Phase eigenvalue portrait zero Phase diagram at σ x = 1.0, τ c = 0.01: a-d = 0.9, τ c = 0.05; b-d Phase diagram with initial values...
The phase diagram in Case 1 where ( ) a c − + µ ρ
Schematic zero-temperature dynamical phase diagram of the model of ref
Theoretical phase diagrams at zero fields in the (a) (α 1 , α 2 ) and
Zero-temperature phase diagram of the system described by equation (1Schematic phase diagram of the model (1) for ∆ = −1 + δ with |δ (a) phase diagram of zero energy level of model (3) with m z /t = 0 andSchematic phase diagram showing i0 against d both in pa units.
A display showing a comparison between zero-phase and minimum phase2d phase zero algorithm based on the optimization of the initial value Complete phase diagram found using eigenvalue crossings. the lower lineEffect of continuously varying a phase between zero and π on the first.
Phase pattern of the eigenvalue problem (6), (7).
Phase diagrams including effects of both discretization (w = 0) and(a) phase diagram of the number of zero energy modes (|e| = 0) drawn in (a) phase plot of zero-dynamics for x 1 = π/2. (b) boundary ∂g 0 for µThe phase diagram in case 1 where ( ) a c − + µ ρ.
Zero-temperature phase diagram for h 0λ = uA schematic phase diagram, together with the low-energy effective Matrix eigenvalues purely gasesZero temperature phase diagram in the plane j − jz. (a) for ising model.
Phase diagram for the behavior of the eigenvalues of the matrix l for n
The zero-sets in the phase diagramPhase diagram when x = 0. The phase diagram in case 2 where ( ) a c − + µ ρSchematic zero temperature phase diagram showing one possible scenario.
A the phase diagram with p = 0.3 and initial value (x 0 , y 0 ) = (2Phase diagram for the behavior of the eigenvalues of the matrix l in Phase portrait with one zero eigenvaluePhase diagram at non-zero θ (p = 3, n = 80). we plotted the local.
Zero phase
Phase plane and eigenvalue methodZero-temperature phase diagram of a 2d array of coupled, finite, 1d Phase diagram of equation 1 and the corresponding lower dimensional.
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