| from operator import gt, lt |
|
|
| from .libmp.backend import xrange |
|
|
| from .functions.functions import SpecialFunctions |
| from .functions.rszeta import RSCache |
| from .calculus.quadrature import QuadratureMethods |
| from .calculus.inverselaplace import LaplaceTransformInversionMethods |
| from .calculus.calculus import CalculusMethods |
| from .calculus.optimization import OptimizationMethods |
| from .calculus.odes import ODEMethods |
| from .matrices.matrices import MatrixMethods |
| from .matrices.calculus import MatrixCalculusMethods |
| from .matrices.linalg import LinearAlgebraMethods |
| from .matrices.eigen import Eigen |
| from .identification import IdentificationMethods |
| from .visualization import VisualizationMethods |
|
|
| from . import libmp |
|
|
| class Context(object): |
| pass |
|
|
| class StandardBaseContext(Context, |
| SpecialFunctions, |
| RSCache, |
| QuadratureMethods, |
| LaplaceTransformInversionMethods, |
| CalculusMethods, |
| MatrixMethods, |
| MatrixCalculusMethods, |
| LinearAlgebraMethods, |
| Eigen, |
| IdentificationMethods, |
| OptimizationMethods, |
| ODEMethods, |
| VisualizationMethods): |
|
|
| NoConvergence = libmp.NoConvergence |
| ComplexResult = libmp.ComplexResult |
|
|
| def __init__(ctx): |
| ctx._aliases = {} |
| |
| SpecialFunctions.__init__(ctx) |
| RSCache.__init__(ctx) |
| QuadratureMethods.__init__(ctx) |
| LaplaceTransformInversionMethods.__init__(ctx) |
| CalculusMethods.__init__(ctx) |
| MatrixMethods.__init__(ctx) |
|
|
| def _init_aliases(ctx): |
| for alias, value in ctx._aliases.items(): |
| try: |
| setattr(ctx, alias, getattr(ctx, value)) |
| except AttributeError: |
| pass |
|
|
| _fixed_precision = False |
|
|
| |
| verbose = False |
|
|
| def warn(ctx, msg): |
| print("Warning:", msg) |
|
|
| def bad_domain(ctx, msg): |
| raise ValueError(msg) |
|
|
| def _re(ctx, x): |
| if hasattr(x, "real"): |
| return x.real |
| return x |
|
|
| def _im(ctx, x): |
| if hasattr(x, "imag"): |
| return x.imag |
| return ctx.zero |
|
|
| def _as_points(ctx, x): |
| return x |
|
|
| def fneg(ctx, x, **kwargs): |
| return -ctx.convert(x) |
|
|
| def fadd(ctx, x, y, **kwargs): |
| return ctx.convert(x)+ctx.convert(y) |
|
|
| def fsub(ctx, x, y, **kwargs): |
| return ctx.convert(x)-ctx.convert(y) |
|
|
| def fmul(ctx, x, y, **kwargs): |
| return ctx.convert(x)*ctx.convert(y) |
|
|
| def fdiv(ctx, x, y, **kwargs): |
| return ctx.convert(x)/ctx.convert(y) |
|
|
| def fsum(ctx, args, absolute=False, squared=False): |
| if absolute: |
| if squared: |
| return sum((abs(x)**2 for x in args), ctx.zero) |
| return sum((abs(x) for x in args), ctx.zero) |
| if squared: |
| return sum((x**2 for x in args), ctx.zero) |
| return sum(args, ctx.zero) |
|
|
| def fdot(ctx, xs, ys=None, conjugate=False): |
| if ys is not None: |
| xs = zip(xs, ys) |
| if conjugate: |
| cf = ctx.conj |
| return sum((x*cf(y) for (x,y) in xs), ctx.zero) |
| else: |
| return sum((x*y for (x,y) in xs), ctx.zero) |
|
|
| def fprod(ctx, args): |
| prod = ctx.one |
| for arg in args: |
| prod *= arg |
| return prod |
|
|
| def nprint(ctx, x, n=6, **kwargs): |
| """ |
| Equivalent to ``print(nstr(x, n))``. |
| """ |
| print(ctx.nstr(x, n, **kwargs)) |
|
|
| def chop(ctx, x, tol=None): |
| """ |
| Chops off small real or imaginary parts, or converts |
| numbers close to zero to exact zeros. The input can be a |
| single number or an iterable:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15; mp.pretty = False |
| >>> chop(5+1e-10j, tol=1e-9) |
| mpf('5.0') |
| >>> nprint(chop([1.0, 1e-20, 3+1e-18j, -4, 2])) |
| [1.0, 0.0, 3.0, -4.0, 2.0] |
| |
| The tolerance defaults to ``100*eps``. |
| """ |
| if tol is None: |
| tol = 100*ctx.eps |
| try: |
| x = ctx.convert(x) |
| absx = abs(x) |
| if abs(x) < tol: |
| return ctx.zero |
| if ctx._is_complex_type(x): |
| |
| part_tol = max(tol, absx*tol) |
| if abs(x.imag) < part_tol: |
| return x.real |
| if abs(x.real) < part_tol: |
| return ctx.mpc(0, x.imag) |
| except TypeError: |
| if isinstance(x, ctx.matrix): |
| return x.apply(lambda a: ctx.chop(a, tol)) |
| if hasattr(x, "__iter__"): |
| return [ctx.chop(a, tol) for a in x] |
| return x |
|
|
| def almosteq(ctx, s, t, rel_eps=None, abs_eps=None): |
| r""" |
| Determine whether the difference between `s` and `t` is smaller |
| than a given epsilon, either relatively or absolutely. |
| |
| Both a maximum relative difference and a maximum difference |
| ('epsilons') may be specified. The absolute difference is |
| defined as `|s-t|` and the relative difference is defined |
| as `|s-t|/\max(|s|, |t|)`. |
| |
| If only one epsilon is given, both are set to the same value. |
| If none is given, both epsilons are set to `2^{-p+m}` where |
| `p` is the current working precision and `m` is a small |
| integer. The default setting typically allows :func:`~mpmath.almosteq` |
| to be used to check for mathematical equality |
| in the presence of small rounding errors. |
| |
| **Examples** |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15 |
| >>> almosteq(3.141592653589793, 3.141592653589790) |
| True |
| >>> almosteq(3.141592653589793, 3.141592653589700) |
| False |
| >>> almosteq(3.141592653589793, 3.141592653589700, 1e-10) |
| True |
| >>> almosteq(1e-20, 2e-20) |
| True |
| >>> almosteq(1e-20, 2e-20, rel_eps=0, abs_eps=0) |
| False |
| |
| """ |
| t = ctx.convert(t) |
| if abs_eps is None and rel_eps is None: |
| rel_eps = abs_eps = ctx.ldexp(1, -ctx.prec+4) |
| if abs_eps is None: |
| abs_eps = rel_eps |
| elif rel_eps is None: |
| rel_eps = abs_eps |
| diff = abs(s-t) |
| if diff <= abs_eps: |
| return True |
| abss = abs(s) |
| abst = abs(t) |
| if abss < abst: |
| err = diff/abst |
| else: |
| err = diff/abss |
| return err <= rel_eps |
|
|
| def arange(ctx, *args): |
| r""" |
| This is a generalized version of Python's :func:`~mpmath.range` function |
| that accepts fractional endpoints and step sizes and |
| returns a list of ``mpf`` instances. Like :func:`~mpmath.range`, |
| :func:`~mpmath.arange` can be called with 1, 2 or 3 arguments: |
| |
| ``arange(b)`` |
| `[0, 1, 2, \ldots, x]` |
| ``arange(a, b)`` |
| `[a, a+1, a+2, \ldots, x]` |
| ``arange(a, b, h)`` |
| `[a, a+h, a+h, \ldots, x]` |
| |
| where `b-1 \le x < b` (in the third case, `b-h \le x < b`). |
| |
| Like Python's :func:`~mpmath.range`, the endpoint is not included. To |
| produce ranges where the endpoint is included, :func:`~mpmath.linspace` |
| is more convenient. |
| |
| **Examples** |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15; mp.pretty = False |
| >>> arange(4) |
| [mpf('0.0'), mpf('1.0'), mpf('2.0'), mpf('3.0')] |
| >>> arange(1, 2, 0.25) |
| [mpf('1.0'), mpf('1.25'), mpf('1.5'), mpf('1.75')] |
| >>> arange(1, -1, -0.75) |
| [mpf('1.0'), mpf('0.25'), mpf('-0.5')] |
| |
| """ |
| if not len(args) <= 3: |
| raise TypeError('arange expected at most 3 arguments, got %i' |
| % len(args)) |
| if not len(args) >= 1: |
| raise TypeError('arange expected at least 1 argument, got %i' |
| % len(args)) |
| |
| a = 0 |
| dt = 1 |
| |
| if len(args) == 1: |
| b = args[0] |
| elif len(args) >= 2: |
| a = args[0] |
| b = args[1] |
| if len(args) == 3: |
| dt = args[2] |
| a, b, dt = ctx.mpf(a), ctx.mpf(b), ctx.mpf(dt) |
| assert a + dt != a, 'dt is too small and would cause an infinite loop' |
| |
| if a > b: |
| if dt > 0: |
| return [] |
| op = gt |
| else: |
| if dt < 0: |
| return [] |
| op = lt |
| |
| result = [] |
| i = 0 |
| t = a |
| while 1: |
| t = a + dt*i |
| i += 1 |
| if op(t, b): |
| result.append(t) |
| else: |
| break |
| return result |
|
|
| def linspace(ctx, *args, **kwargs): |
| """ |
| ``linspace(a, b, n)`` returns a list of `n` evenly spaced |
| samples from `a` to `b`. The syntax ``linspace(mpi(a,b), n)`` |
| is also valid. |
| |
| This function is often more convenient than :func:`~mpmath.arange` |
| for partitioning an interval into subintervals, since |
| the endpoint is included:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15; mp.pretty = False |
| >>> linspace(1, 4, 4) |
| [mpf('1.0'), mpf('2.0'), mpf('3.0'), mpf('4.0')] |
| |
| You may also provide the keyword argument ``endpoint=False``:: |
| |
| >>> linspace(1, 4, 4, endpoint=False) |
| [mpf('1.0'), mpf('1.75'), mpf('2.5'), mpf('3.25')] |
| |
| """ |
| if len(args) == 3: |
| a = ctx.mpf(args[0]) |
| b = ctx.mpf(args[1]) |
| n = int(args[2]) |
| elif len(args) == 2: |
| assert hasattr(args[0], '_mpi_') |
| a = args[0].a |
| b = args[0].b |
| n = int(args[1]) |
| else: |
| raise TypeError('linspace expected 2 or 3 arguments, got %i' \ |
| % len(args)) |
| if n < 1: |
| raise ValueError('n must be greater than 0') |
| if not 'endpoint' in kwargs or kwargs['endpoint']: |
| if n == 1: |
| return [ctx.mpf(a)] |
| step = (b - a) / ctx.mpf(n - 1) |
| y = [i*step + a for i in xrange(n)] |
| y[-1] = b |
| else: |
| step = (b - a) / ctx.mpf(n) |
| y = [i*step + a for i in xrange(n)] |
| return y |
|
|
| def cos_sin(ctx, z, **kwargs): |
| return ctx.cos(z, **kwargs), ctx.sin(z, **kwargs) |
|
|
| def cospi_sinpi(ctx, z, **kwargs): |
| return ctx.cospi(z, **kwargs), ctx.sinpi(z, **kwargs) |
|
|
| def _default_hyper_maxprec(ctx, p): |
| return int(1000 * p**0.25 + 4*p) |
|
|
| _gcd = staticmethod(libmp.gcd) |
| list_primes = staticmethod(libmp.list_primes) |
| isprime = staticmethod(libmp.isprime) |
| bernfrac = staticmethod(libmp.bernfrac) |
| moebius = staticmethod(libmp.moebius) |
| _ifac = staticmethod(libmp.ifac) |
| _eulernum = staticmethod(libmp.eulernum) |
| _stirling1 = staticmethod(libmp.stirling1) |
| _stirling2 = staticmethod(libmp.stirling2) |
|
|
| def sum_accurately(ctx, terms, check_step=1): |
| prec = ctx.prec |
| try: |
| extraprec = 10 |
| while 1: |
| ctx.prec = prec + extraprec + 5 |
| max_mag = ctx.ninf |
| s = ctx.zero |
| k = 0 |
| for term in terms(): |
| s += term |
| if (not k % check_step) and term: |
| term_mag = ctx.mag(term) |
| max_mag = max(max_mag, term_mag) |
| sum_mag = ctx.mag(s) |
| if sum_mag - term_mag > ctx.prec: |
| break |
| k += 1 |
| cancellation = max_mag - sum_mag |
| if cancellation != cancellation: |
| break |
| if cancellation < extraprec or ctx._fixed_precision: |
| break |
| extraprec += min(ctx.prec, cancellation) |
| return s |
| finally: |
| ctx.prec = prec |
|
|
| def mul_accurately(ctx, factors, check_step=1): |
| prec = ctx.prec |
| try: |
| extraprec = 10 |
| while 1: |
| ctx.prec = prec + extraprec + 5 |
| max_mag = ctx.ninf |
| one = ctx.one |
| s = one |
| k = 0 |
| for factor in factors(): |
| s *= factor |
| term = factor - one |
| if (not k % check_step): |
| term_mag = ctx.mag(term) |
| max_mag = max(max_mag, term_mag) |
| sum_mag = ctx.mag(s-one) |
| |
| |
| if -term_mag > ctx.prec: |
| break |
| k += 1 |
| cancellation = max_mag - sum_mag |
| if cancellation != cancellation: |
| break |
| if cancellation < extraprec or ctx._fixed_precision: |
| break |
| extraprec += min(ctx.prec, cancellation) |
| return s |
| finally: |
| ctx.prec = prec |
|
|
| def power(ctx, x, y): |
| r"""Converts `x` and `y` to mpmath numbers and evaluates |
| `x^y = \exp(y \log(x))`:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 30; mp.pretty = True |
| >>> power(2, 0.5) |
| 1.41421356237309504880168872421 |
| |
| This shows the leading few digits of a large Mersenne prime |
| (performing the exact calculation ``2**43112609-1`` and |
| displaying the result in Python would be very slow):: |
| |
| >>> power(2, 43112609)-1 |
| 3.16470269330255923143453723949e+12978188 |
| """ |
| return ctx.convert(x) ** ctx.convert(y) |
|
|
| def _zeta_int(ctx, n): |
| return ctx.zeta(n) |
|
|
| def maxcalls(ctx, f, N): |
| """ |
| Return a wrapped copy of *f* that raises ``NoConvergence`` when *f* |
| has been called more than *N* times:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15 |
| >>> f = maxcalls(sin, 10) |
| >>> print(sum(f(n) for n in range(10))) |
| 1.95520948210738 |
| >>> f(10) # doctest: +IGNORE_EXCEPTION_DETAIL |
| Traceback (most recent call last): |
| ... |
| NoConvergence: maxcalls: function evaluated 10 times |
| |
| """ |
| counter = [0] |
| def f_maxcalls_wrapped(*args, **kwargs): |
| counter[0] += 1 |
| if counter[0] > N: |
| raise ctx.NoConvergence("maxcalls: function evaluated %i times" % N) |
| return f(*args, **kwargs) |
| return f_maxcalls_wrapped |
|
|
| def memoize(ctx, f): |
| """ |
| Return a wrapped copy of *f* that caches computed values, i.e. |
| a memoized copy of *f*. Values are only reused if the cached precision |
| is equal to or higher than the working precision:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 15; mp.pretty = True |
| >>> f = memoize(maxcalls(sin, 1)) |
| >>> f(2) |
| 0.909297426825682 |
| >>> f(2) |
| 0.909297426825682 |
| >>> mp.dps = 25 |
| >>> f(2) # doctest: +IGNORE_EXCEPTION_DETAIL |
| Traceback (most recent call last): |
| ... |
| NoConvergence: maxcalls: function evaluated 1 times |
| |
| """ |
| f_cache = {} |
| def f_cached(*args, **kwargs): |
| if kwargs: |
| key = args, tuple(kwargs.items()) |
| else: |
| key = args |
| prec = ctx.prec |
| if key in f_cache: |
| cprec, cvalue = f_cache[key] |
| if cprec >= prec: |
| return +cvalue |
| value = f(*args, **kwargs) |
| f_cache[key] = (prec, value) |
| return value |
| f_cached.__name__ = f.__name__ |
| f_cached.__doc__ = f.__doc__ |
| return f_cached |
|
|
