2
$\begingroup$

Literature on numerical analysis using approximation of functions via projection into finite-base function space uses terms test function, Ansatz function, basis function. What is the difference?

My understanding is that test $\equiv$ Ansatz functions are those which are in chosen finite basis, while basis function is a function in any basis (by definition). In another words, the former are subset of the latter. Is that right?

  • 0
    The formulation was not precise, I meant that test function is a function in finite basis, while basis function is function in (possibly infinite) basis.2011-10-14

1 Answers 1

2

The terms "test function" and "ansatz" are more general. In my experience, the term "test function" is largely synonymous with "trial function" and is often used in connection with variational methods such as the Ritz method. A typical usage is one where the test function is a linear combination of basis functions, but the term is not restricted to this case and can refer to any parameterized function that selects a subset of the function space of interest. The term "ansatz" is largely synonymous, except perhaps it's less strongly associated with variational methods and refers more generally to any attempt to write down a solution in parametrized form. The literal meaning of the German word "Ansatz" from which this term is derived is something like "approach"; that is, an ansatz is a certain way of approaching the problem by choosing a particular functional form.

The term "basis function", by contrast, is only used in the linear case and refers to one of the functions from whose linear combinations the test function is formed.

  • 0
    .../... may produce the exact solution in some specific cases, mainly for... the *Bethe lattice*.) This confusion might have been spreading for a while, causing the distinction between Ansatz and approximation to blur away somewhat, but the correct use of *Ansatz* would be the one you provided in your post. Well, *tout ça pour ça...* :-)2011-10-14