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Virtual turning points II = their interplay with integral representations and non-hereditary turning points /

Record Type:	Electronic resources : Monograph/item
Title/Author:	Virtual turning points II/ by Sampei Hirose ... [et al.].
Reminder of title:	their interplay with integral representations and non-hereditary turning points /
other author:	Hirose, Sampei.
Published:	Singapore :Springer Nature Singapore : : 2025.,
Description:	xii, 106 p. :ill., digital ;24 cm.
[NT 15003449]:	1 Integral Representation of Solutions and Related Topics -- 2 Degeneration of the Stokes Geometry for Higher-Order Equations -- 3 A Bicharacteristic Chain Associated with a Non-hereditary Turning Point -- Appendix A: Confirmation of the Activeness of Some Stokes Curves by Using the Exact Steepest Descent Method.
Contained By:	Springer Nature eBook
Subject:	Stokes equations. -
Online resource:	https://doi.org/10.1007/978-981-95-2817-2
ISBN:	9789819528172

Virtual turning points II = their interplay with integral representations and non-hereditary turning points /
Virtual turning points IItheir interplay with integral representations and non-hereditary turning points /[electronic resource] :by Sampei Hirose ... [et al.]. - Singapore :Springer Nature Singapore :2025. - xii, 106 p. :ill., digital ;24 cm. - SpringerBriefs in mathematical physics,v. 522197-1765 ;. - SpringerBriefs in mathematical physics ;v. 52..

1 Integral Representation of Solutions and Related Topics -- 2 Degeneration of the Stokes Geometry for Higher-Order Equations -- 3 A Bicharacteristic Chain Associated with a Non-hereditary Turning Point -- Appendix A: Confirmation of the Activeness of Some Stokes Curves by Using the Exact Steepest Descent Method.

This book aims to build on the significant results reported since the publication of "Virtual Turning Points" (VTP). This volume seeks to accelerate this trend by presenting these results in a unified manner, utilizing s-VTP and the integral representation of solutions. This includes the introduction of a non-hereditary turning point (NHTP), which naturally appears by considering tangential systems. NHTP initially causes no issues for the original system, but it creates a new class of VTPs and additional periods when perturbing the equation while keeping its principal part intact. Integral representations of solutions provide intriguing examples of Stokes geometry (SG). We have selected some particularly illuminating examples and presented them in Sect. 1.5 to address the effects of NHTP and the crossing phenomenon of three ordinary Stokes curves, which were not dealt with in VTP. The most important example suggests that these new phenomena are related to the location of singularities of Borel transformed WKB solutions. Comparing with the second-order case, we study this relationship from the viewpoint of the theory of growing trees already discussed in VTP. These examples also reveal an impressive fact that NHTP creates a new class of VTPs through the so-called bicharacteristic chain. Another example visualizes a leaf-type and a tadpole-type SG, the connection formulas for which are explicitly computed in this volume. Finally in the Appendix, the activeness of SG related to the crossing of three Stokes curves is examined, which requires employment of the exact steepest descent method, a WKB-theoretical generalization of the traditional steepest descent method, despite its simple appearance.

ISBN: 9789819528172

Standard No.: 10.1007/978-981-95-2817-2doiSubjects--Topical Terms:

728609
Stokes equations.

LC Class. No.: QA927

Dewey Class. No.: 518.64

Virtual turning points II = their interplay with integral representations and non-hereditary turning points /
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505 0 $a 1 Integral Representation of Solutions and Related Topics -- 2 Degeneration of the Stokes Geometry for Higher-Order Equations -- 3 A Bicharacteristic Chain Associated with a Non-hereditary Turning Point -- Appendix A: Confirmation of the Activeness of Some Stokes Curves by Using the Exact Steepest Descent Method.
520 $a This book aims to build on the significant results reported since the publication of "Virtual Turning Points" (VTP). This volume seeks to accelerate this trend by presenting these results in a unified manner, utilizing s-VTP and the integral representation of solutions. This includes the introduction of a non-hereditary turning point (NHTP), which naturally appears by considering tangential systems. NHTP initially causes no issues for the original system, but it creates a new class of VTPs and additional periods when perturbing the equation while keeping its principal part intact. Integral representations of solutions provide intriguing examples of Stokes geometry (SG). We have selected some particularly illuminating examples and presented them in Sect. 1.5 to address the effects of NHTP and the crossing phenomenon of three ordinary Stokes curves, which were not dealt with in VTP. The most important example suggests that these new phenomena are related to the location of singularities of Borel transformed WKB solutions. Comparing with the second-order case, we study this relationship from the viewpoint of the theory of growing trees already discussed in VTP. These examples also reveal an impressive fact that NHTP creates a new class of VTPs through the so-called bicharacteristic chain. Another example visualizes a leaf-type and a tadpole-type SG, the connection formulas for which are explicitly computed in this volume. Finally in the Appendix, the activeness of SG related to the crossing of three Stokes curves is examined, which requires employment of the exact steepest descent method, a WKB-theoretical generalization of the traditional steepest descent method, despite its simple appearance.
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