Statistics of Resonance Width Shifts as a Signature of Eigenfunction Nonorthogonality

Fyodorov, Yan V.; Savin, Dmitry V.

doi:10.1103/physrevlett.108.184101

Cited by 79 publications

(129 citation statements)

References 50 publications

Supporting

Mentioning

128

Contrasting

Order By: Relevance

“…The reason for introducing the additional states {|χ n } is because the eigenstates {|φ n } ofK are in general not orthogonal, and hence conventional projection techniques so commonly used in many calculations of quantum mechanics, in particular, in perturbation theory, are not effective when dealing with the eigenstates of a complex Hamiltonian [43][44][45][46][47][48]. With the introduction of the states {|χ n }, however, we have the relations:…”

Section: Information Geometry For Complex Hamiltoniansmentioning

confidence: 99%

Information Geometry of Complex Hamiltonians and Exceptional Points

Brody

Graefe

2013

Entropy

View full text Add to dashboard Cite

Information geometry provides a tool to systematically investigate the parameter sensitivity of the state of a system. If a physical system is described by a linear combination of eigenstates of a complex (that is, non-Hermitian) Hamiltonian, then there can be phase transitions where dynamical properties of the system change abruptly. In the vicinities of the transition points, the state of the system becomes highly sensitive to the changes of the parameters in the Hamiltonian. The parameter sensitivity can then be measured in terms of the Fisher-Rao metric and the associated curvature of the parameter-space manifold. A general scheme for the geometric study of parameter-space manifolds of eigenstates of complex Hamiltonians is outlined here, leading to generic expressions for the metric.

show abstract

Section: Information Geometry For Complex Hamiltoniansmentioning

confidence: 99%

Information Geometry of Complex Hamiltonians and Exceptional Points

Brody

Graefe

2013

Entropy

View full text Add to dashboard Cite

show abstract

“…[46]. Basically, that proposal coincides with the form of the "naive" (not-normalized) expression (12) in which the correct factor Φ(y) was however replaced by a heuristic expression sinh y y β/2 . Although such a form at β = 1 shares similar large-y asymptotic with Φ(y), it is manifestly different from the latter, rendering the proposal [46], in the strict sense, invalid.…”

mentioning

confidence: 93%

“…The resonance widths Γ n > 0 bring fundamentally new features to the open system in comparison with its closed counterpart. In particular, width fluctuations govern the decay law [8,9] and give rise to nonorthogonal modes [10,11] leading to enhanced sensitivity to perturbations [12]. Various aspects of lifetime and width statistics are a subject of intensive research, both theoretically and experimentally, with recent studies motivated by practical applications including optical microresonators [13], superconductor superlattices [14], many-body fermionic systems [15], microwave billiards [16,17], and dissipative quantum maps [18,19], as well as by long-standing interest in superradiance-like "resonance trapping" phenomena [4,15,[20][21][22].…”

mentioning

confidence: 99%

Resonance width distribution in RMT: Weak-coupling regime beyond Porter-Thomas

Fyodorov¹,

Savin²

2015

EPL

Self Cite

View full text Add to dashboard Cite

-We employ the random matrix theory (RMT) framework to revisit the distribution of resonance widths in quantum chaotic systems weakly coupled to the continuum via a finite number M of open channels. In contrast to the standard first-order perturbation theory treatment we do not a priory assume the resonance widths being small compared to the mean level spacing. We show that to the leading order in weak coupling the perturbative χ 2 M distribution of the resonance widths (in particular, the Porter-Thomas distribution at M = 1) should be corrected by a factor related to a certain average of the ratio of square roots of the characteristic polynomial ('spectral determinant') of the underlying RMT Hamiltonian. A simple single-channel expression is obtained that properly approximates the width distribution also at large resonance overlap, where the Porter-Thomas result is no longer applicable.Introduction.-Scattering of both classical and quantum waves in systems with chaotic intrinsic dynamics is characterised by universal statistical properties [1][2][3]. Those can be understood by studying the properties of quasi-stationary states in an open system formed at the intermediate stage of the scattering process [4][5][6][7]. Such states are associated with the resonances which correspond to the complex poles E n = E n −

show abstract

“…Their nonorthogonality is crucial in many applications; it influences nuclear cross sections [5], features in decay laws of quantum chaotic systems [6], and yields excess quantum noise in open laser resonators [7]. For systems invariant under time reversal, like open microwave cavities studied below, the nonorthogonality is due to the complex wave functions, yielding the so-called phase rigidity [8][9][10] and mode complexness [11,12] Recently, such nonorthogonality was identified as the root cause for enhanced sensitivity to perturbations in open systems [17], see also Ref. [18].…”

mentioning

confidence: 99%

“…This can be modeled by a Hermitian term V added to H eff , so H eff = H eff + V . The complex energy shift δE n = E n − E n of the nth resonance is then given by perturbation theory for non-Hermitian operators [17,19], yielding in the leading order δE n = L n |V |R n , where L n | and |R n are the left and right eigenfunctions of H eff corresponding to E n . They form a biorthogonal system; in particular, L n |R m = δ nm but U nm ≡ L n |L m = δ nm in general.…”

mentioning

confidence: 99%

Experimental Width Shift Distribution: A Test of Nonorthogonality for Local and Global Perturbations

et al. 2014

View full text Add to dashboard Cite

The change of resonance widths in an open system under a perturbation of its interior has been recently introduced by Fyodorov and Savin [Phys. Rev. Lett. 108, 184101 (2012)] as a sensitive indicator of the nonorthogonality of resonance states. We experimentally study universal statistics of this quantity in weakly open two-dimensional microwave cavities and reverberation chambers realizing scalar and electromagnetic vector fields, respectively. We consider global as well as local perturbations, and also extend the theory to treat the latter case. The influence of the perturbation type on the width shift distribution is more pronounced for many-channel systems. We compare the theory to experimental results for one and two attached antennas and to numerical simulations with higher channel numbers, observing a good agreement in all cases. The most general feature of open quantum or wave systems is the set of complex resonances. They manifest themselves in scattering through sharp energy variations of the observables and correspond to the complex poles of the S matrix. Theoretically, the latter are given by the eigenvalues E n = E n − i 2 Γ n of the effective non-Hermitian Hamiltonian H eff of the open system [1-4]. The antiHermitian part of H eff originates from coupling between the internal (bound) and continuum states, giving rise to finite resonance widths Γ n > 0. The other key feature is that the eigenfunctions of H eff are nonorthogonal [2,4]. Their nonorthogonality is crucial in many applications; it influences nuclear cross sections [5], features in decay laws of quantum chaotic systems [6], and yields excess quantum noise in open laser resonators [7]. For systems invariant under time reversal, like open microwave cavities studied below, the nonorthogonality is due to the complex wave functions, yielding the so-called phase rigidity [8][9][10] and mode complexness [11,12] Recently, such nonorthogonality was identified as the root cause for enhanced sensitivity to perturbations in open systems [17], see also Ref. [18]. Consider the parametric motion of complex resonances under internal perturbations. This can be modeled by a Hermitian term V added to H eff , so H eff = H eff + V . The complex energy shift δE n = E n − E n of the nth resonance is then given by perturbation theory for non-Hermitian operators [17,19], yielding in the leading order δE n = L n |V |R n , where L n | and |R n are the left and right eigenfunctions of H eff corresponding to E n . They form a biorthogonal system; in particular, L n |R m = δ nm but U nm ≡ L n |L m = δ nm in general. U is known in nuclear physics as the Bell-Steinberger nonorthogonality matrix [2,5], see also [20]. Crucially, a nonzero width shift δΓ n = −2Im δE n is induced solely by the off-diagonal elements of U [17]where V nm = R n |V |R m = V * mn . It vanishes only if the resonance states were orthogonal (all U m =n = 0).Note that the nonorthogonality measures studied in Refs. [7][8][9][10][11][12] are related to the diagonal elements U nn . Those and the width s...

show abstract

Statistics of Resonance Width Shifts as a Signature of Eigenfunction Nonorthogonality

Cited by 79 publications

References 50 publications

Information Geometry of Complex Hamiltonians and Exceptional Points

Information Geometry of Complex Hamiltonians and Exceptional Points

Resonance width distribution in RMT: Weak-coupling regime beyond Porter-Thomas

Experimental Width Shift Distribution: A Test of Nonorthogonality for Local and Global Perturbations

Contact Info

Product

Resources

About