TY - JOUR A1 - Laiho, K. A1 - Pressl, B. A1 - Schlager, A. A1 - Suchomel, H. A1 - Kamp, M. A1 - Höfling, S. A1 - Schneider, C. A1 - Weihs, G. T1 - Uncovering dispersion properties in semiconductor waveguides to study photon-pair generation JF - Nanotechnology N2 - We investigate the dispersion properties of ridge Bragg-reflection waveguides to deduce their phasematching characteristics. These are crucial for exploiting them as sources of parametric down-conversion (PDC). In order to estimate the phasematching bandwidth we first determine the group refractive indices of the interacting modes via Fabry-Perot experiments in two distant wavelength regions. Second, by measuring the spectra of the emitted PDC photons, we gain access to their group index dispersion. Our results offer a simple approach for determining the PDC process parameters in the spectral domain, and provide important feedback for designing such sources, especially in the broadband case. KW - Parametric down-conversion KW - Entanglement KW - CHIP KW - PUMP KW - Bragg-reflection waveguide KW - Information KW - phasematching KW - group refractive index Y1 - 2016 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-187025 VL - 27 IS - 43 ER - TY - JOUR A1 - Abt, Raimond A1 - Erdmenger, Johanna A1 - Gerbershagen, Marius A1 - Melby-Thompson, Charles M. A1 - Northe, Christian T1 - Holographic subregion complexity from kinematic space JF - Journal of High Energy Physics N2 - We consider the computation of volumes contained in a spatial slice of AdS(3) in terms of observables in a dual CFT. Our main tool is kinematic space, defined either from the bulk perspective as the space of oriented bulk geodesics, or from the CFT perspective as the space of entangling intervals. We give an explicit formula for the volume of a general region in a spatial slice of AdS(3) as an integral over kinematic space. For the region lying below a geodesic, we show how to write this volume purely in terms of entangling entropies in the dual CFT. This expression is perhaps most interesting in light of the complexity = volume proposal, which posits that complexity of holographic quantum states is computed by bulk volumes. An extension of this idea proposes that the holographic subregion complexity of an interval, defined as the volume under its Ryu-Takayanagi surface, is a measure of the complexity of the corresponding reduced density matrix. If this is true, our results give an explicit relationship between entanglement and subregion complexity in CFT, at least in the vacuum. We further extend many of our results to conical defect and BTZ black hole geometries. KW - AdS-CFT Correspondence KW - Gauge-gravity correspondence KW - Black Holes in String Theory KW - Black-hole KW - Entanglement Y1 - 2019 U6 - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:bvb:20-opus-227711 VL - 1 IS - 12 ER -