Satya Mukhopadhyay

Higher Order Derivatives

Name: Higher Order Derivatives
Brand: Taylor & Francis Inc
SKU: 9781439880470
Price: 223.2 EUR
Availability: InStock

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€223.20

Product variants

A01=Satya Mukhopadhyay

Abel Limit

Abel Summable

Ad 0f

Age Group_Uncategorized

Author_Satya Mukhopadhyay

automatic-update

Bn Sinnx

Borel Derivatives

C0 Cλ L0

C1 Cλ L1

C2 Dg

Category1=Non-Fiction

Category=PBKJ

COP=United States

Delivery_Delivery within 10-20 working days

Dξ Dt

eq_isMigrated=2

Fourier Series

General Derivative

Generalized Riemann And Peano Derivatives

Higher Order Derivatives

Iterated Limit

Language_English

Laplace Derivative

Lim Inf

Lim X1

Odd Order

Odd Powers

Ordinary Derivative

PA=Available

Peano And Lp-Derivatives

Positive Integer

Price_€100 and above

PS=Active

Relations Between Derivatives

softlaunch

Symmetric Derivative

T2 Dt

Tr Dt

Yr0 Zr0

Zr0 Zr0

Product details

ISBN 9781439880470
Weight: 521g
Dimensions: 156 x 234mm
Publication Date: 25 Jan 2012
Publisher: Taylor & Francis Inc
Publication City/Country: US
Product Form: Hardback
Language: English

Delivery/Collection within 10-20 working days

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The concept of higher order derivatives is useful in many branches of mathematics and its applications. As they are useful in many places, nth order derivatives are often defined directly. Higher Order Derivatives discusses these derivatives, their uses, and the relations among them. It covers higher order generalized derivatives, including the Peano, d.l.V.P., and Abel derivatives; along with the symmetric and unsymmetric Riemann, Cesàro, Borel, LP-, and Laplace derivatives.

Although much work has been done on the Peano and de la Vallée Poussin derivatives, there is a large amount of work to be done on the other higher order derivatives as their properties remain often virtually unexplored. This book introduces newcomers interested in the field of higher order derivatives to the present state of knowledge. Basic advanced real analysis is the only required background, and, although the special Denjoy integral has been used, knowledge of the Lebesgue integral should suffice.

Mukhopadhyay, Satya