A **semiparametric model** is a regression model with both a finite- and an infinite-dimensional component.

A *finite-dimensional component* is spanned by some list of vectors (a vector is an object that has both magnitude and direction). The two-dimensional and three-dimensional spaces we deal with in everyday geometry are examples of finite-dimensional spaces, but so is a hypothetical 4568-dimensional space. *Infinite dimensional spaces* are spaces that have an infinite, and possibly ill-defined, number of dimensions and possibilities. They aren’t spanned by any finite list of vectors.

In contrast to parametric models, which are well-defined in the finite-dimensional space, and non-parametric models, where the parameters can all span an infinite space, a semiparametric model has a component that is finite-dimensional (i.e. it’s easy to research and understand), and another that is infinite-dimensional (i.e. beyond the range of ordinary statistical methods).

In research and statistics projects involving semi-parametric models the emphasis is almost always on the parametric component of the model. That’s because this is the part which lends itself well to research.

## Why Use Semiparametric Models?

Too often parametric models, while being easy to understand and easy to work with, fail to give a fair representation of what is happening in the real world. Non-parametric models may be better representations but do not lend themselves well to analysis. A semiparametric model allows you to have the best of both worlds: a model that is understandable and can be manipulated while still offering a fair representation of the messiness that is involved in real life.

## Examples of Semiparametric Models

One example of a semi-parametric model is the **Cox Proportional Hazards Model**. This model is very useful in studies of the time remaining before an end or failure; it’s used when doing research on the time remaining before a patient dies, or before a light bulb burns out. It’s defined as:

Here *x* is what we call the covariate vector, and our unknown parameters are Β and λ_{0} *(u)*. Β is finite-dimensional and is often the subject of research; λ_{0} *(u)*, on the other hand, is a unknown, non-negative function of time, and the space of λ_{0} *(u)* possibilities is infinite. We call it a ‘nuisance parameter‘; a parameter that can’t be entirely omitted in a rigorous treatment of a problem but is not of immediate interest– typically because it is difficult or impossible to study.

**Gaussian mixture models** are semi-parametric. *Parametric *implies that the model comes from a known distribution (which is in this case, a set of normal distributions). It’s *semi*-parametric because more components, possibly from unknown distributions, can be added to the model.

## References

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