# Smart way to implement lookup in high-perf FORTRAN code

I'm writing a simulation in FORTRAN 77, in which I need to get a parameter value from some experimental data. The data comes from an internet database, so I have downloaded it in advance, but there is no simple mathematical model that can be used to provide values on a continous scale - I only have discrete data points. However, I will need to know this parameter for any value on the x axis, and not only the discrete ones I have from the database.

To simplify, you could say that I know the value of `f(x)` for all integer values of `x`, and need a way to find `f(x)` for any real `x` value (never outside the smallest or largest `x` I have knowledge of).

My idea was to take the data and make a linear interpolation, to be able to fetch a parameter value; in pseudo-code:

``````double xd = largest_data_x_lower_than(x)

double slope = (f(xd+dx)-f(xd))/dx // dx is the distance between two x values
double xtra = x-xd

double fofx = f(xd)+slope*xtra
``````

To implement this, I need some kind of lookup for the data points. I could make the lookup for `xd` easy by getting values from the database for all integer `x`, so that `xd = int(x)` and `dx = 1`, but I still have no idea how to implement the lookup for `f(xd)`.

What would be a good way to implement this?

The value will be fetched something like 10^7 to 10^9 times during one simulation run, so performance is critical. In other words, reading from IO each time I need a value for `f(xd)` is not an option.

I currently have the data points in a text file with one pair of (tab-delimited) `x,f(x)` on each line, so bonus points for a solution that also provides a smooth way of getting the data from there into whatever shape it needs to be.

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You say that that you have the values for all integers. Do you have pairs `i, f(i)` for all integers `i` from `M` to `N`? Then read the values `f(i)` into an array `y` dimensioned `M:N`. Unless the number of values is HUGE. For real values between `M` and `N` it is easy to index into the array and interpolate between the nearest pair of values.

And why use FORTRAN 77? Fortran 90/95/2003 have been with us for some years now...

EDIT: Answering question in the comment, re how to read the data values only once, in FORTRAN 77, without having to pass them as an argument in a long chain of calls. Technique 1: on program startup, read them into the array, which is in a named common block. Technique 2: the first time the function that returns `f(x)` is called, read the values into a local variable that is also on a `SAVE` statement. Use a logical which is SAVEd to designate whether or not the function is on its first call or not. Generally I'd prefer technique 2 as being more "local", but its not thread safe. If you are the doing simulation in parallel, the first technique could be done in a startup phase, before the program goes multi-threaded.

Here is an example of the use of `SAVE`: fortran SAVE statement. (In Fortran 95 notation ... convert to FORTRAN 77). Put the read of the data into the array in the `IF` block.

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FORTRAN 77 is imposed on me by the group I'm working in. It's a temporary position, so I've decided the gain of forcing the group to move on is smaller than just learning :P How do I read the values into memory only once, without having to pass the arrays around all the time? This lookup is quite a way down the stack - if possible I'd like to avoid having to add an extra couple of function arguments in four or five places... –  Tomas Lycken Apr 6 '13 at 1:21
It is in parallel, using MPI - in other words, I run the program in a number of separate processes (but I don't do any thread-branching within the processes). I think the common block will be the best solution, to ensure that I can read the file in a safe way - I'll try it out tomorrow and see if I can get it to work. –  Tomas Lycken Apr 7 '13 at 21:19
OK; I now have decided on an approach that will work, thread-safely, in my parallel environment. I'll read in the file and create an interpolation with fine-enough x resolution in the master thread, and then broadcast that thread to all other threads. The vector will reside in a common-block, to avoid passing it around as an argument. If I run into problems with this, it's probably not related to the choice of approach, but rather to me being a clumsy programmer, so I'll see this as resolved now. Thanks for the help! –  Tomas Lycken Apr 8 '13 at 16:42
Are you confusing "linear interpolation" with "linear fit"? The data is nowhere near linear, so a linear fit is out of the question, but if I could find a good way to look up the two data points closest to a given x value, a linear interpolation between them is just fine. (I can make sure that the data is dense enough in x-space for that.) Both `x` and `f(x)` are scalars, so a matrix with all x-values and all function values would be 2-by-N, where N is the number of data points. –  Tomas Lycken Apr 5 '13 at 23:05
Using your database (file), you could create an array `fvals` with `fvals(ii)` being the function `f(xmin + (ii-1) * dx)`. The mapping between x-value `xx` and your array index is `ii = floor((xx - xmin) / dx) + 1`. Once you know `ii`, you can use the points around it for interpolation: Either doing linear interpolation using `ii` and `ii+1` or some higher order polynomial interpolation. For latter, you could use the corresponding polint routine from Numerical Recipes. See page 103.