The Cauchy Problem for Non-Lipschitz Semi-Linear Parabolic Partial Differential Equations 2015 Edition at Meripustak

The Cauchy Problem for Non-Lipschitz Semi-Linear Parabolic Partial Differential Equations 2015 Edition

Books from same Author: J. C. Meyer, D. J. Needham

Books from same Publisher: CAMBRIDGE

Related Category: Author List / Publisher List


  • Retail Price: ₹ 6201/- [ 0.00% off ]

    Seller Price: ₹ 6201

Sold By: T K Pandey      Click for Bulk Order

Offer 1: Get ₹ 111 extra discount on minimum ₹ 500 [Use Code: Bharat]

Offer 2: Get 0.00 % + Flat ₹ 100 discount on shopping of ₹ 1500 [Use Code: IND100]

Offer 3: Get 0.00 % + Flat ₹ 300 discount on shopping of ₹ 5000 [Use Code: MPSTK300]

Free Shipping (for orders above ₹ 499) *T&C apply.

In Stock

Free Shipping Available



Click for International Orders
  • Provide Fastest Delivery

  • 100% Original Guaranteed
  • General Information  
    Author(s)J. C. Meyer, D. J. Needham
    PublisherCAMBRIDGE
    ISBN9781107477391
    Pages173
    BindingPaperback
    LanguageEnglish
    Publish YearDecember 2015

    Description

    CAMBRIDGE The Cauchy Problem for Non-Lipschitz Semi-Linear Parabolic Partial Differential Equations 2015 Edition by J. C. Meyer, D. J. Needham

    Reaction-diffusion theory is a topic which has developed rapidly over the last thirty years, particularly with regards to applications in chemistry and life sciences. Of particular importance is the analysis of semi-linear parabolic PDEs. This monograph provides a general approach to the study of semi-linear parabolic equations when the nonlinearity, while failing to be Lipschitz continuous, is Hoelder and/or upper Lipschitz continuous, a scenario that is not well studied, despite occurring often in models. The text presents new existence, uniqueness and continuous dependence results, leading to global and uniformly global well-posedness results (in the sense of Hadamard). Extensions of classical maximum/minimum principles, comparison theorems and derivative (Schauder-type) estimates are developed and employed. Detailed specific applications are presented in the later stages of the monograph. Requiring only a solid background in real analysis, this book is suitable for researchers in all areas of study involving semi-linear parabolic PDEs.