the amount by which each regular-season win (and, consequently, each Win Share) increases your probability of winning a title. (Obviously, this doesn't take into account seedings, etc., but I thought we'd keep things simple at first.) Now, once you're in the playoffs, you start with a 1/16 championship probability and add to it by advancing each round. So one team (the champs) will have increased their CP from (1/16) to 1, another (the runners-up) will have increased it from (1/16) to (1/2), and so on. We could go through all of the different deltas for teams that make each round of the playoffs, but it's easier to realize that in any given season, CPA must equal 1.0 -- if we had 0.0004 * 1230 = 0.492 CPA distributed in the regular season, the playoffs would have to see 0.508 be distributed, or 0.508 / 85 = 0.0063 CPA per playoff win in 2009. That means we can multiply RS Win Shares by .0004 and playoff Win Shares by .0063, and find how much Championship Probability Added each player had.

Note that the ratio of "importance" between the playoffs and the regular season has changed dramatically over time. In 2009, the regular season was essentially as important as the playoffs in terms of your probability of a title, because roughly half the teams in the NBA missed the playoffs -- basically you can consider the RS like a preliminary playoff round. Back in 1952, though, the playoffs were four times as important as the regular season, because out of the league's 10 teams, only 2 missed out on postseason play. This meant that performance in the postseason took on far more importance than it does today, since you were competing with 80% of the league (the equivalent of 24 teams in '09) even after making the playoffs.

A few more notes before I show the preliminary leaders in career CPA... First, how much do we discount performance the ABA? In the past I discounted it by roughly 25%, and that's the figure I used here. You'll see, though, that this number could be overstating the ABA's talent relative to the NBA, because a number of ABA rank much higher than the overwhelming majority of basketball fans would place them. The following list also does nothing to balance peak years vs. career performance to combat "compilers". In addition, there's the persistent question of a timeline adjustment, since old-school players (especially from the Auerbach/dynasty Celtics) dominate the list. By recognizing that a higher percentage of the league was still active in the postseason (therefore valuing postseason play more), I'm also indirectly ignoring the fact that even with a higher % of the league active, teams from the 1960s still had to contend with fewer total teams than today's playoff squads. I'll have to develop a way to compensate for all of these problems eventually, but in the meantime, here are the top players in career (total) Championship probability Added, going back through 1951-52, along with their top 3 seasons by CPA:

This entry was posted on Wednesday, December 2nd, 2009 at 2:02 pm and is filed under Analysis, History, Statgeekery. You can follow any responses to this entry through the RSS 2.0 feed. Both comments and pings are currently closed.