Polynomial Approximation: The Weierstrass Approximation Theorem.

Nichols, Shirley Jo

Polynomial Approximation: The Weierstrass Approximation Theorem.

Active / Technical Report | Accession Number: ADA118974 |

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Abstract:

In this paper we will look at three proofs of the Weierstrass Approximation Theorem. The first proof is in much the same form in which Weierstrass originally proved his theorem. The next is due to Lebesgue. It is by far the easiest proof to follow, with only a minimum knowledge of analysis required. The last arises from probability and uses the Bernstein polynomials. Secondly we look at a generalization of this theorem, called the Stone-Weierstrass Theorem. This generalization was inspired by modern developments in mathematics. The theorem deals with functions on a general compact space rather than on a closed interval.

Author(s):

Nichols, Shirley Jo

Author Organization(s):

AIR FORCE INST OF TECH WRIGHT-PATTERSON AFB OH

Descriptive Note:

Master's thesis,

Pagination:

0031

Security Markings

DOCUMENT & CONTEXTUAL SUMMARY

Distribution:

Approved For Public Release

RECORD

Collection: TR

Identifying Numbers

Report Number(s):

AFIT/CI/NR/82-46T

Subject Terms

Joint Capability Areas:

JCA_5_Command and Control; JCA_5.3_Planning; JCA_1_Force Support; JCA_1.2_Force Preparation; JCA_5.2.2_Develop Knowledge and Situational Awareness; JCA_5.2_Understand

Communities of Interest:

Materials and Manufacturing Processes

Descriptor(s):

*Polynomials, *Approximation(Mathematics), Continuity, Functions(Mathematics), Probability, Intervals, Theorems, Theses

Field(s)/Group(s):

Statistics and Probability

Keyword(s):

Weierstrass Approximation Theorem, Stone Weierstrass Theorem

Report Date:

1982 Aug 01