I'm making a program that implements procedural content generation (PCG) to create maps in a 2d game.
I use the graph data structure as the basis. then the graph will be transformed into a map like in the example image I attached.
with graph specifications as follows:
-vertex can have more than 4 edges
-allowed the formation of cycles in the graph
any suggestions on what method I can use to transform the graph to a 2d map in a grid with space-tight results?
thanks
Uh, that is a tough one. The first problem you will encounter is whether this is even possible for the graph you use. See more below for that specific topic.
Let's say we ignore the fact that your graph could be impossible to map to a grid. I faced the same issue in my Master's Thesis a few years back. (PDF available here; 3.4 World Generation; page 25). I tried to find an algorithm, that could generate my world from a graph structure but ultimately failed. I tried placing one element after the other and implemented some backtracking in case it got stuck. But in the end you're facing a similar complexity to calculating chess moves. At some point you know you messed up, but you don't know how many steps you should go back/reverse, before trying the next one. If you try to solve this by brute force, you're not going to have a good time. And I did not come up with good heuristics to solve it in an adequate time.
My solution: I decided in the end to go with AnswerSet Programming. You're basically not solving the problem with an algorithm, but you find a (more or less) elegant logical representation of your problem and let a logic solver (program specifically made to find a valid solution to your logical problem-representation) do the work. Have a look in my thesis about the details, it was a few years ago and I didn't use one since. I remember however, that this process was not easy and it took me a few days to find a good logical representation of my problem.
Another question to ask: Could you work on the grid directly? Or maybe on a graph structure representing a grid? In the end a grid is nothing else than a graph; every cell is a node and neighbouring connections are the edges. I have quite some experience in the field and would be happy to help you, if you'd like to share what you want to achieve with your generator. I have also a vast collection of resources about procedural generation, maybe you find something helpful there, too.
More on the planarity of a graph: For your graph to be mappable to a plane, it needs to be planar, and checking so is also not trivial. The easiest way - if I'm not mistaken - is to prove the existence of a non-planar sub-graph, e.g. the K5 (the smallest non-planar a complete graph) or K3,3 (the smallest non-planar complete bipartite graph). And even if your graph is planar, it is not necessarily guaranteed that you can put it on your grid.
I'm currently working on a Calculator app and I want output to be in both a simplified expression and decimal answer form. An example would be sqrt 2 * sqrt 3 = sqrt 6 which can also be outputted as 2.44948... What is the best approach to this and is there any well-established algorithms to do this?
Yes. What you likely want is a computer algebra system, which understands formulas as artifacts to be manipulated by explicit mathematics rules.
Mathematica and Macsyma are applications which do this. However, these are quite sophisticated systems and it is not easy to see how they "work".
What you need to do is:
Represent formulas as abstract syntax trees
Parse text formulas (your example equations) into such trees
Encode a set of tree-manipulation rules that represent algebra operations
Apply these rules to your algebra trees
Prettyprint the algebra trees back as text when done
Rules are best written in the surface syntax of algebra. (Mathematica doesn't do this; it represents formulas as trees using a kind of prefix S-expressions, and rules as the same kind of trees with special variable nodes).
One of the issues is deciding how many "algebra" rules you are wiling to encode. Mathematics is a lot more than pure 9th grade algebra, and people using such systems tend to want to extend what is there by adding more knowledge (the point of Mathematica and Macsyma: they are infinitely extendable).
Here's a very simple version of this. You can see all the "gears" and how things are described, in terms of parse trees and rewrite rules.
http://www.semdesigns.com/Products/DMS/SimpleDMSDomainExample.html
The problem
I have a set of locations on a plane (actually they are pins in a KML file) and I want to partition this graph into subgraphs. Connectivity is pretty good - as with all real world road networks - so I assume that if two locations are close they have some kind of connection. The resulting set of subgraphs should adhere to these constraints:
Every node has to be covered by a subgraph
Every node should be in exactly 1 subgraph
Every node within a subgraph should be close to each other (L2 norm distances)
Every subgraph should contain at least 5 locations
The amount of subgraphs should be minimal
Right now the amount of locations is no more than 100 so I thought about brute forcing through every possibility but this obviously won't scale well.
I thought about using some k-Nearest-Neighbors algorithm (e.g. using QuickGraph) but I can't get my head around where to start and how to extend/shrink the subgraphs on the way. Maybe it's possible to map this problem to another problem that can easily be solved with some numerical procedure (e.g. Simplex) ...
Maybe someone has experience in this kind of optimization problems and is willing to help me find a solution? I don't have access to Mathematica/Matlab or the like ... but sufficient .NET programming skills and hmm Excel :-)
Thanks a lot!
As soon as there are multiple criteria that need to be appeased in the best possible way simultanously, it is usually starting to get difficult.
A numerical solution could work as follows: You could define yourself a utility function, that maps partitionings of your locations to positive real values, describing how "good" a partition is by assigning it a "rating" (good could be high "bad" could be near zero).
Once you have such a function assigning partitions their according "values", you simply need to optimize it and then you hopefully obtain a good solution if you defined your utility function reasonably. Evolutionary algorithms are good at that task since your utility function is probably analytically too complex to solve due to its discrete nature.
The problem is then only how you assign "values" to partitions via this utility function. This is then your task. It can be done for example by weighing each criterion with a factor and summing the results up, or even more complex functions (least squares etc.). The factors you use in the definition of the utility function are tuning parameters and can be varied until the result seems to be good.
Some CA software wold help a lot for testing if you can get your hands on one, bit I guess to obtain a black box solver for your partitioning problem, you need to implement the complete procedure yourself using a language of your choice.
To be clear I don't mean, provided the last two numbers in the sequence provide the next one:
(2, 3, -> 5)
But rather given any index provide the Fibonacci number:
(0 -> 1) or (7 -> 21) or (11 -> 144)
Adding two numbers is a very simple task for any machine learning structure, and by extension counting by ones, twos or any fixed number is a simple addition rule. Recursive calculations however...
To my understanding, most learning networks rely on forwards only evaluation, whereas most programming languages have loops, jumps, or circular flow patterns (all of which are usually ASM jumps of some kind), thus allowing recursion.
Sure some networks aren't forwards only; But can processing weights using the hyperbolic tangent or sigmoid function enter any computationally complete state?
i.e. conditional statements, conditional jumps, forced jumps, simple loops, complex loops with multiple conditions, providing sort order, actual reordering of elements, assignments, allocating extra registers, etc?
It would seem that even a non-forwards only network would only find a polynomial of best fit, reducing errors across the expanse of the training set and no further.
Am I missing something obvious, or did most of Machine Learning just look at recursion and pretend like those problems don't exist?
Update
Technically any programming language can be considered the DNA of a genetic algorithm, where the compiler (and possibly console out measurement) would be the fitness function.
The issue is that programming (so far) cannot be expressed in a hill climbing way - literally, the fitness is 0, until the fitness is 1. Things don't half work in programming, and if they do, there is no way of measuring how 'working' a program is for unknown situations. Even an off by one error could appear to be a totally different and chaotic system with no output. This is exactly the reason learning to code in the first place is so difficult, the learning curve is almost vertical.
Some might argue that you just need to provide stronger foundation rules for the system to exploit - but that just leads to attempting to generalize all programming problems, which circles right back to designing a programming language and loses all notion of some learning machine at all. Following this road brings you to a close variant of LISP with mutate-able code and virtually meaningless fitness functions that brute force the 'nice' and 'simple' looking code-space in attempt to follow human coding best practices.
Others might argue that we simply aren't using enough population or momentum to gain footing on the error surface, or make a meaningful step towards a solution. But as your population approaches the number of DNA permutations, you are really just brute forcing (and very inefficiently at that). Brute forcing code permutations is nothing new, and definitely not machine learning - it's actually quite common in regex golf, I think there's even an xkcd about it...
The real problem isn't finding a solution that works for some specific recursive function, but finding a solution space that can encompass the recursive domain in some useful way.
So other than Neural Networks trained using Backpropagation hypothetically finding the closed form of a recursive function (if a closed form even exists, and they don't in most real cases where recursion is useful), or a non-forwards only network acting like a pseudo-programming language with awful fitness prospects in the best case scenario, plus the virtually impossible task of tuning exit constraints to prevent infinite recursion... That's really it so far for machine learning and recursion?
According to Kolmogorov et al's On the representation of continuous functions of many variables by superposition of continuous functions of one variable and addition, a three layer neural network can model arbitrary function with the linear and logistic functions, including f(n) = ((1+sqrt(5))^n - (1-sqrt(5))^n) / (2^n * sqrt(5)), which is the close form solution of Fibonacci sequence.
If you would like to treat the problem as a recursive sequence without a closed-form solution, I would view it as a special sliding window approach (I called it special because your window size seems fixed as 2). There are more general studies on the proper window size for your interest. See these two posts:
Time Series Prediction via Neural Networks
Proper way of using recurrent neural network for time series analysis
Ok, where to start...
Firstly, you talk about 'machine learning' and 'perfectly emulate'. This is not generally the purpose of machine learning algorithms. They make informed guesses given some evidence and some general notions about structures that exist in the world. That typically means an approximate answer is better than an 'exact' one that is wrong. So, no, most existing machine learning approaches aren't the right tools to answer your question.
Second, you talk of 'recursive structures' as some sort of magic bullet. Yet they are merely convenient ways to represent functions, somewhat analogous to higher order differential equations. Because of the feedbacks they tend to introduce, the functions tend to be non-linear. Some machine learning approaches will have trouble with this, but many (neural networks for example) should be able to approximate you function quite well, given sufficient evidence.
As an aside, having or not having closed form solutions is somewhat irrelevant here. What matters is how well the function at hand fits with the assumptions embodied in the machine learning algorithm. That relationship may be complex (eg: try approximating fibbonacci with a support vector machine), but that's the essence.
Now, if you want a machine learning algorithm tailored to the search for exact representations of recursive structures, you could set up some assumptions and have your algorithm produce the most likely 'exact' recursive structure that fits your data. There are probably real world problems in which such a thing would be useful. Indeed the field of optimisation approaches similar problems.
The genetic algorithms mentioned in other answers could be an example of this, especially if you provided a 'genome' that matches the sort of recursive function you think you may be dealing with. Closed form primitives could form part of that space too, if you believe they are more likely to be 'exact' than more complex genetically generated algorithms.
Regarding your assertion that programming cannot be expressed in a hill climbing way, that doesn't prevent a learning algorithm from scoring possible solutions by how many much of your evidence it's able to reproduce and how complex they are. In many cases (most? though counting cases here isn't really possible) such an approach will find a correct answer. Sure, you can come up with pathological cases, but with those, there's little hope anyway.
Summing up, machine learning algorithms are not usually designed to tackle finding 'exact' solutions, so aren't the right tools as they stand. But, by embedding some prior assumptions that exact solutions are best, and perhaps the sort of exact solution you're after, you'll probably do pretty well with genetic algorithms, and likely also with algorithms like support vector machines.
I think you also sum things up nicely with this:
The real problem isn't finding a solution that works for some specific recursive function, but finding a solution space that can encompass the recursive domain in some useful way.
The other answers go a long way to telling you where the state of the art is. If you want more, a bright new research path lies ahead!
See this article:
Turing Machines are Recurrent Neural Networks
http://lipas.uwasa.fi/stes/step96/step96/hyotyniemi1/
The paper describes how a recurrent neural network can simulate a register machine, which is known to be a universal computational model equivalent to a Turing machine. The result is "academic" in the sense that the neurons have to be capable of computing with unbounded numbers. This works mathematically, but would have problems pragmatically.
Because the Fibonacci function is just one of many computable functions (in fact, it is primitive recursive), it could be computed by such a network.
Genetic algorithms should do be able to do the trick. The important this is (as always with GAs) the representation.
If you define the search space to be syntax trees representing arithmetic formulas and provide enough training data (as you would with any machine learning algorithm), it probably will converge to the closed-form solution for the Fibonacci numbers, which is:
Fib(n) = ( (1+srqt(5))^n - (1-sqrt(5))^n ) / ( 2^n * sqrt(5) )
[Source]
If you were asking for a machine learning algorithm to come up with the recursive formula to the Fibonacci numbers, then this should also be possible using the same method, but with individuals being syntax trees of a small program representing a function.
Of course, you also have to define good cross-over and mutation operators as well as a good evaluation function. And I have no idea how well it would converge, but it should at some point.
Edit: I'd also like to point out that in certain cases there is always a closed-form solution to a recursive function:
Like every sequence defined by a linear recurrence with constant coefficients, the Fibonacci numbers have a closed-form solution.
The Fibonacci sequence, where a specific index of the sequence must be returned, is often used as a benchmark problem in Genetic Programming research. In most cases recursive structures are generated, although my own research focused on imperative programs so used an iterative approach.
There's a brief review of other GP research that uses the Fibonacci problem in Section 3.4.2 of my PhD thesis, available here: http://kar.kent.ac.uk/34799/. The rest of the thesis also describes my own approach, which is covered a bit more succinctly in this paper: http://www.cs.kent.ac.uk/pubs/2012/3202/
Other notable research which used the Fibonacci problem is Simon Harding's work with Self-Modifying Cartesian GP (http://www.cartesiangp.co.uk/papers/eurogp2009-harding.pdf).
http://msl.cs.uiuc.edu/rrt/
Can anyone explain how rrt works with simple wording that is easy to understand?
I read the description in the site and in wikipedia.
What I would like to see, is a short implementation of a rrt or a thorough explanation of the following thing:
Why does the rrt grow outwards instead of just growing very dense around the center?
How is it different from a naive random tree?
How is the next new vertex that we attempt to reach picked?
I know there is an Motion Strategy Library I could download but I would much rather understand the idea before I delve into the code rather than the other way around.
The simplest possible RRT algorithm has been so successful because it is pretty easy to implement. Things tend to get complicated when you:
need to visualise planning concepts in more than two dimensions
are unfamiliar with the terminology associated with planning, and;
in the huge number of variants of RRT that are have been described in the literature.
Pseudo code
The basic algorithm looks something like this:
Start with an empty search tree
Add your initial location (configuration) to the search tree
while your search tree has not reached the goal (and you haven't run out of time)
3.1. Pick a location (configuration), q_r, (with some sampling strategy)
3.2. Find the vertex in the search tree closest to that random point, q_n
3.3. Try to add an edge (path) in the tree between q_n and q_r, if you can link them without a collision occurring.
Although that description is adequate, after a while working in this space, I really do prefer the pseudocode of figure 5.16 on RRT/RDT in Steven LaValle's book "Planning Algorithms".
Tree Structure
The reason that the tree ends up covering the entire search space (in most cases) is because of the combination of the sampling strategy, and always looking to connect from the nearest point in the tree. This effect is described as reducing the Voronoi bias.
Sampling Strategy
The choice of where to place the next vertex that you will attempt to connect to is the sampling problem. In simple cases, where search is low dimensional, uniform random placement (or uniform random placement biased toward the goal) works adequately. In high dimensional problems, or when motions are very complex (when joints have positions, velocities and accelerations), or configuration is difficult to control, sampling strategies for RRTs are still an open research area.
Libraries
The MSL library is a good starting point if you're really stuck on implementation, but it hasn't been actively maintained since 2003. A more up-to-date library is the Open Motion Planning Library (OMPL). You'll also need a good collision detection library.
Planning Terminology & Advice
From a terminology point of view, the hard bit is to realise that although lots of the diagrams you see in the (early years of) publications on RRT are in two dimensions (trees that link 2d points), that this is the absolute simplest case.
Typically, a mathematically rigorous way to describe complex physical situations is required. A good example of this is planning for a robot arm with n- linkages. Describing the end of such an arm requires a minimum of n joint angles. This set of minimum parameters to describe a position is a configuration (or some publications state). A single configuration is often denoted q
The combination of all possible configurations (or a subset thereof) that can be achieved make up a configuration space (or state space). This can be as simple as an unbounded 2d plane for a point in the plane, or incredibly complex combinations of ranges of other parameters.