Exact(19)
"People will lose interest if the time scale is too long".
In other words, y and θ will not change if the time scale x does not change.
If the tan curves overlap it means that the relaxation mechanism of the different formulations is almost the same, even if the time scale is different.
The latter could be particularly significant if the time scale τ of synaptic dynamics is larger than the window width Δt.
Our results obtained in this paper are completely new even if the time scale or and are of great significance in designs and applications of globally stable anti-periodic Cohen-Grossberg neural networks with delays and impulses.
If the time scale for ambipolar or Ohmic diffusion is large compared to the evolutionary time of a system, the magnetic field is 'frozen' into the gas and moves with it (but see Maki and Susa 2004, 2007).
Similar(41)
If the time scales of these two rhythms are sufficiently apart, we have a fast slow burster.
Although accurate in capturing the dynamic of biomolecular interaction systems, SSA becomes computationally intractable, if the time scales of involved interaction events are disparate, because it simulates every single biomolecular interaction event, spending inordinate amounts on fast reactions for very few simulated occurrences of slow reactions.
This can be explained if we assume the time scale of flares is determined by the Alfvén time.
If we take the time scale as (mathbb{T}_{1} times mathbb{T}_{2} = mathbb{Z} timesmathbb{Z}) for the discrete case, the forward jump operator of the set (mathbb{Z}) is (sigma_{1} (t)=t+1) and (sigma_{2} (s)=s+1).
(1) If we consider the time scale (mathbb{T}^{a}_{ q,h)}) with (v_{0}) replaced by v, then the integration over ([frac{h}{1-q},t]) yields the definition of the nabla ((q,h -integral in the form int^{v}_{h/(1-q)}phi(u)nabla_{(q,h -integralinl(1-q^{-1}bigr)v+q^{-1}hbigr)sum ^{infthe}_{k=0}q^{-k}phibigl(q^{-k}v+[-k]_{q}h bigr), provided that the informte serint^{v}verges.
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