This gives a number between 0 and 1, indicating how effective is

This gives a number between 0 and 1, indicating how effective is the transformations in taking an initial state to the objective state and back to the initial state in twice of time (the reset phase). The initial population of chromosomes (V g0, τ v, ϵ 0, ρ) is randomly created, then fitness is determined for each

chromosome JQ1 clinical trial (which implies to have the time-dependent evolution of C l (t) to the measurement time); parents are selected according to their fitness and reproduced by pairs, and the product is mutated until the next generation is completed; one performs the same process until a stop criterion is satisfied. Results and discussion The control dynamics were done considering N = 6 states, two of them are used as the qubit basis, so that the effect of the interaction stays inside the qubit subspace . The gate operation is completed in a time window that depends on ϵ 0 , and control parameters are defined MK-8669 research buy to achieve operation inside a determined time window. The possible values of the electric field direction ρ is set from 0 to 2π, pulse width τ v domain is set from 0 to time window and the magnitude V g0 is set from 0 to an arbitrary value. The genetic algorithm procedure is executed for quantum gates σ x and σ y.

The fitness reaches a value close to 1 near to 30 generations for both gates. The optimal parameters found for quantum gate σ x are V g0  = .0003685, τ v = 4215.95, ϵ 0 = .0000924, and ρ = .9931π. For σ y are V g0 = .0355961, τ v = 326.926, ϵ 0 = .0000735, and ρ = 1.5120π. For the quantum gate σ z, genetic algorithm is not needed because for this case, ϵ 0  = 0, so Equation 6 is an uncoupled

ordinary differential equation (ODE) with specific solution. To achieve this gate transformation in a determined time window, we can calculate V g0, so Janus kinase (JAK) that the control values for this quantum gate are V g0  = .1859, τ v = 5,000, ϵ 0 = 0, and ρ = 0. In Figure 3, we plot the time evolution of the gate fidelity or fitness for the three gates. We observe a good optimal convergence close to 1 at the time of measurement and reaching again the reset phase. To see the state transition and the quantum gate effect in the space, it is convenient to plot the density probability in the quantum dot and the corresponding pseudospin current, where we see how the wave packet has different time trajectory according to the gate transformation. For instance, the direction and time of creation of the characteristic hole (null probability) in the middle of the qubit one, which correspond more or less to an equal superposition of the qubit zero and one (column 2 and row 2 in Figure 4, right). This process has to be different for σ y because it introduces an imaginary phase in the evolution which is similar with the change of the arrow directions in the pseudospin current.

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