This is the sixth lecture in the series. Details can be found here: Algebra and Geometry lecture series (yale.edu) [4]
Time | Items |
---|---|
All day |
|
4:00pm |
10/14/2021 - 4:00pm This is the sixth lecture in the series. Details can be found here: Algebra and Geometry lecture series (yale.edu) [4] Location:
https://yale.zoom.us/j/99019019033 (password was emailed by Ivan)
10/14/2021 - 4:15pm Abstract: We will consider the long-time dynamics of small solutions to the 1d cubic nonlinear Schrödinger equation (NLS) with a trapping potential. I will illustrate that every small solution decomposes into a small solitary wave and a radiation term which exhibits modified scattering. The analysis also establishes the long-time behavior of solutions to a perturbation of the integrable cubic NLS with the appearance of solitons. Location: |
Links
[1] https://math.yale.edu/calendar/grid/day/2021-10-13
[2] https://math.yale.edu/calendar/grid/day/2021-10-15
[3] https://math.yale.edu/event/quantizations-charateristic-p-lecture-6
[4] https://gauss.math.yale.edu/~il282/AGlectures.html
[5] https://math.yale.edu/event/long-time-dynamics-1d-cubic-nonlinear-schrodinger-equations-trapping-potential
[6] https://math.yale.edu/print/list/calendar/grid/day/2021-10-14
[7] webcal://math.yale.edu/calendar/export.ics