MARC 主機 00000nam a2200409K 4500
001 AAI27836579
005 20210611082005.5
006 m o d
007 cr mn ---uuuuu
008 210611s2020 xx sbm 000 0 eng d
020 9798645473655
035 (MiAaPQ)AAI27836579
040 MiAaPQ|beng|cMiAaPQ|dNTU
100 1 Hatcher, Marlana Gail
245 10 Approximating Convolution Integrals for Laplace and
Exponential Fourier Transformations Using Simpson's Rule
264 0 |c2020
300 1 online resource (46 pages)
336 text|btxt|2rdacontent
337 computer|bc|2rdamedia
338 online resource|bcr|2rdacarrier
500 Source: Masters Abstracts International, Volume: 81-12
500 Advisor: O'Connor, Brian M
502 Thesis (M.S.)--Tennessee Technological University, 2020
504 Includes bibliographical references
520 In this thesis, we will explore approximating convolution
integrals for Laplace and exponential Fourier
transformations. For Laplace transforms, we will use the
composite Simpson's Rule to make approximations firstly
for convolutions with known results to compare and provide
validity and then again for some without known results.
For the exponential Fourier type, we first use the
composite Simpson's Rule on a known result using different
methods (two changes of variable and truncation) and
compare to the known results to validate using the methods
for convolution integrals without known results. Then, we
will compare all methods per integral together
533 Electronic reproduction.|bAnn Arbor, Mich. :|cProQuest,
|d2021
538 Mode of access: World Wide Web
650 4 Applied mathematics
650 4 Mathematics
653 Approximating convolution integrals
655 7 Electronic books.|2local
690 0364
690 0405
710 2 ProQuest Information and Learning Co
710 2 Tennessee Technological University.|bMathematics
773 0 |tMasters Abstracts International|g81-12
856 40 |uhttps://pqdd.sinica.edu.tw/twdaoapp/servlet/
advanced?query=27836579|zclick for full text (PQDT)
912 圖書館PQDT110|b1110406
