Force of mortality


In actuarial science and demography, force of mortality, also known as death intensity, is a function, usually written, that gives the instantaneous rate at which deaths occur at age x, conditional on survival to age x. In survival analysis it corresponds to the hazard function, and in reliability theory it corresponds to the failure rate. It has units of inverse time, and integrating it over an interval gives the survival probability over that interval.

Definition

Let be a non-negative random variable representing an individual's age at death. Write for its cumulative distribution function and for its survival function.
The force of mortality at age, written, is defined as the instantaneous conditional rate of death at age. Formally, it is the limit of the conditional probability of dying in a short interval after, divided by the interval length:
When is continuous with probability density function, the force of mortality can be written in terms of and as
Equivalently, where is differentiable, it is the negative derivative of the log-survival function:

Interpretation and related quantities

The force of mortality is an instantaneous rate rather than a probability. For a short interval, the conditional probability of dying shortly after age is approximately, provided is small enough that the rate does not change much over the interval.
In survival analysis, is the hazard function. In reliability theory, the same mathematical object is commonly called the failure rate.
The cumulative force of mortality is the integral of the force over age. Writing
then the survival function can be expressed as
These identities imply the differential relationship
and, for a continuous lifetime distribution, the density can be written as

Survival probabilities and life tables

In actuarial notation, the probability that a life aged survives for a further years is written. In terms of the lifetime random variable, it is
Using the force of mortality, this conditional survival probability can be expressed as an exponential of the integrated force:
Life tables often tabulate survival and death probabilities at integer ages. In that setting, the one-year survival probability is and the one-year death probability is. The force of mortality provides a continuous-age description that can be used to relate probabilities over different intervals through the integral relationship above.

Examples of mortality models

Several parametric models are used to describe how the force of mortality varies with age. A constant force of mortality, for, corresponds to an exponential distribution for and gives a memoryless survival pattern.
In actuarial work, the Gompertz–Makeham law of mortality is often written as the sum of an age-independent component and an exponentially increasing component, for example
with,, and. The Gompertz model is the special case, giving:
A common model in survival analysis and reliability uses a Weibull hazard, which has the form
for shape and scale. This family includes decreasing, constant, and increasing forces of mortality depending on the value of.