Redirected from Nonstandard analysis
One kind of elements in the saturated model are infinitesimals. It is consistent for a positive real number to be smaller then any element of { 1/n | n in N };thus, there is a positive non-standard real number smaller than all of these. In fact, there is a whole ideal of non-standard real numbers. If we start from the rationals, rather then the real numbers, and divide the ring of non-standard finite rational numbers by the ideal of the infinitesimal rational numbers, we get a field (because it is a maximal ideal) -- the field of real numbers. This sometimes gives easier ways to prove results which are hard work in classical, epsilon-delta, analysis. For example, proving that the composition of continuous functions is continuous is much easier in a non-standard setting.
There are not many results proven first with non-standard analysis. One of them is the fact that every polynomially compact linear operator[?] on a Hilbert space has an invariant subspace, proven 5 years before classic functional analysis techniques were developed that deal with such problems.
Non-standard analysis was introduced by the mathematician Abraham Robinson in 1966 with the publication of his book Non-standard Analysis.
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