Taylor

Question 1

what is the purpose of the Taylor paper?

Taylor

Answer 1

showcase various stochastic models where the CL reserve happens to be the maximum likelihood forecast of the true loss reserve

Question 2

what type of model are the stochastic models outlined?

Taylor

Answer 2

generalized linear models

Question 3

what is the probability density function pi(y; theta, phi) of the Exponential Dispersion Family?

(Taylor)

Answer 3

ln(pi(y; theta, phi) = [(y*theta - b(theta)) / a(phi)] + c(y, phi)

Question 4

what does theta represent in the EDF pdf?

Taylor

Answer 4

theta is a location parameter called the canonical parameter

Question 5

what does phi represent in the EDF pdf?

Taylor

Answer 5

phi is a dispersion parameter called the scale parameter

Question 6

what does b(theta) represent in the EDF pdf?

Taylor

Answer 6

b(theta) is the cumulant function, which determines the shape of the distribution

Question 7

what does exp(c(y, theta)) represent in the EDF pdf?

Taylor

Answer 7

exp(c(y, theta)) is a normalizing factor producing unit total mass for the distribution

Question 8

what is the expected value of an EDF distribution?

Taylor

Answer 8

E[Y] = mu = b’(theta)

Question 9

what is the variance of an EDF distribution?

Taylor

Answer 9

Var(Y) = a(phi) * b’‘(theta)

Question 10

what are three examples of EDF distributions?

Taylor

Answer 10

• Poisson
• binomial
• gamma

Question 11

what type of insurance data are the Poisson and binomial distributions useful for modeling?

(Taylor)

Answer 11

counts

Question 12

what type of insurance data is the gamma distribution useful for modeling?

(Taylor)

Answer 12

amounts

Question 13

what is b(theta), a(phi) and c(y, phi) for the Poisson distribution?

(Taylor)

Answer 13

b(theta) = exp(theta)
a(phi) = 1
c(y, phi) = -ln(y!)

Question 14

what restriction on the EDF results in the Tweedie sub-family?

(Taylor)

Answer 14

restricting the variance function to:
V(mu) = mu^p
where p <= 0 or p >=1
where mu = [(1-p)*theta]^(1/(1-p))

Question 15

what is V(mu) represent for the EDF, in terms of b(theta)?

Taylor

Answer 15

V(mu) = b’’((b’)^-1(mu))

Question 16

what distributions does p in 0-3 represent in the Tweedie sub-family?

(Taylor)

Answer 16

p=0: normal distr
p=1: over-dispersed Poisson
p=2: gamma
p=3: inverse Gaussian
1<=p<=2: compound Poisson distr with gamma severity distr

Question 17

what informs the choice of p in a Tweedie distribution?

Taylor

Answer 17

heaviness of the tail indicated by the data: tail heaviness of Tweedie distributions increases as p increases

Question 18

when might an increase in p be warranted when using the Tweedie distribution?

(Taylor)

Answer 18

residuals are more widely dispersed than is consistent with selected model

Question 19

when is the ODP distribution useful?

Taylor

Answer 19

when little is known of the subject distribution

Question 20

what are the response and linear response of a GLM?

Taylor

Answer 20

response: variate Y_i

linear response: x_i^Tbeta

Question 21

what is the intent of the link function of a GLM?

Taylor

Answer 21

transform the mean of each observation into a linear function of the parameter vector beta

Question 22

what is a weighted linear regression model?

Taylor

Answer 22

a standard linear regression where the errors are normally distributed with unequal variances

Question 23

how would we generalized a weighted linear regression to get a GLM?

(Taylor)

Answer 23

• allow a non-linear relationship between observations and predictors (ie-link function other than identity function)
• allow non-normal errors

Question 24

what four components does the selection of a GLM consist of?

Taylor

Answer 24

selection of:

• cumulant function
• index p
• covariates x_i^T
• link function

Question 25

what does selection of a cumulant function control?

Taylor

Answer 25

the model’s assumed error distribution

Question 26

what does selection of an index p control?

Taylor

Answer 26

relationship between the model’s mean and variance

Question 27

what are the covariates x_i^T in a GLM?

Taylor

Answer 27

the variables that explain mu_i

Question 28

what does selection of a link function control?

Taylor

Answer 28

relationship between the mean mu_i and the associated covariates

Question 29

how are parameters of a GLM often estimated?

Taylor

Answer 29

using maximum likelihood estimation

Question 30

what are categorical covariates?

Taylor

Answer 30

predictors with discrete levels

ex: state

Question 31

what are continuous covariates?

Taylor

Answer 31

predictors with continuous levels

ex: age

Question 32

how is goodness-of-fit generally measured for GLMs?

Taylor

Answer 32

using scaled deviance - comparing the estimate of the model to the estimate of the saturated model

Question 33

what is a ‘saturated model’?

Taylor

Answer 33

a model with a parameter for every observation such that Y_hat = Y

Question 34

what is the deviance formula, in simple words?

Taylor

Answer 34

• we find the difference between the saturated model and the actual model
• small difference -> fitted values are close to actual values

Question 35

what would we like our residuals to exhibit?

Taylor

Answer 35

unbiasedness (revolve around 0) and homoscedasticity (constant variance)

Question 36

what is one consequence of Pearson residuals?

Taylor

Answer 36

they will reproduce any non-normality that exists in the observations (ex. skewed loss data)

Question 37

what can be done if a residual plot exhibits heteroscedasticity?

(Taylor)

Answer 37

weights can be used to correct it

Question 38

what is the general rule about using weights to correct heteroscedasticity?

(Taylor)

Answer 38

observations should be assigned weights that are inversely proportional to the variance of the residuals

Question 39

what are outliers (in terms of residuals)?

Taylor

Answer 39

isolated observations with large residuals

Question 40

how might outliers influence the regression?

Taylor

Answer 40

they shift the fitted values away from the main body of observations in favor of the outliers

Question 41

how can we remove the influence of outliers?

Taylor

Answer 41

assign them weights of 0 in the model

Question 42

what do we need to keep in mind when removing outliers?

Taylor

Answer 42

-if outlier is caused by a major catastrophe or other infrequent but possible event, we need to ensure that the cost of those events is captured somewhere - otherwise, model fails to recognize the possible impact of such an event

Question 43

what is condition #1 that the Non-Parametric Mack model (1994) satisfies?

(Taylor)

Answer 43

1. AYs are stochastically independent

Question 44

what is condition #2 that the non-parametric Mack model satisfies? and what does it mean?

(Taylor)

Answer 44

2. For each k=1,2,…,K, the X_kj form a Markov chain

- means that X_kj is only dependent on X_k,j-1

Question 45

what is condition #3a that the non-parametric Mack model satisfies?

(Taylor)

Answer 45

3a. For each k=1,2,…,K and j=1,2,…,J-1:

E[X_k,j+1] = f_j * X_kj for some parameter f_j > 0

Question 46

what is condition #3b that the non-parametric Mack model satisfies?

(Taylor)

Answer 46

3b. For each k=1,2,…,K and j=1,2,…,J-1:

Var[X_k,j+1] = sigma_j^2 *X_kj

Question 47

what is result #1 derived from the non-parametric Mack model?

(Taylor)

Answer 47

conventional CL estimates f_kj are unbiased AND minimum variance estimators among estimators that are unbiased linear combinations of the f_kj

Question 48

what is result #2 derived from the non-parametric Mack model?

(Taylor)

Answer 48

the conventional CL estimator R_k is unbiased

Question 49

why is the non-parametric Mack model stochastic and non-parametric?

(Taylor)

Answer 49

• stochastic because it considers the means AND variances of observations
• non-parametric because it doesn’t consider the distribution of the observations

Question 50

how does the EDF Mack model change assumptions from the non-parametric Mack model?

(Taylor)

Answer 50

• keeps 1-3a

- replaces 3b with the condition that Y_k,j+1 | X_kj ~ EDF

Question 51

what is the first result of the EDF Mack model, assuming the data is a triangle? (Theorem 3.1)

(Taylor)

Answer 51

-if M3b holds (Var[X_k,j+1 | X_kj] = sigma_j^2 * X_kj), then the MLEs of the f_i are the conventional (unbiased) CL estimators

Question 52

what is the second result of the EDF Mack model, assuming the data is a triangle?

(Taylor)

Answer 52

• if we are in the special case of the ODP Mack model AND dispersion parameters phi_kj are just column dependent (phi_kj = phi_j), then:
  
  • the conventional CL estimators are MVUEs
  • cumulative loss estimates X_kj and reserve estimates R_k are also MVUEs

Question 53

how is Result 2 of the EDF Mack model stronger than Result 1 of the non-parametric Mack model?

(Taylor)

Answer 53

• non-parametric CL estimates were MVUEs among all LINEAR COMBINATIONS of the f_kj
• EDF estimates are MVUEs of ALL estimators

Question 54

what are the assumptions for the EDF cross-classified model?

Taylor

Answer 54

• random variables Y_kj are stochastically independent
• for each k=1,2,…,K and j=1,2,…,J:
  
  • Y_kj ~EDF(theta_kj,phi_kj,a,b,c)
  • E[Y_kj] = alpha_k*beta_j, for alpha, beta > 0
  • summation[beta_j] from j=1 to J = 1

Question 55

how does the EDF cross-classified model differ from the Mack model in terms of parameters?

(Taylor)

Answer 55

• EDF cross-classified model includes explicit row (alpha_k) and column (beta_j) params
• Mack only includes explicit column (f_j) params

Question 56

what are additional assumptions (beyond the EDF cross-classified assumptions) of the ODP cross-classified model?
(Theorem 3.2)

(Taylor)

Answer 56

• Y_kj is restricted to an ODP distribution

- the dispersion parameters phi_kj are identical for all cells (phi_kj = phi)

Question 57

what is the result of Theorem 3.2?

Taylor

Answer 57

-assumptions result in MLE fitted values and forecasts Y_kj that are the same as those given by the conventional CL method

Question 58

what is theorem 3.3?

Taylor

Answer 58

• in general, MLEs Y_kj will not be unbiased
• if we assume that the ODP cross-classified model assumptions (Theorem 3.2) apply AND that the fitted values Y_kj and R_k are corrected for bias: then they are MVUEs of Y_kj and R_k

Question 59

why are theorems 3.2 and 3.3 more remarkable than theorem 3.1?

(Taylor)

Answer 59

• they state that the forecasts from the ODP Mack and ODP cross-classified models are identical and the same as those from the conventional CL method, despite different formulations
• forecasts can be obtained from the ODP cross-classified model without any explicit consideration of its parameters by working as if the model were the ODP Mack model

Question 60

what observations might be given 0 weight in a GLM?

Taylor

Answer 60

• observations prior to the most recent m experience years

- outlier observations that the actuary wants to exclude