Ekul
Lukas   Byglandsfjord, Aust-Agder, Norway
 
 
Hei min kjære venn! Jeg heter Lukas, hyggelig å møte deg!
Не в сети
( 📶 🔋               Perturbation Theory        ⎯ ❐ ⤬ )
Perturbation theory develops an expression for the desired solution in terms of a formal power series known as a perturbation series in some "small" parameter, that quantifies the deviation from the exactly solvable problem. The leading term in this power series is the solution of the exactly solvable problem, while further terms describe the deviation in the solution, due to the deviation from the initial problem. Formally, we have for the approximation to the full solution A, a series in the small parameter (here called ε), like the following:

A = A0 + ε^1 A1 + ε^2 A2 + ⋯


In this example, A0 would be the known solution to the exactly solvable initial problem and A1, A2, ... represent the first-order, second-order and higher-order terms, which may be found iteratively by a mechanistic procedure. For small ε these higher-order terms in the series generally (but not always) become successively smaller. An approximate "perturbative solution" is obtained by truncating the series, often by keeping only the first two terms, expressing the final solution as a sum of the initial (exact) solution and the "first-order" perturbative correction

A ≈ A0 + εA1 ( ε → 0 )


Some authors use big O notation to indicate the order of the error in the approximate solution:

A = A0 + εA1 + O ( ε^2 )


If the power series in ε converges with a nonzero radius of convergence, the perturbation problem is called a regular perturbation problem. In regular perturbation problems, the asymptotic solution smoothly approaches the exact solution. However, the perturbation series can also diverge, and the truncated series can still be a good approximation to the true solution if it is truncated at a point at which its elements are minimum. This is called an asymptotic series. If the perturbation series is divergent or not a power series (e.g., the asymptotic expansion has non-integer powers ε^1/2 or negative powers ε^−2 then the perturbation problem is called a singular perturbation problem. Many special techniques in perturbation theory have been developed to analyze singular perturbation problems. If you finished reading this, please stop stalking me.

https://www2.ph.ed.ac.uk/~ldeldebb/docs/QM/lect17.pdf
Витрина скриншотов
Why is this game so pretty?
Любимая игра
179
Часов сыграно
17
Достижений
Недавняя активность
179 ч. всего
последний запуск 19 дек
130 ч. всего
последний запуск 16 дек
1 199 ч. всего
последний запуск 9 дек
500 ед. опыта
Комментарии
Lanza 27 сен. 2023 г. в 10:59 
I can't wait to finish my transformation into a girl, so he can be my BF, fr fr homie, no cap
legs 29 апр. 2023 г. в 12:14 
lucas sucks ♥♥♥♥ like an autistic woodpecker
legs 29 апр. 2023 г. в 12:14 
i hate ♥♥♥♥♥♥♥ dogs
i only beat my meat at night
i do love roblox
Ekul 11 ноя. 2022 г. в 21:00 
:c
legs 12 июл. 2022 г. в 9:16 
That was an anal-ogy. The body was society, and raindrops are humans. You are a disgusting piece of ♥♥♥♥, and you are killing society. We encourage you to disconnect yourself from everybody you know in order to not kill them.
legs 12 июл. 2022 г. в 9:13 
You are a raindrop. No different from the rest. As you fall to the Earth, you realize you are so unlucky as to fall into the mouth of a human. He swallows you and moans in pain. After all, you are the worst of raindrops and nobody likes you. You slide down his slimy throat, blasted by air as he he tries to save himself from consuming such a horrid sample of rainwater by coughing. You land in a pool of acid, standing in unbelievable pain as you simmer in the corrosive acid. However, you aren’t absorbed as the body tries to reject you. You slide your way down the stinky halls of the victim’s intestines as his body shudders, trying to purge itself of you. Halfway through your journey in his intestines, the victim stops moving. Everything does. You have successfully shut down the body. You crawl towards the light at the end of the tunnel. Finally, release.