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Cauchy Problem for Differential Operators with Double Characteristics
11 Angebote vergleichen
Bester Preis: € 2,06 (vom 06.08.2019)Cauchy Problem for Differential Operators with Double Characteristics
ISBN: 9783319676111 bzw. 3319676113, vermutlich in Englisch, Springer Shop, Taschenbuch, neu.
Combining geometrical and microlocal tools, this monograph gives detailed proofs of many well/ill-posed results related to the Cauchy problem for differential operators with non-effectively hyperbolic double characteristics. Previously scattered over numerous different publications, the results are presented from the viewpoint that the Hamilton map and the geometry of bicharacteristics completely characterizes the well/ill-posedness of the Cauchy problem. A doubly characteristic point of a differential operator P of order m (i.e. one where Pm = dPm = 0) is effectively hyperbolic if the Hamilton map FPm has real non-zero eigen values. When the characteristics are at most double and every double characteristic is effectively hyperbolic, the Cauchy problem for P can be solved for arbitrary lower order terms. If there is a non-effectively hyperbolic characteristic, solvability requires the subprincipal symbol of P to lie between −Pµj and Pµj , where iµj are the positive imaginary eigenvalues of FPm . Moreover, if 0 is an eigenvalue of FPm with corresponding 4 × 4 Jordan block, the spectral structure of FPm is insufficient to determine whether the Cauchy problem is well-posed and the behavior of bicharacteristics near the doubly characteristic manifold plays a crucial role. Soft cover.
Cauchy Problem for Differential Operators with Double Characteristics
ISBN: 9783319676128 bzw. 3319676121, vermutlich in Englisch, Springer Shop, neu, E-Book, elektronischer Download.
Combining geometrical and microlocal tools, this monograph gives detailed proofs of many well/ill-posed results related to the Cauchy problem for differential operators with non-effectively hyperbolic double characteristics. Previously scattered over numerous different publications, the results are presented from the viewpoint that the Hamilton map and the geometry of bicharacteristics completely characterizes the well/ill-posedness of the Cauchy problem. A doubly characteristic point of a differential operator P of order m (i.e. one where Pm = dPm = 0) is effectively hyperbolic if the Hamilton map FPm has real non-zero eigen values. When the characteristics are at most double and every double characteristic is effectively hyperbolic, the Cauchy problem for P can be solved for arbitrary lower order terms. If there is a non-effectively hyperbolic characteristic, solvability requires the subprincipal symbol of P to lie between −Pµj and Pµj , where iµj are the positive imaginary eigenvalues of FPm . Moreover, if 0 is an eigenvalue of FPm with corresponding 4 × 4 Jordan block, the spectral structure of FPm is insufficient to determine whether the Cauchy problem is well-posed and the behavior of bicharacteristics near the doubly characteristic manifold plays a crucial role. eBook.
Cauchy Problem for Differential Operators with Double Characteristics - Non-Effectively Hyperbolic Characteristics
ISBN: 9783319676111 bzw. 3319676113, in Deutsch, Springer-Verlag Gmbh, Taschenbuch, neu.
Cauchy Problem for Differential Operators with Double Characteristics: Combining geometrical and microlocal tools, this monograph gives detailed proofs of many well/ill-posed results related to the Cauchy problem for di erential operators with non-e ectively hyperbolic double characteristics. Previously scattered over numerous di erent publications, the results are presented from the viewpoint that the Hamilton map and the geometry of bicharacteristics completely characterizes the well/ill-posedness of the Cauchy problem. A doubly characteristic point of a di erential operator P of order m (i.e. one where Pm = dPm = 0) is e ectively hyperbolic if the Hamilton map FPm has real non-zero eigen values. When the characteristics are at most double and every double characteristic is e ectively hyperbolic, the Cauchy problem for P can be solved for arbitrary lower order terms. If there is a non-e ectively hyperbolic characteristic, solvability requires the subprincipal symbol of P to lie between -Pµj and Pµj , where iµj are the positive imaginary eigenvalues of FPm . Moreover, if 0 is an eigenvalue of FPm with corresponding 4 × 4 Jordan block, the spectral structure of FPm is insu cient to determine whether the Cauchy problem is well-posed and the behavior of bicharacteristics near the doubly characteristic manifold plays a crucial role. Englisch, Taschenbuch.
Cauchy Problem for Differential Operators with Double Characteristics
ISBN: 9783319676111 bzw. 3319676113, vermutlich in Englisch, neu, Hörbuch.
Combining geometrical and microlocal tools, this monograph gives detailed proofs of many well/ill-posed results related to the Cauchy problem for dierential operators with non-eectively hyperbolic double characteristics. Previously scattered over numerous dierent publications, the results are presented from the viewpoint that the Hamilton map and the geometry of bicharacteristics completely characterizes the well/ill-posedness of the Cauchy problem. A doubly characteristic point of a dierential operator P of order m (i.e. one where Pm = dPm = 0) is eectively hyperbolic if the Hamilton map FPm has real non-zero eigen values. When the characteristics are at most double and every double characteristic is eectively hyperbolic, the Cauchy problem for P can be solved for arbitrary lower order terms. If there is a non-eectively hyperbolic characteristic, solvability requires the subprincipal symbol of P to lie between -Pµj and Pµj , where iµj are the positive imaginary eigenvalues of FPm . Moreover, if 0 is an eigenvalue of FPm with corresponding 4 × 4 Jordan block, the spectral structure of FPm is insucient to determine whether the Cauchy problem is well-posed and the behavior of bicharacteristics near the doubly characteristic manifold plays a crucial role.
Cauchy Problem for Differential Operators with Double Characteristics - Non-Effectively Hyperbolic Characteristics
ISBN: 9783319676128 bzw. 3319676121, vermutlich in Englisch, Springer International Publishing, neu, E-Book, elektronischer Download.
Cauchy Problem for Differential Operators with Double Characteristics: Combining geometrical and microlocal tools, this monograph gives detailed proofs of many well/ill-posed results related to the Cauchy problem for dii erential operators with non-ei ectively hyperbolic double characteristics. Previously scattered over numerous dii erent publications, the results are presented from the viewpoint that the Hamilton map and the geometry of bicharacteristics completely characterizes the well/ill-posedness of the Cauchy problem.A doubly characteristic point of a dii erential operator P of order m (i.e. one where Pm = dPm = 0) is ei ectively hyperbolic if the Hamilton map FPm has real non-zero eigen values. When the characteristics are at most double and every double characteristic is ei ectively hyperbolic, the Cauchy problem for P can be solved for arbitrary lower order terms.If there is a non-ei ectively hyperbolic characteristic, solvability requires the subprincipal symbol of P to lie between Puj and Puj , where iuj are the positive imaginary eigenvalues of FPm . Moreover, if 0 is an eigenvalue of FPm with corresponding 4 4 Jordan block, the spectral structure of FPm is insui cient to determine whether the Cauchy problem is well-posed and the behavior of bicharacteristics near the doubly characteristic manifold plays a crucial role. Englisch, Ebook.
Cauchy Problem for Differential Operators with Double Characteristics (2018)
ISBN: 9783319676111 bzw. 3319676113, in Englisch, Taschenbuch, neu.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
Cauchy Problem for Differential Operators with Double Characteristics (2017)
ISBN: 3319676113 bzw. 9783319676111, vermutlich in Englisch, Springer International Publishing, Taschenbuch, neu.
Cauchy Problem for Differential Operators with Double Characteristics (2017)
ISBN: 9783319676128 bzw. 3319676121, vermutlich in Englisch, Springer, Springer, Springer, neu, E-Book, elektronischer Download.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
Cauchy Problem for Differential Operators with Double Characteristics: Non-Effectively Hyperbolic Characteristics (Lecture Notes in Mathematics) (2017)
ISBN: 9783319676111 bzw. 3319676113, in Englisch, 211 Seiten, Springer, Taschenbuch, neu, Erstausgabe.
Von Händler/Antiquariat, Amazon.de.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen
Cauchy Problem for Differential Operators with Double Characteristics als von Tatsuo Nishitani
ISBN: 9783319676111 bzw. 3319676113, in Deutsch, gebundenes Buch, neu.
Die Beschreibung dieses Angebotes ist von geringer Qualität oder in einer Fremdsprache. Trotzdem anzeigen