Tomkeelin

Another generalized log-logistic distribution is the log-transform of the metalog distribution, in which power series expansions in terms of ${\displaystyle p}$ are substituted for logistic-distribution parameters ${\displaystyle \mu }$ and ${\displaystyle \sigma }$. The resulting metalog quantile function is highly shape flexible, has a simple closed form, and can be fit to data with linear least squares. The log-logistic distribution is special case of the log-metalog distribution.

Convex Hull for Feasible Coefficients of Three-Term Metalogs

Feasibility condition for metalogs with ${\displaystyle k=3}$  terms: ${\displaystyle a_{1}}$  is any real number, ${\displaystyle a_{2}>0}$  and ${\displaystyle |a_{3}|/a_{2}\leq 1.66711}$ .

Convex Hull for Feasible Coefficients of Four-Term Metalogs

Convex Hull for Feasible Coefficients of Four-Term Metalogs

Feasibility for metalogs with ${\displaystyle k=4}$  terms is defined as follows:

• ${\displaystyle a_{1}}$  is any real number, and
• ${\displaystyle a_{2}\geq 0}$ , and
• If ${\displaystyle a_{2}=0}$ , then ${\displaystyle a_{3}=0}$  and ${\displaystyle a_{4}>0}$  (uniform distribution exactly)
• If ${\displaystyle a_{2}>0}$ , then feasibility conditions are specified numerically
  • For a given ${\displaystyle |a_{3}|/a_{2}}$ , feasibility requires that ${\displaystyle a_{4}/a_{2}\geq }$  number shown.
  • For a given ${\displaystyle a_{4}/a_{2}}$ , feasibility requires that ${\displaystyle |a_{3}|/a_{2}\leq }$  number shown.
  • At the top of this table, the four-term metalog is symmetric and peaked, similar to a student-t distribution with 3 degrees of freedom.
  • At the bottom of this table, the four-term metalog is a uniform distribution exactly.
  • In between, it has varying degrees of skewness depending on ${\displaystyle a_{3}}$ . Positive ${\displaystyle a_{3}}$  yields right skew. Negative ${\displaystyle a_{3}}$  yields left skew. When ${\displaystyle a_{3}=0}$ , the four-term metalog is symmetric.

Convex Hull Equations

The feasible area can be closely approximated by an ellipse (dashed, gray curve), defined by center ${\displaystyle b=4.5}$  and semi-axis lengths ${\displaystyle c=8.5}$  and ${\displaystyle d=1.95}$ . Supplementing this with linear interpolation outside its applicable range, feasibility, given ${\displaystyle a_{2}>0}$ , can be closely approximated:

${\displaystyle \ \approx \left\{{\begin{array}{rlcrll}{|a_{3}| \over a_{2}}&\leq {d \over c}{\sqrt {c^{2}-({a_{4} \over a_{2}}-b)^{2}}}&{\text{ for }}&-4.0&\leq {a_{4} \over a_{2}}\leq 4.5,\\{|a_{3}| \over a_{2}}&\leq 0.014({a_{4} \over a_{2}}-4.5)+1.95&{\mbox{ for }}&4.5&<{a_{4} \over a_{2}}\leq 7.0,\\{|a_{3}| \over a_{2}}&\leq 0.004({a_{4} \over a_{2}}-7.0)+1.984&{\mbox{ for}}&7.0&<{a_{4} \over a_{2}}\leq 10.0,\\{|a_{3}| \over a_{2}}&\leq 2.0&{\mbox{ for}}&10.0&<{a_{4} \over a_{2}}.\end{array}}\right.}$