pnbd.DERT: Pareto/NBD Discounted Expected Residual Transactions
In retina-dot-ai/BTYD: Implementing Buy 'Til You Die Models
Description
Usage
Arguments
Details
Value
References
Examples
Description
Calculates the discounted expected residual transactions of a
customer, given their behavior during the calibration period.
Usage
1
pnbd.DERT(params, x, t.x, T.cal, d)
Arguments
params
Pareto/NBD parameters - a vector with r, alpha,
s, and beta, in that order. r and alpha are unobserved parameters
for the NBD transaction process. s and beta are unobserved
parameters for the Pareto (exponential gamma) dropout process.
x
the number of repeat transactions a customer made in
the calibration period, or a vector of transaction frequencies.
t.x
recency: the time of the customer's last transaction in the
calibration period, or a vector of recencies.
T.cal
the length of the calibration period, or a vector of
calibration period lengths. Make sure that the lengths of time
periods for all parameters match.
d
the discount rate to be used. Make sure that it matches
up with your chosen time period (do not use an annual rate for
monthly data, for example).
Details
DERT(d | r, alpha, s, beta, X = x, t.x, T.cal)
x, t.x, T.cal may be vectors. The standard
rules for vector operations apply - if they are not of the same
length, shorter vectors will be recycled (start over at the first
element) until they are as long as the longest vector. It is
advisable to keep vectors to the same length and to use single
values for parameters that are to be the same for all
calculations. If one of these parameters has a length greater than
one, the output will be also be a vector.
Value
The number of discounted expected residual transactions
for a customer with a particular purchase pattern during the
calibration period.
References
Fader, Peter S., Bruce G.S. Hardie, and Ka
L. Lee. “RFM and CLV: Using Iso-Value Curves for Customer
Base Analysis.” Journal of Marketing Research Vol.42,
pp.415-430. November. 2005. http://www.brucehardie.com/papers.html
See equation 2.
Note that this paper refers to what this package is calling
discounted expected residual transactions (DERT) simply as
discounted expected transactions (DET).
Examples
1
2
3
4
5
6
7
8
9
10
11
12
13
14
params <- c(0.5629966, 12.5590370, 0.4081095, 10.5148048)
# 15% compounded annually has been converted to 0.0027 compounded continuously,
# as we are dealing with weekly data and not annual data.
d <- 0.0027
# calculate the discounted expected residual transactions of a customer
# who made 7 transactions in a calibration period that was 77.86
# weeks long, with the last transaction occurring at the end of
# the 35th week.
pnbd.DERT(params, x=7, t.x=35, T.cal=77.86, d)
# We can also use vectors to compute DERT for several customers:
pnbd.DERT(params, x=1:10, t.x = 30, T.cal=77.86, d)
retina-dot-ai/BTYD documentation built on May 22, 2019, 12:17 p.m.
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Description Usage Arguments Details Value References Examples
Description
Calculates the discounted expected residual transactions of a customer, given their behavior during the calibration period.
Usage
1 | pnbd.DERT(params, x, t.x, T.cal, d)
|
Arguments
params |
Pareto/NBD parameters - a vector with r, alpha, s, and beta, in that order. r and alpha are unobserved parameters for the NBD transaction process. s and beta are unobserved parameters for the Pareto (exponential gamma) dropout process. |
x |
the number of repeat transactions a customer made in the calibration period, or a vector of transaction frequencies. |
t.x |
recency: the time of the customer's last transaction in the calibration period, or a vector of recencies. |
T.cal |
the length of the calibration period, or a vector of calibration period lengths. Make sure that the lengths of time periods for all parameters match. |
d |
the discount rate to be used. Make sure that it matches up with your chosen time period (do not use an annual rate for monthly data, for example). |
Details
DERT(d | r, alpha, s, beta, X = x, t.x, T.cal)
x, t.x, T.cal may be vectors. The standard
rules for vector operations apply - if they are not of the same
length, shorter vectors will be recycled (start over at the first
element) until they are as long as the longest vector. It is
advisable to keep vectors to the same length and to use single
values for parameters that are to be the same for all
calculations. If one of these parameters has a length greater than
one, the output will be also be a vector.
Value
The number of discounted expected residual transactions for a customer with a particular purchase pattern during the calibration period.
References
Fader, Peter S., Bruce G.S. Hardie, and Ka L. Lee. “RFM and CLV: Using Iso-Value Curves for Customer Base Analysis.” Journal of Marketing Research Vol.42, pp.415-430. November. 2005. http://www.brucehardie.com/papers.html
See equation 2.
Note that this paper refers to what this package is calling discounted expected residual transactions (DERT) simply as discounted expected transactions (DET).
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 14 | params <- c(0.5629966, 12.5590370, 0.4081095, 10.5148048)
# 15% compounded annually has been converted to 0.0027 compounded continuously,
# as we are dealing with weekly data and not annual data.
d <- 0.0027
# calculate the discounted expected residual transactions of a customer
# who made 7 transactions in a calibration period that was 77.86
# weeks long, with the last transaction occurring at the end of
# the 35th week.
pnbd.DERT(params, x=7, t.x=35, T.cal=77.86, d)
# We can also use vectors to compute DERT for several customers:
pnbd.DERT(params, x=1:10, t.x = 30, T.cal=77.86, d)
|
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