SULJE VALIKKO

Englanninkielisten kirjojen poikkeusaikata... LUE LISÄÄ

avaa valikko

Singular Nonlinear Partial Differential Equations
97,90 €
Vieweg+Teubner Verlag
Sivumäärä: 272 sivua
Asu: Pehmeäkantinen kirja
Julkaisuvuosi: 2011, 16.12.2011 (lisätietoa)
Kieli: Englanti
Tuotesarja: Aspects of Mathematics 28
The aim of this book is to put together all the results that are known about the existence of formal, holomorphic and singular solutions of singular non linear partial differential equations. We study the existence of formal power series solutions, holomorphic solutions, and singular solutions of singular non linear partial differential equations. In the first chapter, we introduce operators with regular singularities in the one variable case and we give a new simple proof of the classical Maillet's theorem for algebraic differential equations. In chapter 2, we extend this theory to operators in several variables. The chapter 3 is devoted to the study of formal and convergent power series solutions of a class of singular partial differential equations having a linear part, using the method of iteration and also Newton's method. As an appli­ cation of the former results, we look in chapter 4 at the local theory of differential equations of the form xy' = 1(x,y) and, in particular, we show how easy it is to find the classical results on such an equation when 1(0,0) = 0 and give also the study of such an equation when 1(0,0) #- 0 which was never given before and can be extended to equations of the form Ty = F(x, y) where T is an arbitrary vector field.

Tuotetta lisätty
ostoskoriin kpl
Siirry koriin
LISÄÄ OSTOSKORIIN
Tilaustuote | Arvioimme, että tuote lähetetään meiltä noin 4-5 viikossa
Myymäläsaatavuus
Helsinki
Tapiola
Turku
Tampere
Singular Nonlinear Partial Differential Equationszoom
Näytä kaikki tuotetiedot
ISBN:
9783322802866
Sisäänkirjautuminen
Kirjaudu sisään
Rekisteröityminen
Oma tili
Omat tiedot
Omat tilaukset
Omat laskut
Lisätietoja
Asiakaspalvelu
Tietoa verkkokaupasta
Toimitusehdot
Tietosuojaseloste