bgbb.PosteriorMeanTransactionRate: BG/BB Posterior Mean Transaction Rate
In retina-dot-ai/BTYD: Implementing Buy 'Til You Die Models
Description
Usage
Arguments
Details
Value
References
Examples
Description
Computes the mean value of the marginal posterior value
of P, the Bernoulli transaction process parameter.
Usage
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bgbb.PosteriorMeanTransactionRate(params, x, t.x, n.cal)
bgbb.rf.matrix.PosteriorMeanTransactionRate(params, rf.matrix)
Arguments
params
BG/BB parameters - a vector with alpha, beta, gamma, and delta, in that order. Alpha and beta are unobserved parameters for the beta-Bernoulli transaction process. Gamma and delta are unobserved parameters for the beta-geometric dropout process.
x
number of repeat transactions a customer made in the
calibration period, or a vector of calibration period transaction
frequencies.
t.x
recency - the last transaction opportunity in which
a customer made a transaction, or a vector of recencies.
n.cal
number of transaction opportunities in the
calibration period, or a vector of calibration period transaction
opportunities.
rf.matrix
recency-frequency matrix. It must contain columns for frequency ("x"), recency ("t.x"), and the number of transaction opportunities in the calibration period ("n.cal"). Note that recency must be the time between the start of the calibration period and the customer's last transaction, not the time between the customer's last transaction and the end of the calibration period.
Details
E(P | alpha, beta, gamma, delta, x, t.x, n). This is
calculated by setting l=1 and m=0 in
bgbb.PosteriorMeanLmProductMoment.
x, t.x, and n.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 posterior mean transaction rate.
References
Fader, Peter S., Bruce G.S. Hardie, and Jen Shang. “Customer-Base Analysis in a Discrete-Time Noncontractual Setting.” Marketing Science 29(6), pp. 1086-1108. 2010. INFORMS. http://www.brucehardie.com/papers/020/
Examples
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data(donationsSummary)
rf.matrix <- donationsSummary$rf.matrix
# donationsSummary$rf.matrix already has appropriate column names
# starting-point parameters
startingparams <- c(1, 1, 0.5, 3)
# estimated parameters
est.params <- bgbb.EstimateParameters(rf.matrix, startingparams)
# return the posterior mean transaction rate vector
bgbb.rf.matrix.PosteriorMeanTransactionRate(est.params, rf.matrix)
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
Computes the mean value of the marginal posterior value of P, the Bernoulli transaction process parameter.
Usage
1 2 3 | bgbb.PosteriorMeanTransactionRate(params, x, t.x, n.cal)
bgbb.rf.matrix.PosteriorMeanTransactionRate(params, rf.matrix)
|
Arguments
params |
BG/BB parameters - a vector with alpha, beta, gamma, and delta, in that order. Alpha and beta are unobserved parameters for the beta-Bernoulli transaction process. Gamma and delta are unobserved parameters for the beta-geometric dropout process. |
x |
number of repeat transactions a customer made in the calibration period, or a vector of calibration period transaction frequencies. |
t.x |
recency - the last transaction opportunity in which a customer made a transaction, or a vector of recencies. |
n.cal |
number of transaction opportunities in the calibration period, or a vector of calibration period transaction opportunities. |
rf.matrix |
recency-frequency matrix. It must contain columns for frequency ("x"), recency ("t.x"), and the number of transaction opportunities in the calibration period ("n.cal"). Note that recency must be the time between the start of the calibration period and the customer's last transaction, not the time between the customer's last transaction and the end of the calibration period. |
Details
E(P | alpha, beta, gamma, delta, x, t.x, n). This is
calculated by setting l=1 and m=0 in
bgbb.PosteriorMeanLmProductMoment.
x, t.x, and n.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 posterior mean transaction rate.
References
Fader, Peter S., Bruce G.S. Hardie, and Jen Shang. “Customer-Base Analysis in a Discrete-Time Noncontractual Setting.” Marketing Science 29(6), pp. 1086-1108. 2010. INFORMS. http://www.brucehardie.com/papers/020/
Examples
1 2 3 4 5 6 7 8 9 10 11 12 | data(donationsSummary)
rf.matrix <- donationsSummary$rf.matrix
# donationsSummary$rf.matrix already has appropriate column names
# starting-point parameters
startingparams <- c(1, 1, 0.5, 3)
# estimated parameters
est.params <- bgbb.EstimateParameters(rf.matrix, startingparams)
# return the posterior mean transaction rate vector
bgbb.rf.matrix.PosteriorMeanTransactionRate(est.params, rf.matrix)
|
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