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Liouville-Riemann-Roch Theorems on Abelian Coverings de Minh Kha

Liouville-Riemann-Roch Theorems on Abelian Coverings: Lecture Notes in Mathematics, cartea 2245

Autor Minh Kha, Peter Kuchment
en Limba Engleză Paperback – 13 feb 2021
This book is devoted to computing the index of elliptic PDEs on non-compact Riemannian manifolds in the presence of local singularities and zeros, as well as polynomial growth at infinity. The classical Riemann–Roch theorem and its generalizations to elliptic equations on bounded domains and compact manifolds, due to Maz’ya, Plameneskii, Nadirashvilli, Gromov and Shubin, account for the contribution to the index due to a divisor of zeros and singularities. On the other hand, the Liouville theorems of Avellaneda, Lin, Li, Moser, Struwe, Kuchment and Pinchover provide the index of periodic elliptic equations on abelian coverings of compact manifolds with polynomial growth at infinity, i.e. in the presence of a "divisor" at infinity.

A natural question is whether one can combine the Riemann–Roch and Liouville type results. This monograph shows that this can indeed be done, however the answers are more intricate than one might initially expect. Namely, the interaction between the finite divisor and the point at infinity is non-trivial.

The text is targeted towards researchers in PDEs, geometric analysis, and mathematical physics.
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Specificații

ISBN-13: 9783030674274
ISBN-10: 3030674274
Ilustrații: XII, 96 p. 2 illus., 1 illus. in color.
Dimensiuni: 155 x 235 mm
Greutate: 0.16 kg
Ediția:1st ed. 2021
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Preliminaries.- The Main Results.- Proofs of the Main Results.- Specific Examples of Liouville-Riemann-Roch Theorems.- Auxiliary Statements and Proofs of Technical Lemmas.- Final Remarks and Conclusions.

Textul de pe ultima copertă

This book is devoted to computing the index of elliptic PDEs on non-compact Riemannian manifolds in the presence of local singularities and zeros, as well as polynomial growth at infinity. The classical Riemann–Roch theorem and its generalizations to elliptic equations on bounded domains and compact manifolds, due to Maz’ya, Plameneskii, Nadirashvilli, Gromov and Shubin, account for the contribution to the index due to a divisor of zeros and singularities. On the other hand, the Liouville theorems of Avellaneda, Lin, Li, Moser, Struwe, Kuchment and Pinchover provide the index of periodic elliptic equations on abelian coverings of compact manifolds with polynomial growth at infinity, i.e. in the presence of a "divisor" at infinity.

A natural question is whether one can combine the Riemann–Roch and Liouville type results. This monograph shows that this can indeed be done, however the answers are more intricate than one might initially expect. Namely, the interaction between the finite divisor and the point at infinity is non-trivial.

The text is targeted towards researchers in PDEs, geometric analysis, and mathematical physics.

Caracteristici

The first unified exposition of Liouville and Riemann–Roch type theorems for elliptic operators on abelian coverings Gives a well-organized and self-contained exposition of the topic, including new results Intersects with geometric analysis, the spectral theory of periodic operators, and their applications