Stability of functional equations in several variables /

MARC Record from marc_columbia

Record ID	marc_columbia/Columbia-extract-20221130-005.mrc:246621321:2519
Source	marc_columbia
Download Link	/show-records/marc_columbia/Columbia-extract-20221130-005.mrc:246621321:2519?format=raw

LEADER: 02519mam a2200373 a 4500
001 2189204
005 20220615224854.0
008 980113t19981998mau b 001 0 eng
010 $a 98002593
020 $a081764024X (alk. paper)
020 $a376434024X (alk. paper)
035 $a(OCoLC)ocm38249526
035 $9ANR4781CU
035 $a(NNC)2189204
035 $a2189204
040 $aDLC$cDLC$dOrLoB-B
050 00 $aQA431$b.H94 1998
082 00 $a515/.8$221
100 1 $aHyers, Donald H.$0http://id.loc.gov/authorities/names/no97047689
245 10 $aStability of functional equations in several variables /$cDonald H. Hyers, George Isac, Themistocles M. Rassias.
260 $aBoston :$bBirkhäuser,$c[1998], ©1998.
300 $a313 pages ;$c25 cm.
336 $atext$btxt$2rdacontent
337 $aunmediated$bn$2rdamedia
490 1 $aProgress in nonlinear differential equations and their applications ;$vv. 34
504 $aIncludes bibliographical references (p. [290]-305) and index.
520 $aThe notion of stability of functional equations has its origins with S. M. Ulam, who posed the fundamental problem in 1940 and with D. H. Hyers, who gave the first significant partial solution in 1941. During the last two decades the notion of stability of functional equations has evolved into an area of continuing research. The present book is a comprehensive introduction to the subject with emphasis on recent developments.
520 8 $aThe authors present both the classical results and current research in a unified and self-contained fashion. In addition, related problems are investigated. These include the stability of the convex functional inequality and the stability of minimum points. The work is certainly of interest to researchers in the field. And since the techniques used here require only basic knowledge of functional analysis, algebra, and topology, the work is therefore accessible to graduate students as well.
650 0 $aFunctional equations$xNumerical solutions.$0http://id.loc.gov/authorities/subjects/sh85052318
650 0 $aFunctions of several real variables.$0http://id.loc.gov/authorities/subjects/sh85052359
700 1 $aIsac, George.$0http://id.loc.gov/authorities/names/n88620247
700 1 $aRassias, Themistocles M.,$d1951-$0http://id.loc.gov/authorities/names/n81145441
830 0 $aProgress in nonlinear differential equations and their applications ;$vv. 34.$0http://id.loc.gov/authorities/names/n88540928
852 00 $bmat$hQA431$i.H94 1998