Computational Physics Homework 11 of Mobingbizhen

1. Abstract

  • EXERCISES
    4.19. Study the behavior of our model for Hyperion for different initial conditions. Estimate the Lyapunov exponent from calculations of Δθ, such as those shown in Figure 4.19. Examine how this exponent varies as a function of the eccentricity of the orbit. <br />
    4.20. Our results for the divergence of the two trajectories θ1(t) and θ2(t) in the chaotic regime, shown on the right in Figure 4.19, are complicated by the way we dealt with the angle θ. In Figure 4.19 we followed the practice employed in Chapter 3 and restricted θ to the range -π to +π, since angles ouside this range are equivalent to angles within it. However, when during the course of a calculation the angle passes out of this range and is then 'reset' (by adding or subtracting 2π), this shows up in the results for Δθ as a discontinuous (and distrcting) jump. Repeat the calculation of Δθ as in Figure 4.19, but do not restrict the value of θ. This should remove the large (Δθ ~ 2π) jumps in Δθ in Figure 4.19, but the smaller and more frequent dips will remain. What is the origin of these dips? Hint: Consider the behavior of a pendulum near one of its turning points.



2. Background

§ 2.1 Three-Body Problem

In physics and classical mechanics, the three-body problem is the problem of taking an initial set of data that specifies the positions, masses and velocities of three bodies for some particular point in time and then determining the motions of the three bodies, in accordance with the laws of classical mechanics (Newton's laws of motion and of universal gravitation). The three-body problem is a special case of the n-body problem.

Historically, the first specific three-body problem to receive extended study was the one involving the Moon, the Earth and the Sun. In an extended modern sense, a three-body problem is a class of problems in classical or quantum mechanics that model the motion of three particles.

Three body problem
Three Body
Three Body prime


§ 2.2 Ring System

A ring system is a disc or ring orbiting an astronomical object that is composed of solid material such as dust and moonlets, and is a common component of satellite systems around giant planets. A ring system around a planet is also known as a planetary ring system.

The most prominent planetary rings in the Solar System are those around Saturn, but the other three giant planets (Jupiter, Uranus, and Neptune) also have ring systems. Recent evidence suggests that ring systems may be found around other types of astronomical objects, including minor planets, moons, and brown dwarfs.

Saturn
Saturn's rings are the most extensive ring system of any planet in the solar system, and thus have been known to exist for quite some time. Galileo Galilei first observed them in 1610, but they were not accurately described as a disk around Saturn until Christiaan Huygens did so in 1655. The rings are not a series of tiny ringlets as many think, but are more of a disk with varying density. They consist mostly of water ice and trace amounts of rock, and the particles range in size from micrometers to meters.

Saturn in natural colors (captured by the Hubble Space Telescope)
Saturn's rings dark side mosaic


§ 2.3 Hyperion

Hyperion (/haɪˈpɪəriən/; Greek: Ὑ π ε ρ ί ω ν), also known as Saturn VII (7), is a moon of Saturn discovered by William Cranch Bond, George Phillips Bond and William Lassell in 1848. It is distinguished by its irregular shape, its chaotic rotation, and its unexplained sponge-like appearance. It was the first non-round moon to be discovered.

Hyperion true



3. Main Body

§ 3.1 Claculation

To simulate the motion of Hyperion we will first make few simplifying assumptions.Our goal will not be to perform a relastic simulations.Rather,our objective is simply to show that the motion of such an irregularly shaped moon can be chaotic.With that goal in mind we consider the model with two bodies.We have two particles m1 and m2,connected by a massless rod in orbit around a massive object located at the origin. There are two forces acting on each of the masses,the force of gravity from Saturn and the force from the rod.Since we are interested in the motion about the center of mass,the force from the rod does not contribute.

The coordinateed of the center of mass are (xc , yc), so that (x1 - xc) i + (y1 - yc) j is the vector from the center of mass to m1. The torque on m1 is then:

With a similiar expression for τ2. The total torque on the moon is just τ1 + τ2, and and this is related to the time derivtive of ω by:

where I = m1 r1 ^2 + m2 r2 ^2is the moment of inertia.Putting this all together yields, after some algebra.

where rc is the distance from the center fo mass to Saturn



§ 3.2 Algorithm

Euler_Cromer Method



§ 3.3 Results

For simplicity we took the unit of length to be the radius of Hyperion's orbit (which might be called 1 HU = "Hyperion unit"), and that of time to be the orbital period of Hyperion's around Saturn (1 "Hyperion-year"). Thus, just as in the Earth-Sun case, we have GMSat = 4π^2 in these units. The time step was 0.0001 Hyperion - year.

† 3.3.1 Problem 4.19

‡ Results of the tumbing of Hyperion calculated assuming a particular orbit

code

Figure 1: initial speed = 2π, initial θ = 0, so the eccentricity is 1 and the orbit is circular.

code

Figure 2: initial speed = 2π, initial ω = 0, so the eccentricity is 1 and the orbit is circular.

The abrupt vertical jumps in θ are simply due to the program "resetting" θ to keep it in the range -π to π (as we did in our pendulum simulations). The behavior in Figure 1 and 2 is seen to be regular and repeatable; this is especially clear from the results for ω. We thus conclude that the motion is not chaotic when the orbit is circular.

code

Figure 3: Phase plot for tunbling of Hyperion calculated assuming a circular orbit.


code

Figure4: initial speed = 5, initial θ = 0, so the eccentricity > 1 and the orbit is elliptical.

code

Figure5: initial speed = 5, initial ω = 0, so the eccentricity > 1 and the orbit is elliptical.

The results obtained for an elliptical orbit, Figure 4 and 5, are very different. The behavior seen in this case is very complicated and erratic, and certainly appears to be chaotic.

code

Figure 6: Phase plot for tunbling of Hyperion calculated assuming a eliiptical orbit.



‡ Results of divergence of two nearby trajectories of tumbling motion of Hyperion

I plot the difference between two calculated results for θ(t) with different initial conditions. I used θ(0) = 0 for one trajectory and θ(0) = 0.01 for the other. In all cases the initial ω was zero.

code

Figure 7: Calculated for a circular orbit (as considered in Figure 1, 2 and 3).

Figure 8: Scatter diagram of Figure 7.


If I choose an appropriate range for Δθ, we will obtain a better-looking figure, like: set Δθ from 0.0001 to 0.1.

Figure 9: Different Δθ range from Figure 8.

In this circular case we see that while Δθ oscillates some with time, its overall magnitude grows only very slowly. Hence, these two trajectories, θ1(t) and θ2(t), stay near each other, and the motion is not chaotic (as we have already concluded).


Let us take a much closer look at the strange points highly above the other points in Figure 7 that leads to the strange lines in Figure 7. What we need to do is to zoom in an vicinity of one of these strange points in Figure 7.

**From the figure above we can see, In fact, they are not single points, but s series of points and any one is very close to each other. **


code

Figure 10: Calculated for a elliptical orbit (the same ellipse as used in Figure 4, 5 and 6).

Figure 11: Scatter diagram of Figure 10.

Figure 12: Different Δθ range from Figure 11.

In contrast, we see that Δθ for elliptical orbit grows rapidly, approximately exponentially, with time until it reaches a value of order π, and it can't get any larger than that. As we saw in Chapter 3, this extrme sensitivity to initial conditions is one of the hallmarks of chaotic behavior.



† 3.3.1 Problem 4.20

If I do not restrict the value of θ. In other words, I remove the following code from my program:

        while self.theta[i + 1] > math.pi:
            self.theta[i + 1] = self.theta[i + 1] - 2 * math.pi
        while self.theta[i + 1] <= -math.pi:
            self.theta[i + 1] = self.theta[i + 1] + 2 * math.pi

code

Figure 13: Calculated for a circular orbit wihout restriction of the value of θ.

Figure 14: Calculated for a circular orbit wihout restriction of the value of θ and change time range from [0, 10yr] to [0, 100yr].

code

Figure 15: Calculated for a elliptical orbit wihout restriction of the value of θ.

Figure 16: Calculated for a elliptical orbit wihout restriction of the value of θ and change time range from [0, 10yr] to [0, 100yr].




4. Conclusion

† 4.1 Problem 4.19

  • The Lyapunov varies as a function of the eccentricity of the orbit, as this following figure shows:

The behavior of Δθ versus time (representing the Lyapunov exponent) varies with the change of the eccentricity.

  • I can't give the analytical form of function of the exponent with respect to the eccentricity.


‡ 4.2 Problem 4.20

With non-resetting program,the vertical lines in the plot vanish.It is reasonable due to the fact that the 'sudden turning points vanish'.And the θ becomes a continuous vaiable versus time.




5. Acknowledgement

  • Prof. Cai
  • Wikipedia
  • Baidu
  • ZZT (Zhang Zitong)
最后编辑于
©著作权归作者所有,转载或内容合作请联系作者
  • 序言:七十年代末,一起剥皮案震惊了整个滨河市,随后出现的几起案子,更是在滨河造成了极大的恐慌,老刑警刘岩,带你破解...
    沈念sama阅读 212,332评论 6 493
  • 序言:滨河连续发生了三起死亡事件,死亡现场离奇诡异,居然都是意外死亡,警方通过查阅死者的电脑和手机,发现死者居然都...
    沈念sama阅读 90,508评论 3 385
  • 文/潘晓璐 我一进店门,熙熙楼的掌柜王于贵愁眉苦脸地迎上来,“玉大人,你说我怎么就摊上这事。” “怎么了?”我有些...
    开封第一讲书人阅读 157,812评论 0 348
  • 文/不坏的土叔 我叫张陵,是天一观的道长。 经常有香客问我,道长,这世上最难降的妖魔是什么? 我笑而不...
    开封第一讲书人阅读 56,607评论 1 284
  • 正文 为了忘掉前任,我火速办了婚礼,结果婚礼上,老公的妹妹穿的比我还像新娘。我一直安慰自己,他们只是感情好,可当我...
    茶点故事阅读 65,728评论 6 386
  • 文/花漫 我一把揭开白布。 她就那样静静地躺着,像睡着了一般。 火红的嫁衣衬着肌肤如雪。 梳的纹丝不乱的头发上,一...
    开封第一讲书人阅读 49,919评论 1 290
  • 那天,我揣着相机与录音,去河边找鬼。 笑死,一个胖子当着我的面吹牛,可吹牛的内容都是我干的。 我是一名探鬼主播,决...
    沈念sama阅读 39,071评论 3 410
  • 文/苍兰香墨 我猛地睁开眼,长吁一口气:“原来是场噩梦啊……” “哼!你这毒妇竟也来了?” 一声冷哼从身侧响起,我...
    开封第一讲书人阅读 37,802评论 0 268
  • 序言:老挝万荣一对情侣失踪,失踪者是张志新(化名)和其女友刘颖,没想到半个月后,有当地人在树林里发现了一具尸体,经...
    沈念sama阅读 44,256评论 1 303
  • 正文 独居荒郊野岭守林人离奇死亡,尸身上长有42处带血的脓包…… 初始之章·张勋 以下内容为张勋视角 年9月15日...
    茶点故事阅读 36,576评论 2 327
  • 正文 我和宋清朗相恋三年,在试婚纱的时候发现自己被绿了。 大学时的朋友给我发了我未婚夫和他白月光在一起吃饭的照片。...
    茶点故事阅读 38,712评论 1 341
  • 序言:一个原本活蹦乱跳的男人离奇死亡,死状恐怖,灵堂内的尸体忽然破棺而出,到底是诈尸还是另有隐情,我是刑警宁泽,带...
    沈念sama阅读 34,389评论 4 332
  • 正文 年R本政府宣布,位于F岛的核电站,受9级特大地震影响,放射性物质发生泄漏。R本人自食恶果不足惜,却给世界环境...
    茶点故事阅读 40,032评论 3 316
  • 文/蒙蒙 一、第九天 我趴在偏房一处隐蔽的房顶上张望。 院中可真热闹,春花似锦、人声如沸。这庄子的主人今日做“春日...
    开封第一讲书人阅读 30,798评论 0 21
  • 文/苍兰香墨 我抬头看了看天上的太阳。三九已至,却和暖如春,着一层夹袄步出监牢的瞬间,已是汗流浃背。 一阵脚步声响...
    开封第一讲书人阅读 32,026评论 1 266
  • 我被黑心中介骗来泰国打工, 没想到刚下飞机就差点儿被人妖公主榨干…… 1. 我叫王不留,地道东北人。 一个月前我还...
    沈念sama阅读 46,473评论 2 360
  • 正文 我出身青楼,却偏偏与公主长得像,于是被迫代替她去往敌国和亲。 传闻我的和亲对象是个残疾皇子,可洞房花烛夜当晚...
    茶点故事阅读 43,606评论 2 350

推荐阅读更多精彩内容