Our proposed sorting mechanism depends very heavily on a particular random-walking mechanism that has not been demonstrated in literature before. The verification of this mechanism is thus a vital step in our research. Verification of the random walk in one dimension is fairly straightforward: as discussed in <LINK TO THE EXPERIMENTAL DESIGN SECTION>, a one-dimensional track is easy to construct, and will behave like a standard 1D random walk, showing an average translation on the order of [math]\displaystyle{ n^{\frac{1}{2}} }[/math] after n steps. Thus, we should expect the time it takes to get to some specific level of fluorescence to be proportional to the square of the number of steps we start the walker from the irreversible substrate. If we can, in an experiment, record the fluorescence over time when the walker is planted at different starting points and show that that fluorescence varies by this relationship, we'll have fairly certainly verified one-dimensional random walking.
Our particular case of 2D random walking, however, is not as easily understood, especially considering the mobility restrictions (ability to move to only 4 of 6 surrounding locations at any particular time) of our particular walker. As a control for the verification of 2D random walking, though, we still need to get an idea how long the random walk should take, and how that time will change as we start the walker at different points on the origami. We opt to do this by simulating the system with a set of movement rules derived from our design. We also use the same basic simulation (with a few alterations and extra features) to simulate our entire sorting system in a one-cargo, one-goal scenario, to give us some rudimentary numbers on how long sorting should take, with one vs multiple walkers.
Basic parameters and assumptions:
The unit of time is the step, which is the time it takes a walker to take a step given four good opposite track locations (good locations to step to) around it.
The walkable track are given coordinates like a grid (which shifts the even columns up by 0.5). The bottom-left is <1, 1>, the top-left <1, 8>, and the bottom-right <16, 1>.
Movement rules are based on column:
In even columns, a walker can move in directions <0, 1>, <0, -1>, <1, 0>, <-1, -1>.
In odd columns, a walker can move in directions <0, 1>, <0, -1>, <-1, 0>, <1, 1>.
MATLAB Code
At the core of the simulation is a function which runs runs one random walk on an origami of specified size. It can run in both a cargo-bearing (one-cargo one-goal) and a purely random-walk mode. The former has cargo positions corresponding to our particular origami pre-programmed and starting with multiple (specified by user) walkers at random locations on the origami, and terminates when all of the cargos have been "sorted" to the goal location (the x axis). The latter runs one walker starting at a specified location, and terminates when that walker reaches the specified irreversible track location. The function returns a log of all walkers positions over time, a log reporting when cargos were picked up and dropped off, and a count of the number of steps the simulation took. This function is utilized by separate cargo-bearing and random-walk data collection programs that call the function many times over a range of parameters.
The function code (saved as randomWalkFunction.m):
Toggle Code
<syntaxhighlight lang="matlab">
function [log, cargoLog, steps] = randomWalkFunction(x, y, length, ...
%x: Width y: Height
%length: max # of steps to run simulation
%numWalkers = number of walkers to simulate in cargoBearing state
%startPos = starting position for walker in randomwalk state
%endPos = irreversible track location in randomwalk state
%cargoBearing = running cargoBearing (1) vs randomWalking (0)
%restricted = whether we're paying attention to borders
%error = the chance of the failure of any single track
%Random walking cargo pickup/dropoff simulation
%for origami tile, x (horizontal) by y (vertical) dim.
%Locations index by 1. x+ = right, y+ = up
% Gregory Izatt & Caltech BIOMOD 2011
% 20110615: Initial revision
% 20110615: Continuing development
% Added simulation for cargo pickup/dropoff
% Adding support for multiple walkers
% 20110616: Debugging motion rules, making display better
% 20110616: Modified to be a random walk function, to be
% called in a data accumulator program
% 20110628-30: Modified to take into account omitted positions
% , new probe layout, and automatic halting when
% starting on impossible positions.
% 20110706: Fixed walker collision. It detects collisions properly
% now.
% 20110707: Adding support for errors -- cycles through and
% omits each track position at an input error rate
%Walkers:
% Set position randomly if we're doing cargo bearing simulation,
% or set to supplied startPos if not.
if cargoBearing
currentPos = zeros(numWalkers, 2);
for i=1:numWalkers
done = 0;
while done ~= 1
currentPos(i, :) = [randi(x, 1), randi(y, 1)];
done = checkPossible(numWalkers, currentPos, omitPos, ...
cargoPos);
end
end
else
numWalkers = 1; %Want to make sure this is one for this case
currentPos = startPos;
if checkPossible(numWalkers, currentPos, omitPos, ...
cargoPos) ~= 1
'Invalid start position.';
cargoLog = [];
steps = -1;
return
end
end
%Error: If there's a valid error rate, go omit some positions:
if error > 0
for xPos=1:x
for yPos=1:y
%Only omit if it's not already blocked by something
if checkPossible(0, [xPos, yPos], omitPos, cargoPos)
if rand <= error
omitPos = [omitPos; [xPos, yPos]];
end
end
end
end
%If we tried to move onto the bottom two spots (in terms of y)
%on an even column (i.e. a goal), we drop off cargo if we had it
%and there wasn't one there already.
%% Specific: 8th column has no goals! It has track instead.
if newPos(2) <= 2 && mod(newPos(1),2) == 0 && newPos(1) ~= 8
if cargoBearing && hasCargo(walker) == 1
%Drop cargo, increment cargo-dropped-count, but
%only if there isn't already a cargo here
temp = size(filledGoals);
match = 0;
for k=1:temp(1)
if filledGoals(k, :) == newPos
match = 1;
break
end
end
if match ~= 1
hasCargo(walker) = 0;
cargoLog = [cargoLog; steps, walker];
sorted = sorted + 1;
filledGoals = [filledGoals; newPos];
end
end
%Don't move
newPos = currentPos(walker, :);
end
%General out-of-bounds case without cargo drop:
if restricted && ((newPos(1) > x || newPos(1) < 1 || ...
newPos(2) > y || newPos(2) < 1))
%Don't go anywhere
newPos = currentPos(walker, :);
end
%Hitting cargos case:
for k=1:numCargoPos
if cargoPos(k, :) == newPos
%Remove the cargo from the list of cargos and "pick up"
% if you don't already have a cargo
if hasCargo(walker) == 0 && cargoBearing
cargoPos(k, :) = [-50, -50];
hasCargo(walker) = 1;
cargoLog = [cargoLog; steps, walker];
end
%Anyway, don't move there
newPos = currentPos(walker, :);
end
end
% Already on irrev. cargo case:
if (currentPos(walker, :) == endPos)
return
end
%Hitting other walkers case:
if numWalkers > 1
for k = 1:numWalkers
if all(newPos == currentPos(k, :)) && k ~= walker
newPos = currentPos(walker, :);
collisionLog = [collisionLog; newPos, walker, k];
end
end
end
%Hitting the omitted positions case:
%If we have any position matches with "omitted" list
%, just don't go there.
match = 0;
for k=1:numOmitPos
if omitPos(k, :) == newPos
match = 1;
end
end
if match == 1
newPos = currentPos(walker, :);
end
%Finally actually update the position
currentPos(walker, :) = newPos;
end
% Step forward, update log
steps = steps + 1;
log(steps, 2*numWalkers + 1) = steps - 1;
if (sorted == 5)
log(steps+1:end, :) = [];
break
end
end
return
%%Checks if a position is a possible place for a walker to be:
function [possible] = checkPossible(numWalkers, currentPos, ...
omitPos, cargoPos)
% If we're starting on an omitted position, or a goal, a cargo,
% or another walker, just give up immediately, and return a -1:
numOmitPos = size(omitPos, 1);
numCargoPos = size(cargoPos, 1);
possible = 1;
for walker = 1:numWalkers
thisWalkerPos = currentPos(walker, :);
% Only run this for this walker if it's placed somewhere
% valid (i.e. not waiting to be placed, x,y = 0,0)
if all(thisWalkerPos)
%Omitted positions:
for k=1:numOmitPos
if omitPos(k, :) == thisWalkerPos
possible = 0;
return
end
end
%Cargo positions:
for k=1:numCargoPos
if cargoPos(k, :) == thisWalkerPos
possible = 0;
return
end
end
%Other walkers:
for k=1:numWalkers
if (all(currentPos(k, :) == thisWalkerPos)) && ...
(k ~= walker)
possible = 0;
return
end
end
%Goal positions:
if mod(thisWalkerPos(1), 2)==0 && thisWalkerPos(1) ~= 8 ...
&& thisWalkerPos(2) <= 2
possible = 0;
return
end
end
end
return
</syntaxhighlight>
Examining Errors in Origami
This code can be used to generate diagrams like those below, visualizing the mobility of the walker. One immediate question thus far unanswered is the vulnerability of this layout to errors in the laying of track. We investigate this by, when generating the track layout in the beginning of randomWalkFunction, introducing a small (specified by input) percent chance that any single track will be omitted. Error rates at around 10% are bearable; error rates greater than that, however, are catastrophic, causing walkers to become permanently trapped in small sections of the track field.
Random-Walk Simulation
The data we need from this simulator is a rough projection of the fluorescence response from our test of 2D random walking, which should change based on the starting location of the walker. Because this fluorescence is changed by a fluorophore-quencher interaction upon a walker reaching its irreversible track, in the case where we plant all of the walkers on the same starting track, the time it takes [math]\displaystyle{ (fluorescence_{initial} - fluorescence_{current}) }[/math] in the sample to reach some standard value should be proportional to the average time it takes the walkers to reach the irreversible substrate. As this 'total steps elapsed' value is one of the outputs of our simulation function, we can generate a map of these average walk durations by running a large number of simulations at each point on the origami and averaging the results: Toggle Code
<syntaxhighlight lang="matlab">
%%% Random walk bulk simulation that
%% runs a battery of tests and plots the results
%% to see how long random walks take on average to complete
%% based on distance from goal / platform size
% Gregory Izatt & Caltech BIOMOD 2011
% 20110616: Initial revision
% 20110624: Updating some documentation
% 20110701: Updating to use new, updated randomWalkFunction
% 20110707: Updated to use new error-allowing randomWalkFunction
%% Dependency: makes calls to randomWalkFunction.m
iterations = 2500; %Test each case of random walk this # times
xMax = 16; %Scale of platform for test
yMax = 8;
stopPos = [15, 7]; %Stop position
averages = zeros(xMax, yMax); %Init'ing this
trash = []; %Trash storing variable
%Cycle over whole area, starting the walker at each position
%and seeing how long it takes it to get to the stop position
matlabpool(4)
for x=1:xMax
Results of the bulk data collection at right show that the average random-walk duration, and thus the time for [math]\displaystyle{ (fluorescence_{initial} - fluorescence_{current}) }[/math] to reach some standard level, increases with distance, though it changes less significantly the farther out one gets. Also important to note is that the "effective distance" (in terms of steps) along the short axis of our platform is a significantly less than the same physical distance along the long axis. This difference is due to our arrangement of track A and B: as can be seen in the left half of the diagram at the end of the #Overview section, alternating tracks A and B create a straight vertical highway for the walker to follow. Horizontal movement, in contrast, cannot be accomplished by purely straight-line movement -- it requires a back-and-forth weave that makes motion in that direction slower. The disparity in "effective distances" between the vertical and horizontal dimensions is something, in particular, that we should test for; however, a simple series of tests running random walks at a variety of points across the surface, and the comparison of the resulting fluorescence data to the control provided by this simulation should be sufficient to prove that our walker can, indeed, perform a 2D random walk.
Cargo Sorting Simulation
This simulation investigates both the overall tractability of our sorting problem, and the degree to which it can be parallelized via the addition of multiple walkers onto a single origami. It runs by making repeated calls to randomWalkFunction in its cargo-bearing mode, testing the number of steps it takes to sort all five cargos to respective goals over a range of number of cooperating walkers: Toggle Code
<syntaxhighlight lang="matlab">
%%% Cargo pickup/dropoff bulk simulation that
%% runs a battery of tests and plots the results
%% to see how long cargo sorts take on average
% Gregory Izatt & Caltech BIOMOD 2011
% 20110616: Initial revision
% 20110616: Fixing to fit cargoSort.m revision
% 20110623: Fixing documentation
% 20110701: Updating to work with new and improved randomWalkFunction
% 20110707: Updated to include error rate addition in randomWalkFunction
%% Dependency: Makes calls to randomWalkFunction.m
iterations = 50; %Test each #walker scenario this many times
maxNumWalkers = 30; %Test scenarios with up to this many walkers
averages = zeros(maxNumWalkers, 1);
medians = zeros(maxNumWalkers, 1);
'Initialized...'
matlabpool(3) %Built-in parallel processing for speedup.
%Change "4" to your # of cores.
for numWalkers=1:maxNumWalkers %Iterate over possible #'s of walkers
tempStorage = zeros(iterations, 1);
parfor i=1:iterations %Iterate a bunch of times
[trash, trash2, temp] = randomWalkFunction(16, 8, 10000, ...
numWalkers, [1, 1], [-100, -100], 1, 1, 0.0);
tempStorage(i) = temp;
end
averages(numWalkers) = mean(tempStorage); %Store the average
medians(numWalkers) = median(tempStorage);
numWalkers, averages
end
matlabpool close
averages
plot(averages)
</syntaxhighlight>
Results
While a single walker takes over a thousand steps to complete the sorting challenge, the addition of even a single walker vastly decreases the completion time, and additional walkers decrease it further, until a critical point is reached where the walkers are more getting in the way than helping with the sorting process. This is visible in the positive slope visible in the diagram at right that starts at around the 20 walker point.