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240 lines
7.3 KiB
240 lines
7.3 KiB
5 months ago
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"""The commutator: [A,B] = A*B - B*A."""
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from sympy.core.add import Add
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from sympy.core.expr import Expr
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from sympy.core.mul import Mul
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from sympy.core.power import Pow
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from sympy.core.singleton import S
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from sympy.printing.pretty.stringpict import prettyForm
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from sympy.physics.quantum.dagger import Dagger
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from sympy.physics.quantum.operator import Operator
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__all__ = [
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'Commutator'
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]
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#-----------------------------------------------------------------------------
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# Commutator
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#-----------------------------------------------------------------------------
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class Commutator(Expr):
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"""The standard commutator, in an unevaluated state.
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Explanation
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===========
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Evaluating a commutator is defined [1]_ as: ``[A, B] = A*B - B*A``. This
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class returns the commutator in an unevaluated form. To evaluate the
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commutator, use the ``.doit()`` method.
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Canonical ordering of a commutator is ``[A, B]`` for ``A < B``. The
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arguments of the commutator are put into canonical order using ``__cmp__``.
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If ``B < A``, then ``[B, A]`` is returned as ``-[A, B]``.
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Parameters
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==========
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A : Expr
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The first argument of the commutator [A,B].
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B : Expr
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The second argument of the commutator [A,B].
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Examples
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========
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>>> from sympy.physics.quantum import Commutator, Dagger, Operator
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>>> from sympy.abc import x, y
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>>> A = Operator('A')
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>>> B = Operator('B')
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>>> C = Operator('C')
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Create a commutator and use ``.doit()`` to evaluate it:
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>>> comm = Commutator(A, B)
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>>> comm
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[A,B]
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>>> comm.doit()
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A*B - B*A
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The commutator orders it arguments in canonical order:
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>>> comm = Commutator(B, A); comm
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-[A,B]
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Commutative constants are factored out:
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>>> Commutator(3*x*A, x*y*B)
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3*x**2*y*[A,B]
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Using ``.expand(commutator=True)``, the standard commutator expansion rules
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can be applied:
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>>> Commutator(A+B, C).expand(commutator=True)
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[A,C] + [B,C]
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>>> Commutator(A, B+C).expand(commutator=True)
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[A,B] + [A,C]
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>>> Commutator(A*B, C).expand(commutator=True)
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[A,C]*B + A*[B,C]
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>>> Commutator(A, B*C).expand(commutator=True)
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[A,B]*C + B*[A,C]
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Adjoint operations applied to the commutator are properly applied to the
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arguments:
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>>> Dagger(Commutator(A, B))
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-[Dagger(A),Dagger(B)]
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References
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==========
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.. [1] https://en.wikipedia.org/wiki/Commutator
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"""
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is_commutative = False
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def __new__(cls, A, B):
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r = cls.eval(A, B)
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if r is not None:
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return r
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obj = Expr.__new__(cls, A, B)
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return obj
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@classmethod
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def eval(cls, a, b):
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if not (a and b):
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return S.Zero
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if a == b:
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return S.Zero
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if a.is_commutative or b.is_commutative:
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return S.Zero
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# [xA,yB] -> xy*[A,B]
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ca, nca = a.args_cnc()
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cb, ncb = b.args_cnc()
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c_part = ca + cb
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if c_part:
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return Mul(Mul(*c_part), cls(Mul._from_args(nca), Mul._from_args(ncb)))
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# Canonical ordering of arguments
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# The Commutator [A, B] is in canonical form if A < B.
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if a.compare(b) == 1:
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return S.NegativeOne*cls(b, a)
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def _expand_pow(self, A, B, sign):
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exp = A.exp
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if not exp.is_integer or not exp.is_constant() or abs(exp) <= 1:
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# nothing to do
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return self
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base = A.base
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if exp.is_negative:
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base = A.base**-1
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exp = -exp
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comm = Commutator(base, B).expand(commutator=True)
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result = base**(exp - 1) * comm
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for i in range(1, exp):
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result += base**(exp - 1 - i) * comm * base**i
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return sign*result.expand()
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def _eval_expand_commutator(self, **hints):
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A = self.args[0]
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B = self.args[1]
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if isinstance(A, Add):
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# [A + B, C] -> [A, C] + [B, C]
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sargs = []
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for term in A.args:
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comm = Commutator(term, B)
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if isinstance(comm, Commutator):
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comm = comm._eval_expand_commutator()
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sargs.append(comm)
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return Add(*sargs)
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elif isinstance(B, Add):
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# [A, B + C] -> [A, B] + [A, C]
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sargs = []
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for term in B.args:
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comm = Commutator(A, term)
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if isinstance(comm, Commutator):
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comm = comm._eval_expand_commutator()
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sargs.append(comm)
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return Add(*sargs)
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elif isinstance(A, Mul):
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# [A*B, C] -> A*[B, C] + [A, C]*B
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a = A.args[0]
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b = Mul(*A.args[1:])
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c = B
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comm1 = Commutator(b, c)
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comm2 = Commutator(a, c)
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if isinstance(comm1, Commutator):
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comm1 = comm1._eval_expand_commutator()
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if isinstance(comm2, Commutator):
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comm2 = comm2._eval_expand_commutator()
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first = Mul(a, comm1)
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second = Mul(comm2, b)
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return Add(first, second)
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elif isinstance(B, Mul):
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# [A, B*C] -> [A, B]*C + B*[A, C]
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a = A
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b = B.args[0]
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c = Mul(*B.args[1:])
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comm1 = Commutator(a, b)
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comm2 = Commutator(a, c)
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if isinstance(comm1, Commutator):
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comm1 = comm1._eval_expand_commutator()
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if isinstance(comm2, Commutator):
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comm2 = comm2._eval_expand_commutator()
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first = Mul(comm1, c)
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second = Mul(b, comm2)
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return Add(first, second)
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elif isinstance(A, Pow):
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# [A**n, C] -> A**(n - 1)*[A, C] + A**(n - 2)*[A, C]*A + ... + [A, C]*A**(n-1)
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return self._expand_pow(A, B, 1)
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elif isinstance(B, Pow):
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# [A, C**n] -> C**(n - 1)*[C, A] + C**(n - 2)*[C, A]*C + ... + [C, A]*C**(n-1)
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return self._expand_pow(B, A, -1)
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# No changes, so return self
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return self
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def doit(self, **hints):
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""" Evaluate commutator """
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A = self.args[0]
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B = self.args[1]
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if isinstance(A, Operator) and isinstance(B, Operator):
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try:
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comm = A._eval_commutator(B, **hints)
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except NotImplementedError:
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try:
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comm = -1*B._eval_commutator(A, **hints)
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except NotImplementedError:
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comm = None
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if comm is not None:
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return comm.doit(**hints)
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return (A*B - B*A).doit(**hints)
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def _eval_adjoint(self):
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return Commutator(Dagger(self.args[1]), Dagger(self.args[0]))
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def _sympyrepr(self, printer, *args):
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return "%s(%s,%s)" % (
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self.__class__.__name__, printer._print(
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self.args[0]), printer._print(self.args[1])
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)
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def _sympystr(self, printer, *args):
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return "[%s,%s]" % (
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printer._print(self.args[0]), printer._print(self.args[1]))
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def _pretty(self, printer, *args):
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pform = printer._print(self.args[0], *args)
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pform = prettyForm(*pform.right(prettyForm(',')))
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pform = prettyForm(*pform.right(printer._print(self.args[1], *args)))
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pform = prettyForm(*pform.parens(left='[', right=']'))
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return pform
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def _latex(self, printer, *args):
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return "\\left[%s,%s\\right]" % tuple([
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printer._print(arg, *args) for arg in self.args])
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