[
{
"content": "IMPORTANT",
"children": [
{
"content": "https://www.ocps.net/lc/east/hun/academics/programs/ib/Documents/Extended%20Essay%20Guidelines%20and%20Requirements%202-27-13.pdf\n"
}
]
},
{
"content": "Background",
"children": [
{
"content": "“As far as the laws of mathematics refer to reality, they are not certain, and as far as they are certain, they do not refer to reality.”\n\n---Albert Einstein"
},
{
"content": "Feedback often causes chaotic behavior in a system.\n\ne.g. stock market :\n prices moving up or down gives incentive for people to buy or sell stocks, causing it to move up or down chaotically. \n(example from http://fractalfoundation.org/resources/what-is-chaos-theory/)",
"children": [
{
"content": "x[n+1] = f(x[n])\nThe next term in sequence is a function of the previous term. This means every term is determined by the previous term by a function.\n\ne.g. Fibonacci's sequence\nx[n] = x[n-1] + x[n-2]"
}
]
},
{
"content": "Random or Chaotic?\nRandomness is also called stochastic. Unlike chaotic, even if the two initial state of sequences are the same, random process would give different sequences.\n\nChaotic sequences are generated **deterministically** from a **dynamic system.**\n\nhttp://www.math.tamu.edu/~mpilant/math614/chaos_vs_random.pdf",
"children": [
{
"content": "Deterministic--- causal effect in physics.\n\"It is the concept that events within a given paradigm are so causally bound that prior states of any object or event completely determine its later states.\"\n\"For a given time interval only one future state follows from the current state\"\n\nhttp://en.wikipedia.org/wiki/Determinism"
},
{
"content": "Dynamic--- \"a concept where fixed rules describes the time dependence of a point in geometrical space.\"\n\"At any given time a dynamical system has a state given by a set of vectors, which can be represented by a point in an appropriate state space.\"\n\"Small changes in the state of the system create small changes in the numbers, due to the evolution rule of dynamic system\"\n\nhttp://en.wikipedia.org/wiki/Dynamical_system\n"
},
{
"content": "A bounded sequence of values {xi} (from i=1 till infinity) is chaotic if\n1. {xi} is not asymptotically periodic\n2. No Lyapunov exponent vanishes\n3. The largest Lyapunov exponent is strictly positive\n\nhttp://www.math.tamu.edu/~mpilant/math614/chaos_vs_random.pdf",
"children": [
{
"content": "asymptotically periodic--- its terms approaches a periodic sequence\nLyapunov exponent--- 'quantity that characterizes the rate of separation of infinitesimally close trajectories'\n\nwiki"
}
]
}
]
},
{
"content": "Predictability?\nIn a complex system, like the weather, we can never know all the initial conditions to enough precision and accuracy. With any small defect or error in the initial conditions, the error is amplified since it increases exponentially, leaving any form of prediction useless.\n\nhttp://fractalfoundation.org/resources/what-is-chaos-theory/"
}
]
},
{
"content": ""
},
{
"content": "Calculus (empty)",
"children": [
{
"content": "-= Reading 'From Calculus to Chaos' =-",
"children": [
{
"content": "\"Chaos in nonlinear ordinary diﬀerential equations\nExplore the connection between the various kinds of homoclinic bifurcations\nand the onset of chaos in ordinary diﬀerential equations.\nInvestigate the occurrence of stochasticity in Hamiltonian systems, as an\nintegrable system is perturbed more and more strongly.\nThe period doubling sequence for unimodal (one-humped) maps is well known.\nWhat happens for other maps, e.g. cubics?\"\n\nhttp://www.maths.ox.ac.uk/files/imported/current-students/undergraduates/projects/pdf/project-ideas.pdf\n"
}
]
}
]
},
{
"content": "Logistic Map (current focus)",
"children": [
{
"content": "https://www.math.ku.edu/~lerner/m221s11/LogisticLabII.pdf\nhttp://fricke.co.uk/Teaching/cs523/Project1/ExampleSolution2.pdf\nhttp://physics.bc.edu/MSC/430/T1/Application1.html\nhttp://www.emba.uvm.edu/~jxyang/teaching/Math266new/notes_6_1.htm\nhttp://en.wikipedia.org/wiki/Logistic_function"
},
{
"content": "It doesn't focus on looking for roots in a function, but instead, studies the dynamics\n\nhttp://physics.bc.edu/MSC/430/T1/Application1.html"
},
{
"content": "g(x) = r x (1-x)"
}
]
},
{
"content": "linear equations--- the dependent variable and its various derivatives appear in a linear way.\nnon-linear equations--- if its various derivative has higher powers\n\nCalculus to Chaos\n\nrecursion---a process of repeating objects in a self-similar way\n\nhttp://physics.bc.edu/MSC/430/T1/Application1.html"
},
{
"content": "Fractals",
"children": [
{
"content": "\"A fractal is a never-ending pattern. Fractals are infinitely complex patterns that are self-similar across different scales. They are created by repeating a simple process over and over in an ongoing feedback loop.\"\n\nhttp://fractalfoundation.org/resources/what-is-chaos-theory/ "
},
{
"content": "\"Driven by recursion, fractals are images of dynamic systems – the pictures of Chaos. \nGeometrically, they exist in between our familiar dimensions. Fractal patterns are extremely familiar, since nature is full of fractals. \nFor instance: trees, rivers, coastlines, mountains, clouds, seashells, hurricanes, etc.\"\n\nhttp://fractalfoundation.org/resources/what-is-chaos-theory/"
}
]
}
]