000			02303nam a2200277Ia 4500
003			OSt
005			20250903113241.0
008			220909b |||||||| |||| 00| 0 eng d
020			_a9781441929358
037			_cTextual
040			_aCSL _beng _cCSL
041			_aeng
084			_aB3 P1;Q0 _qCSL
100			_aCheney, Ward _eauthor
245		0	_aAnalysis for applied mathematics
260			_aNew York: _bSpringer, _c2010
300			_aviii, 444p. _b: 27 ill.
490			_aGraduate text in mathematics
500			_aReferences 429-436p.; Index 437-442p.; Symbols 443-444p.
520			_ahis book evolved from a course at our university for beginning graduate stu- dents in mathematics-particularly students who intended to specialize in ap- plied mathematics. The content of the course made it attractive to other math- ematics students and to graduate students from other disciplines such as en- gineering, physics, and computer science. Since the course was designed for two semesters duration, many topics could be included and dealt with in de- tail. Chapters 1 through 6 reflect roughly the actual nature of the course, as it was taught over a number of years. The content of the course was dictated by a syllabus governing our preliminary Ph. D. examinations in the subject of ap- plied mathematics. That syllabus, in turn, expressed a consensus of the faculty members involved in the applied mathematics program within our department. The text in its present manifestation is my interpretation of that syllabus: my colleagues are blameless for whatever flaws are present and for any inadvertent deviations from the syllabus. The book contains two additional chapters having important material not included in the course: Chapter 8, on measure and integration, is for the ben- efit of readers who want a concise presentation of that subject, and Chapter 7 contains some topics closely allied, but peripheral, to the principal thrust of the course. This arrangement of the material deserves some explanation.
650			_a Distributions _9819873
650			_a Measure and integration _9819874
650			_aFourier transform _9719246
942			_hB3 P1;Q0 _cTEXL _2CC _n0
999			_c14724 _d14724