Univ. Paris-Saclay

Service de Physique de l'Etat Condensé

Lasers, Anti-lasers and PT-symmetric Laser-Absorbers
D. Stone
Yale University, New Haven (USA)
Mercredi 09/03/2011, 11:15
SPEC Salle Itzykson, Bât.774, Orme des Merisiers

A laser is an optical device that transforms incoherent input energy (the pump), into coherent outgoing radiation in a specific set of modes of the electromagnetic field, with distinct frequencies.  There is a threshold pump energy for the first lasing mode, and above that energy the laser is a non-linear device and non-linear interactions strongly affect the emission properties of the laser.  Surprisingly, the theory of non-linear multimode lasing was quite rudimentary until recently.  We describe a new formalism, based on non-hermitian states of the electromagnetic field, which provides a quantitative and tractable description of arbitrarily complex laser systems, including extremely open and non-linear examples, such as random lasers.

            Our reformulation of laser theory emphasizes that a laser cavity is a certain kind of scattering system, with a non-unitary amplifying scattering matrix due to the presence of gain.  This approach suggested the possibility of constructing a time-reversed or “anti-laser”, which we term a coherent perfect absorber (CPA); a device in which the gain medium of the laser is replaced with a loss medium such that the cavity will perfectly absorb the incoming (time-reversed) modes of the corresponding laser.  Recently we have experimentally demonstrated such a device in a simple silicon cavity, which acts as an absorptive interferometer, in which narrow-band absorption can be both increased to
~ 99% and reduced to ~30%.  Finally, the same point of view leads to hybrid devices, containing both gain and loss media, which can function simultaneously as a laser and a perfect absorber for distinct modes of the electromagnetic field.  This happens as a result of a spontaneous symmetry breaking transition, which destroys the parity-time-reversal symmetry of the eigenstates of the corresponding S-matrix.

Contact : Patrice BERTET


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