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Full-Text Articles in Physical Sciences and Mathematics
The Direct Scattering Map For The Intermediate Long Wave Equation, Joel Klipfel
The Direct Scattering Map For The Intermediate Long Wave Equation, Joel Klipfel
Theses and Dissertations--Mathematics
In the early 1980's, Kodama, Ablowitz and Satsuma, together with Santini, Ablowitz and Fokas, developed the formal inverse scattering theory of the Intermediate Long Wave (ILW) equation and explored its connections with the Benjamin-Ono (BO) and KdV equations. The ILW equation\begin{align*} u_t + \frac{1}{\delta} u_x + 2 u u_x + Tu_{xx} = 0, \end{align*} models the behavior of long internal gravitational waves in stratified fluids of depth $0< \delta < \infty$, where $T$ is a singular operator which depends on the depth $\delta$. In the limit $\delta \to 0$, the ILW reduces to the Korteweg de Vries (KdV) equation, and in the limit $\delta \to \infty$, the ILW (at least formally) reduces to the Benjamin-Ono (BO) equation.
While the KdV equation is very well understood, a rigorous analysis of inverse scattering for the ILW equation remains to be accomplished. There is currently no rigorous proof that the Inverse Scattering …
Survey Of Results On The Schrodinger Operator With Inverse Square Potential, Richardson Saint Bonheur
Survey Of Results On The Schrodinger Operator With Inverse Square Potential, Richardson Saint Bonheur
Electronic Theses and Dissertations
In this paper we present a survey of results on the Schrodinger operator with Inverse ¨ Square potential, La= −∆ + a/|x|^2 , a ≥ −( d−2/2 )^2. We briefly discuss the long-time behavior of solutions to the inter-critical focusing NLS with an inverse square potential(proof not provided). Later we present spectral multiplier theorems for the operator. For the case when a ≥ 0, we present the multiplier theorem from Hebisch [12]. The case when 0 > a ≥ −( d−2/2 )^2 was explored in [1], and their proof will be presented for completeness. No improvements on the sharpness …
Regularity For Solutions To Parabolic Systems And Nonlocal Minimization Problems, Joe Geisbauer
Regularity For Solutions To Parabolic Systems And Nonlocal Minimization Problems, Joe Geisbauer
Department of Mathematics: Dissertations, Theses, and Student Research
The goal of this dissertation is to contribute to both the nonlocal and local settings of regularity within the calculus of variations. We provide analogues of higher differentiability results in the context of Besov spaces for minimizers of nonlocal functionals. We also establish the Holder continuity of solutions to a system of parabolic partial differential equations.
Advisor: Mikil Foss