The PROBIT Procedure

PROC PROBIT Statement

  • PROC PROBIT <options>;

The PROC PROBIT statement invokes the PROBIT procedure. Table 81.1 summarizes the options available in the PROC PROBIT statement.

Table 81.1: PROC PROBIT Statement Options

Option

Description

COVOUT

Writes the parameter estimate covariance matrix to the OUTEST= data set

C=

Controls how the natural response is handled

DATA=

Specifies the SAS data set to be used

GOUT=

Specifies a graphics catalog in which to save graphics output

HPROB=

Specifies a minimum probability level for the Pearson’s chi-square

INEST=

Specifies an input SAS data set that contains initial estimates

INVERSECL

Computes confidence limits

LACKFIT

Performs two goodness-of-fit tests

LOG

Replaces the first continuous independent variable with its natural logarithm

LOG10

Replaces the first continuous independent variable with log to the base 10

NAMELEN=

Specifies the length of effect names to be n characters

NOPRINT

Suppresses the display of all output including graphics

OPTC

Controls how the natural response is handled

ORDER=

Specifies the sort order for the levels of the classification variables

OUTEST=

Specifies a SAS data set to contain the parameter estimates

PLOT | PLOTS

Controls the plots produced though ODS Graphics

XDATA=

Specifies an input SAS data set that contains values for all the independent variables


You can specify the following options in the PROC PROBIT statement.

COVOUT

writes the parameter estimate covariance matrix to the OUTEST= data set.

C=rate
OPTC

controls how the natural response is handled. Specify the OPTC option to request that the natural response rate C be estimated. Specify the C=rate option to set the natural response rate or to provide the initial estimate of the natural response rate. The natural response rate value must be a number between 0 and 1.

  • If you specify neither the OPTC nor the C= option, a natural response rate of zero is assumed.

  • If you specify both the OPTC and the C= option, the C= option should be a reasonable initial estimate of the natural response rate. For example, you could use the ratio of the number of responses to the number of subjects in a control group.

  • If you specify the C= option but not the OPTC option, the natural response rate is set to the specified value and not estimated.

  • If you specify the OPTC option but not the C= option, PROC PROBIT’s action depends on the response variable, as follows:

    • If you specify either the LN or LOG10 option and some subjects have the first independent variable (dose) values less than or equal to zero, these subjects are treated as a control group. The initial estimate of C is then the ratio of the number of responses to the number of subjects in this group.

    • If you do not specify the LN or LOG10 option or if there is no control group, then one of the following occurs:

      • If all responses are greater than zero, the initial estimate of the natural response rate is the minimal response rate (the ratio of the number of responses to the number of subjects in a dose group) across all dose levels.

      • If one or more of the responses is zero (making the response rate zero in that dose group), the initial estimate of the natural rate is the reciprocal of twice the largest number of subjects in any dose group in the experiment.

DATA=SAS-data-set

specifies the SAS data set to be used by PROC PROBIT. By default, the procedure uses the most recently created SAS data set.

GOUT=graphics-catalog

specifies a graphics catalog in which to save graphics output.

HPROB=p

specifies a minimum probability level for the Pearson’s chi-square to indicate a good fit. The default value is 0.10. The LACKFIT option must also be specified for this option to have any effect. For Pearson’s goodness-of-fit chi-square values with probability greater than the HPROB= value, the fiducial limits, if requested with the INVERSECL option, are computed by using a critical value of 1.96. For chi-square values with probability less than the value of the HPROB= option, the critical value is a 0.95 two-sided quantile value taken from the t distribution with degrees of freedom equal to $(k - 1) \times m - q$, where k is the number of levels for the response variable, m is the number of different sets of independent variable values, and q is the number of parameters fit in the model. Note that the HPROB= option can also appear in the MODEL statement.

INEST=SAS-data-set

specifies an input SAS data set that contains initial estimates for all the parameters in the model. See the section INEST= SAS-data-set for a detailed description of the contents of the INEST= data set.

INVERSECL<(PROB=rates)>

computes confidence limits for the values of the first continuous independent variable (such as dose) that yield selected response rates. You can optionally specify a list of response rates as rates. The response rates must be between zero and one, and can be a list separated by blanks, commas, or in the form of a DO list.

For example,

PROB = .1 TO .9 by .1
PROB = .1 .2 .3 .4
PROB = .01, .25, .75, .9

are valid lists of response rates.

If the algorithm fails to converge (this can happen when C is nonzero), missing values are reported for the confidence limits. See the section Inverse Confidence Limits for details. Note that the INVERSECL option can also appear in the MODEL statement.

LACKFIT

performs two goodness-of-fit tests (a Pearson’s chi-square test and a log-likelihood ratio chi-square test) for the fitted model.

To compute the test statistics, proper grouping of the observations into subpopulations is needed. You can use the AGGREGATE or AGGREGATE= option for this end. See the entry for the AGGREGATE and AGGREGATE= options under the MODEL statement. If neither AGGREGATE nor AGGREGATE= is specified, PROC PROBIT assumes each observation is from a separate subpopulation and computes the goodness-of-fit test statistics only for the events/trials syntax.

Note: This test is not appropriate if the data are very sparse, with only a few values at each set of the independent variable values.

If the Pearson’s chi-square test statistic is significant, then the covariance estimates and standard error estimates are adjusted. See the section Lack-of-Fit Tests for a description of the tests. Note that the LACKFIT option can also appear in the MODEL statement.

LOG
LN

analyzes the data by replacing the first continuous independent variable with its natural logarithm. This variable is usually the level of some treatment such as dosage. In addition to the usual output given by the INVERSECL option, the estimated dose values and 95% fiducial limits for dose are also displayed. If you specify the OPTC option, any observations with a dose value less than or equal to zero are used in the estimation as a control group. If you do not specify the OPTC option with the LOG or LN option, then any observations with the first continuous independent variable values less than or equal to zero are ignored.

LOG10

specifies an analysis like that of the LN or LOG option, except that the common logarithm (log to the base 10) of the dose value is used rather than the natural logarithm.

NAMELEN=n

specifies the length of effect names in tables and output data sets to be n characters, where n is a value between 20 and 200. The default length is 20 characters.

NOPRINT

suppresses the display of all output including graphics. Note that this option temporarily disables the Output Delivery System (ODS). For more information, see Chapter 20: Using the Output Delivery System.

OPTC

controls how the natural response is handled. See the description of the C= option on for details.

ORDER=DATA | FORMATTED | FREQ | INTERNAL

specifies the sort order for the levels of the classification variables (which are specified in the CLASS statement).

This option applies to the levels for all classification variables, except when you use the (default) ORDER=FORMATTED option with numeric classification variables that have no explicit format. In that case, the levels of such variables are ordered by their internal value.

The ORDER= option can take the following values:

Value of ORDER=

Levels Sorted By

DATA

Order of appearance in the input data set

FORMATTED

External formatted value, except for numeric variables with no explicit format, which are sorted by their unformatted (internal) value

FREQ

Descending frequency count; levels with the most observations come first in the order

INTERNAL

Unformatted value

By default, ORDER=FORMATTED. For ORDER=FORMATTED and ORDER=INTERNAL, the sort order is machine-dependent.

This order also applies to the levels of the response variable. Response level ordering is important because PROC PROBIT always models the probability of response levels at the beginning of the ordering. See the section Response Level Ordering for further details.

For more information about sort order, see the chapter on the SORT procedure in the Base SAS Procedures Guide and the discussion of BY-group processing in SAS Language Reference: Concepts.

OUTEST=SAS-data-set

specifies a SAS data set to contain the parameter estimates and, if the COVOUT option is specified, their estimated covariances. If you omit this option, the output data set is not created. The contents of the data set are described in the section OUTEST= SAS-data-set.

PLOT | PLOTS <=plot-request>
PLOT | PLOTS <=(plot-request <…plot-request > )>

specifies options that control details of the plots created by ODS Graphics. These plots are related to a dose variable, which is identified as the first single continuous independent variable in the MODEL statement. If there are interaction terms with this variable in the model, the PROBIT procedure will not produce any plot.

You can specify more than one plot request within the parentheses after PLOTS=. For a single plot request, you can omit the parentheses.

ODS Graphics must be enabled before plots can be requested. For example:

proc probit plots=predplot;
   model r/n = dose;
run;

For more information about enabling and disabling ODS Graphics, see the section Enabling and Disabling ODS Graphics in Chapter 21: Statistical Graphics Using ODS.

The following plot-requests are available.

ALL

creates all appropriate plots.

CDFPLOT<(LEVEL=(character-list))>

requests the plot of predicted cumulative distribution function (CDF) of the multinomial response variable as a function of a single continuous independent variable (dose variable). This single continuous independent variable must be the first single continuous independent variable listed in the MODEL statement. You can request this plot only with a multinomial model.

The LEVEL= suboption specifies the levels of the multinomial response variable for which the CDF curves are requested. There are k – 1 curves for a k-level multinomial response variable (for the highest level, it is the constant line 1). You can specify any of them to be plotted by the LEVEL= suboption.

IPPPLOT

requests the inverse plot of the predicted probability against the first single continuous variable (dose variable) in the MODEL statement for the binomial model. You can request this plot only with a binomial model. The confidence limits for the predicted values of the dose variable are the computed fiducial limits, not the inverse of the confidence limits of the predicted probabilities. See the section Inverse Confidence Limits for more details.

LPREDPLOT<(LEVEL=(character-list))>

requests the plot of the linear predictor $\mb{x}^{\prime }\mb{b}$ against the first single continuous variable (dose variable) in the MODEL statement for either the binomial model or the multinomial model. The confidence limits for the predicted values are available only for the binomial model.

For the multinomial model, you can use the LEVEL= suboption to specify the levels for which the linear predictor lines are plotted.

NONE

suppresses all plots.

PREDPPLOT<(LEVEL=(character-list))>

requests the plot of the predicted probability against the first single continuous variable (dose variable) in the MODEL statement for both the binomial model and the multinomial model. Confidence limits are available only for the binomial model.

For the multinomial model, you can use the LEVEL= suboption to specify the levels for which the linear predictor lines are plotted.

XDATA=SAS-data-set

specifies an input SAS data set that contains values for all the independent variables in the MODEL statement and variables in the CLASS statement. If there are covariates specified in a MODEL statement, you specify fixed values for the effects in the MODEL statement by the XDATA= data set when predicted values and/or fiducial limits for a single continuous variable (dose variable) are required. These specified values for the effects in the MODEL statement are also used for generating plots. See the section XDATA= SAS-data-set for a detailed description of the contents of the XDATA= data set.