An infinite matrix with complex-valued entries defines a regular summability method if and only if it satisfies all of the following properties:
An example is Cesaro summation, a matrix summability method with
Referencesedit
Citationsedit
^Silverman–Toeplitz theorem, by Ruder, Brian, Published 1966, Call number LD2668 .R4 1966 R915, Publisher Kansas State University, Internet Archive
Further readingedit
Toeplitz, Otto (1911) "Über allgemeine lineare Mittelbildungen." Prace mat.-fiz., 22, 113–118 (the original paper in German)
Silverman, Louis Lazarus (1913) "On the definition of the sum of a divergent series." University of Missouri Studies, Math. Series I, 1–96
Hardy, G. H. (1949), Divergent Series, Oxford: Clarendon Press, 43-48.
Boos, Johann (2000). Classical and modern methods in summability. New York: Oxford University Press. ISBN019850165X.
April 09, 2024
silverman, toeplitz, theorem, mathematics, first, proved, otto, toeplitz, result, summability, theory, characterizing, matrix, summability, methods, that, regular, regular, matrix, summability, method, matrix, transformation, convergent, sequence, which, prese. In mathematics the Silverman Toeplitz theorem first proved by Otto Toeplitz is a result in summability theory characterizing matrix summability methods that are regular A regular matrix summability method is a matrix transformation of a convergent sequence which preserves the limit 1 An infinite matrix ai j i j N displaystyle a i j i j in mathbb N with complex valued entries defines a regular summability method if and only if it satisfies all of the following properties limi ai j 0j N Every column sequence converges to 0 limi j 0 ai j 1 The row sums converge to 1 supi j 0 ai j lt The absolute row sums are bounded displaystyle begin aligned amp lim i to infty a i j 0 quad j in mathbb N amp amp text Every column sequence converges to 0 3pt amp lim i to infty sum j 0 infty a i j 1 amp amp text The row sums converge to 1 3pt amp sup i sum j 0 infty vert a i j vert lt infty amp amp text The absolute row sums are bounded end aligned An example is Cesaro summation a matrix summability method with amn 1mn m0n gt m 10000 1212000 13131300 141414140 1515151515 displaystyle a mn begin cases frac 1 m amp n leq m 0 amp n gt m end cases begin pmatrix 1 amp 0 amp 0 amp 0 amp 0 amp cdots frac 1 2 amp frac 1 2 amp 0 amp 0 amp 0 amp cdots frac 1 3 amp frac 1 3 amp frac 1 3 amp 0 amp 0 amp cdots frac 1 4 amp frac 1 4 amp frac 1 4 amp frac 1 4 amp 0 amp cdots frac 1 5 amp frac 1 5 amp frac 1 5 amp frac 1 5 amp frac 1 5 amp cdots vdots amp vdots amp vdots amp vdots amp vdots amp ddots end pmatrix References editCitations edit Silverman Toeplitz theorem by Ruder Brian Published 1966 Call number LD2668 R4 1966 R915 Publisher Kansas State University Internet Archive Further reading edit Toeplitz Otto 1911 Uber allgemeine lineare Mittelbildungen Prace mat fiz 22 113 118 the original paper in German Silverman Louis Lazarus 1913 On the definition of the sum of a divergent series University of Missouri Studies Math Series I 1 96 Hardy G H 1949 Divergent Series Oxford Clarendon Press 43 48 Boos Johann 2000 Classical and modern methods in summability New York Oxford University Press ISBN 019850165X Retrieved from https en wikipedia org w index php title Silverman Toeplitz theorem amp oldid 1092058827, wikipedia, wiki, book, books, library,
