I have a question about MATLAB->python code translation. Suppose I have a 2D cell array of function handles (called calib), and now I want to evaluate all of them for a given input (x(3); the functions accept a single scalar parameter) to get a numeric matrix of the same size as a cell array. In MATLAB I'd do cellfun( @(v)v(x(3)), calib). How should I do this in python?
@Dev-iL typical use case for a dispatch dict is something like this: ops = {'+': operator.add, '-': operator.sub, '*': operator.mul, '/': operator.truediv}; res = ops[op_char](*operands)
@flawr it's exactly as slow, unlike real vectorization
@flawr you would not, but most users and most newbies are not you
well I don't think it is necessarily missleading, I think the key problem is that some people get taught (or maybe it is the only thing they remember) that vectorization is needed at all costs and always better but don't understand why or what it actually means.
@AndrasDeak but considering the speed it shouldn't really matter what you use, so why not use the built in np.vectorize() that allows for concise readable way of expressing it? Wouldn't making an own class just reinvent the wheel?
class Calib:
def __init__(self, calib_functions):
self.functions = calib_functions
def __call__(self, *args):
return np.array([[fun(*args) for fun in row] for row in self.functions])
@flawr depends on how often you want to do this operation. If exactly once then yeah, not much point in defining a class for it. If you want to call these functions in multiple places in the code it might make sense. Calibration functions might also have additional state that could be carried by the class, once you have it.
The one I wrote will also work for array-valued inputs (returning 2+ dimensional arrays). I don't know if and how vectorize handles that; I have no intuition about its API.
so suppose I want to pass somewhere a function inside whichcalib is evaluated at some x (where x is a variable and calib is constant), I'd do: new_fun = partial(old_fun, calib=calib), then can call new_fun(x)?
You can only fill positional args from the start. But you can access positional args as kwargs unless you explicitly forbid it.
So if you have def old_fun(arg1, calib, arg2) then you can't do partial(old_fun, calib), only partial(old_fun, fixed_arg1). But you can do partial(old_fun, calib=calib).
argh.... when indexing a 2d array, how do I keep the information that I grabbed a column or a row? It seems that I'm getting those generic "1d" vectors, which messes up my concatenation later on
I think it might be possible to do whatever it does with stack, but stack is a lot newer. And there might be subtleties with multidimensional arrays. I'm not very well versed in these things.
@AnderBiguri come to Zürich, where everyone seems to be able to spare 150.000$ to buy a ridiculously large SUV, doesn't know what a blinking light is, and hates cyclists. Oh, and there's no cycling infrastructure (lanes, let alone separate) to speak of.
The "Zürih autofree" initiative was blocked by the judge for being too radical to people not living in the city (it was envisioned to essentially bar all private cars from entering the city, thus mainly hitting those not living there and driving in every day), but last month the "For better bicycle infrastructure" initiative did pass! That means that they're now going to build 50km of essentially car-free bicycle fast-lanes.
Which IMO is great for everyone. Great for the cyclists, great for the car drivers who don't have to constantly watch out for cyclists, great for people living on the converted roads, since they will be allowed to use their car there, but will have a generally quieter neighbourhood etc
@AnderBiguri hehe, we're often forced to cycle on the pavement at tram stops. Cars can remain (waiting, if necessary) on the tram lane, but cyclists have to, and are fined if they don't, go on the pavement. Which is a pretty big problem and pain in my behind. For my previous flat I had one of those on a large, secondary railway station bridge. There'd be 80 people or more waiting for their tram, and I was forced to somehow cycle between them, rather than follow the cars over the tramway.
And the truly stupid part is that it really only concerns the tram stop. From ~2m before to ~2m after you should cycle on the pavement, otherwise on the street :s
@Dev-iL stack() creates a new dimension (= you need one more index after stacking), while concatenate retains the number of dimensions, and just glues the arguments together along an already existing dimension. If you concatenate two matrices you just get a longer/wider matrix, if you stack two matrices, you get a new dimension: if you index along this new dimension you get your matrices back.
@flawr Is there an established name for the series \sum_{n=1}^\infty 1/n^r? For r>1 it converges (to Riemann's zeta). For r=1 it is the harmonic series (which diverges). Any name for the series with arbitrary r>1? "Generalized harmonic series"?
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or maybe you dirichlet series helps? (s(x) = \sum{n=1}^\infty f(n)/ n^x, where x is complex)
@Dev-iL I just like to think about the shapes: If x.shape = (u,v,w) and we want to insert a new dimension between v and w you just write x[:, :, None, :] (x[:, :, None, :].shape = (u,v,1,w)), it is quite visual
@flawr Sorry, my real question is something else. I have a result R that holds for a function f when f is O(1/n^r) for some r>1. I want to say "R holds whenever f decreases faster than <...>". But I cannot say "faster than 1/n", because 1/(n log n) decays faster than 1/n but it's not O(1/n^r) for any r>1. So, is there a name or a way to compactly say "decreases at least as fast as an inverse power of n with exponent greater than 1"?
@AndrasDeak No, I mean, the function f(n) = 1/n^2 +1/n^3 satisfies the criterion, because it is O(1/n^2). The fucntion f(n) = cos(n)/n (for example) doesn't
I'd like a shorter name for "decays at least as fast as 1/n^r for some r>1"
I feel that this criterion is so common that there should be a name. For example, instead of O(log(n)) you say "logarithmic increase". Instead of O(1/2^n) you say "exponential decay". Etc
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@flawr yea, they are easily skipped. But it's a bit silly to complain about having only 10 minutes, when after 8 mins you go blabbing about unrelated stuff for 2,5 more minutes
@flawr I thought about that, but writing a good question there takes time. I think I'll settle with "decreasing as a power of $n$ with exponent greater than $1$"
Or maybe I should say "decreasing as the inverse of a power of $n$..."