| | """Utility functions for classifying and solving |
| | ordinary and partial differential equations. |
| | |
| | Contains |
| | ======== |
| | _preprocess |
| | ode_order |
| | _desolve |
| | |
| | """ |
| | from sympy.core import Pow |
| | from sympy.core.function import Derivative, AppliedUndef |
| | from sympy.core.relational import Equality |
| | from sympy.core.symbol import Wild |
| |
|
| | def _preprocess(expr, func=None, hint='_Integral'): |
| | """Prepare expr for solving by making sure that differentiation |
| | is done so that only func remains in unevaluated derivatives and |
| | (if hint does not end with _Integral) that doit is applied to all |
| | other derivatives. If hint is None, do not do any differentiation. |
| | (Currently this may cause some simple differential equations to |
| | fail.) |
| | |
| | In case func is None, an attempt will be made to autodetect the |
| | function to be solved for. |
| | |
| | >>> from sympy.solvers.deutils import _preprocess |
| | >>> from sympy import Derivative, Function |
| | >>> from sympy.abc import x, y, z |
| | >>> f, g = map(Function, 'fg') |
| | |
| | If f(x)**p == 0 and p>0 then we can solve for f(x)=0 |
| | >>> _preprocess((f(x).diff(x)-4)**5, f(x)) |
| | (Derivative(f(x), x) - 4, f(x)) |
| | |
| | Apply doit to derivatives that contain more than the function |
| | of interest: |
| | |
| | >>> _preprocess(Derivative(f(x) + x, x)) |
| | (Derivative(f(x), x) + 1, f(x)) |
| | |
| | Do others if the differentiation variable(s) intersect with those |
| | of the function of interest or contain the function of interest: |
| | |
| | >>> _preprocess(Derivative(g(x), y, z), f(y)) |
| | (0, f(y)) |
| | >>> _preprocess(Derivative(f(y), z), f(y)) |
| | (0, f(y)) |
| | |
| | Do others if the hint does not end in '_Integral' (the default |
| | assumes that it does): |
| | |
| | >>> _preprocess(Derivative(g(x), y), f(x)) |
| | (Derivative(g(x), y), f(x)) |
| | >>> _preprocess(Derivative(f(x), y), f(x), hint='') |
| | (0, f(x)) |
| | |
| | Do not do any derivatives if hint is None: |
| | |
| | >>> eq = Derivative(f(x) + 1, x) + Derivative(f(x), y) |
| | >>> _preprocess(eq, f(x), hint=None) |
| | (Derivative(f(x) + 1, x) + Derivative(f(x), y), f(x)) |
| | |
| | If it's not clear what the function of interest is, it must be given: |
| | |
| | >>> eq = Derivative(f(x) + g(x), x) |
| | >>> _preprocess(eq, g(x)) |
| | (Derivative(f(x), x) + Derivative(g(x), x), g(x)) |
| | >>> try: _preprocess(eq) |
| | ... except ValueError: print("A ValueError was raised.") |
| | A ValueError was raised. |
| | |
| | """ |
| | if isinstance(expr, Pow): |
| | |
| | if (expr.exp).is_positive: |
| | expr = expr.base |
| | derivs = expr.atoms(Derivative) |
| | if not func: |
| | funcs = set().union(*[d.atoms(AppliedUndef) for d in derivs]) |
| | if len(funcs) != 1: |
| | raise ValueError('The function cannot be ' |
| | 'automatically detected for %s.' % expr) |
| | func = funcs.pop() |
| | fvars = set(func.args) |
| | if hint is None: |
| | return expr, func |
| | reps = [(d, d.doit()) for d in derivs if not hint.endswith('_Integral') or |
| | d.has(func) or set(d.variables) & fvars] |
| | eq = expr.subs(reps) |
| | return eq, func |
| |
|
| |
|
| | def ode_order(expr, func): |
| | """ |
| | Returns the order of a given differential |
| | equation with respect to func. |
| | |
| | This function is implemented recursively. |
| | |
| | Examples |
| | ======== |
| | |
| | >>> from sympy import Function |
| | >>> from sympy.solvers.deutils import ode_order |
| | >>> from sympy.abc import x |
| | >>> f, g = map(Function, ['f', 'g']) |
| | >>> ode_order(f(x).diff(x, 2) + f(x).diff(x)**2 + |
| | ... f(x).diff(x), f(x)) |
| | 2 |
| | >>> ode_order(f(x).diff(x, 2) + g(x).diff(x, 3), f(x)) |
| | 2 |
| | >>> ode_order(f(x).diff(x, 2) + g(x).diff(x, 3), g(x)) |
| | 3 |
| | |
| | """ |
| | a = Wild('a', exclude=[func]) |
| | if expr.match(a): |
| | return 0 |
| |
|
| | if isinstance(expr, Derivative): |
| | if expr.args[0] == func: |
| | return len(expr.variables) |
| | else: |
| | args = expr.args[0].args |
| | rv = len(expr.variables) |
| | if args: |
| | rv += max(ode_order(_, func) for _ in args) |
| | return rv |
| | else: |
| | return max(ode_order(_, func) for _ in expr.args) if expr.args else 0 |
| |
|
| |
|
| | def _desolve(eq, func=None, hint="default", ics=None, simplify=True, *, prep=True, **kwargs): |
| | """This is a helper function to dsolve and pdsolve in the ode |
| | and pde modules. |
| | |
| | If the hint provided to the function is "default", then a dict with |
| | the following keys are returned |
| | |
| | 'func' - It provides the function for which the differential equation |
| | has to be solved. This is useful when the expression has |
| | more than one function in it. |
| | |
| | 'default' - The default key as returned by classifier functions in ode |
| | and pde.py |
| | |
| | 'hint' - The hint given by the user for which the differential equation |
| | is to be solved. If the hint given by the user is 'default', |
| | then the value of 'hint' and 'default' is the same. |
| | |
| | 'order' - The order of the function as returned by ode_order |
| | |
| | 'match' - It returns the match as given by the classifier functions, for |
| | the default hint. |
| | |
| | If the hint provided to the function is not "default" and is not in |
| | ('all', 'all_Integral', 'best'), then a dict with the above mentioned keys |
| | is returned along with the keys which are returned when dict in |
| | classify_ode or classify_pde is set True |
| | |
| | If the hint given is in ('all', 'all_Integral', 'best'), then this function |
| | returns a nested dict, with the keys, being the set of classified hints |
| | returned by classifier functions, and the values being the dict of form |
| | as mentioned above. |
| | |
| | Key 'eq' is a common key to all the above mentioned hints which returns an |
| | expression if eq given by user is an Equality. |
| | |
| | See Also |
| | ======== |
| | classify_ode(ode.py) |
| | classify_pde(pde.py) |
| | """ |
| | if isinstance(eq, Equality): |
| | eq = eq.lhs - eq.rhs |
| |
|
| | |
| | if prep or func is None: |
| | eq, func = _preprocess(eq, func) |
| | prep = False |
| |
|
| | |
| | |
| | |
| | |
| | type = kwargs.get('type', None) |
| | xi = kwargs.get('xi') |
| | eta = kwargs.get('eta') |
| | x0 = kwargs.get('x0', 0) |
| | terms = kwargs.get('n') |
| |
|
| | if type == 'ode': |
| | from sympy.solvers.ode import classify_ode, allhints |
| | classifier = classify_ode |
| | string = 'ODE ' |
| | dummy = '' |
| |
|
| | elif type == 'pde': |
| | from sympy.solvers.pde import classify_pde, allhints |
| | classifier = classify_pde |
| | string = 'PDE ' |
| | dummy = 'p' |
| |
|
| | |
| | |
| | |
| | if kwargs.get('classify', True): |
| | hints = classifier(eq, func, dict=True, ics=ics, xi=xi, eta=eta, |
| | n=terms, x0=x0, hint=hint, prep=prep) |
| |
|
| | else: |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | |
| | hints = kwargs.get('hint', |
| | {'default': hint, |
| | hint: kwargs['match'], |
| | 'order': kwargs['order']}) |
| | if not hints['default']: |
| | |
| | if hint not in allhints and hint != 'default': |
| | raise ValueError("Hint not recognized: " + hint) |
| | elif hint not in hints['ordered_hints'] and hint != 'default': |
| | raise ValueError(string + str(eq) + " does not match hint " + hint) |
| | |
| | |
| | elif hints['order'] == 0: |
| | raise ValueError( |
| | str(eq) + " is not a solvable differential equation in " + str(func)) |
| | else: |
| | raise NotImplementedError(dummy + "solve" + ": Cannot solve " + str(eq)) |
| | if hint == 'default': |
| | return _desolve(eq, func, ics=ics, hint=hints['default'], simplify=simplify, |
| | prep=prep, x0=x0, classify=False, order=hints['order'], |
| | match=hints[hints['default']], xi=xi, eta=eta, n=terms, type=type) |
| | elif hint in ('all', 'all_Integral', 'best'): |
| | retdict = {} |
| | gethints = set(hints) - {'order', 'default', 'ordered_hints'} |
| | if hint == 'all_Integral': |
| | for i in hints: |
| | if i.endswith('_Integral'): |
| | gethints.remove(i[:-len('_Integral')]) |
| | |
| | for k in ["1st_homogeneous_coeff_best", "1st_power_series", |
| | "lie_group", "2nd_power_series_ordinary", "2nd_power_series_regular"]: |
| | if k in gethints: |
| | gethints.remove(k) |
| | for i in gethints: |
| | sol = _desolve(eq, func, ics=ics, hint=i, x0=x0, simplify=simplify, prep=prep, |
| | classify=False, n=terms, order=hints['order'], match=hints[i], type=type) |
| | retdict[i] = sol |
| | retdict['all'] = True |
| | retdict['eq'] = eq |
| | return retdict |
| | elif hint not in allhints: |
| | raise ValueError("Hint not recognized: " + hint) |
| | elif hint not in hints: |
| | raise ValueError(string + str(eq) + " does not match hint " + hint) |
| | else: |
| | |
| | hints['hint'] = hint |
| | hints.update({'func': func, 'eq': eq}) |
| | return hints |
| |
|
