Conductance and absolutely continuous spectrum of 1D samples

Duration: 50 mins 46 secs

Share this media item:

Embed this media item:

<iframe width="_width_" height="_height_" src="https://sms.cam.ac.uk/media/1993441/embed" frameborder="0" scrolling="no" allowfullscreen></iframe>

Choose size:

About this item

Available Formats

About this item

Description:	Jaksic, V (McGill University) Wednesday 13 May 2015, 14:00-15:00


Created:	2015-05-28 12:51
Collection:	Periodic and Ergodic Spectral Problems
Publisher:	Isaac Newton Institute
Copyright:	Jaksic, V
Language:	eng (English)
Distribution:	World (downloadable)
Explicit content:	No
Aspect Ratio:	16:9
Screencast:	No
Bumper:	UCS Default
Trailer:	UCS Default


Abstract:	In this talk I shall describe the characterization of the absolutely continuous spectrum of the one-dimensional Schr ̈odinger operators h = −∆ + v acting on 2 (Z + ) in terms of the limiting behavior of the Landauer-B ̈ uttiker and Thouless conductances of the associated finite samples. The finite samples are defined by restricting h to a finite interval [1, L] ∩ Z + and the conductance refers to the charge current across the sample in the open quantum system obtained by attaching independent electronic reservoirs to the sample ends. Our main result is that the conductances associated to an energy interval I are non-vanishing in the limit L → ∞ (physical characterization of the metallic regime) iff sp ac (h) ∩ I = ∅ (mathematical characterization of the metallic regime). This result is of importance for the foundations of quantum mechanics since it provides the first complete dynamical character- ization of the absolutely continuous spectrum of Schr ̈odinger operators. I shall also discuss its relation with Avila’s counterexample to the Schr ̈odinger Conjecture. This talk is based on a joint work with L. Bruneau, Y. Last, and C-A. Pillet.

Abstract:

In this talk I shall describe the characterization of the absolutely continuous spectrum of the one-dimensional Schr ̈odinger operators h = −∆ + v acting on 2 (Z + ) in terms of the limiting behavior of the Landauer-B ̈ uttiker and Thouless conductances of the associated finite samples. The finite samples are defined by restricting h to a finite interval [1, L] ∩ Z + and the conductance refers to the charge current across the sample in the open quantum system obtained by attaching independent electronic reservoirs to the sample ends. Our main result is that the conductances associated to an energy interval I are non-vanishing in the limit L → ∞ (physical characterization of the metallic regime) iff sp ac (h) ∩ I = ∅ (mathematical characterization of the metallic regime). This result is of importance for the foundations of quantum mechanics since it provides the first complete dynamical character- ization of the absolutely continuous spectrum of Schr ̈odinger operators. I shall also discuss its relation with Avila’s counterexample to the Schr ̈odinger Conjecture. This talk is based on a joint work with L. Bruneau, Y. Last, and C-A. Pillet.

Available Formats

Format	Quality	Bitrate	Size
MPEG-4 Video	640x360	1.9 Mbits/sec	726.90 MB	View	Download
WebM	640x360	561.71 kbits/sec	208.93 MB	View	Download
iPod Video	480x270	488.37 kbits/sec	181.59 MB	View	Download
MP3	44100 Hz	249.77 kbits/sec	92.96 MB	Listen	Download
Auto *	(Allows browser to choose a format it supports)

Streaming Media Service Upload

Conductance and absolutely continuous spectrum of 1D samples