X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=dunshire%2Fgames.py;h=2d6d6dae8d75352e4876954ba0cc2eff454c67f7;hb=7080424243887787b6ff925d611a837e8229ec6e;hp=13c84f88b55824ca1f75630645f732a0e60f74a6;hpb=f3eb81258445fb9cc905f1e06dd7e6d00fbb76fc;p=dunshire.git diff --git a/dunshire/games.py b/dunshire/games.py index 13c84f8..2d6d6da 100644 --- a/dunshire/games.py +++ b/dunshire/games.py @@ -8,7 +8,8 @@ knows how to solve a linear game. from cvxopt import matrix, printing, solvers from .cones import CartesianProduct from .errors import GameUnsolvableException, PoorScalingException -from .matrices import append_col, append_row, condition_number, identity +from .matrices import (append_col, append_row, condition_number, identity, + inner_product) from . import options printing.options['dformat'] = options.FLOAT_FORMAT @@ -345,6 +346,205 @@ class SymmetricLinearGame: self.condition()) + def L(self): + """ + Return the matrix ``L`` passed to the constructor. + + Returns + ------- + + matrix + The matrix that defines this game's :meth:`payoff` operator. + + Examples + -------- + + >>> from dunshire import * + >>> K = NonnegativeOrthant(3) + >>> L = [[1,-5,-15],[-1,2,-3],[-12,-15,1]] + >>> e1 = [1,1,1] + >>> e2 = [1,2,3] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> print(SLG.L()) + [ 1 -5 -15] + [ -1 2 -3] + [-12 -15 1] + + + """ + return self._L + + + def K(self): + """ + Return the cone over which this game is played. + + Returns + ------- + + SymmetricCone + The :class:`SymmetricCone` over which this game is played. + + Examples + -------- + + >>> from dunshire import * + >>> K = NonnegativeOrthant(3) + >>> L = [[1,-5,-15],[-1,2,-3],[-12,-15,1]] + >>> e1 = [1,1,1] + >>> e2 = [1,2,3] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> print(SLG.K()) + Nonnegative orthant in the real 3-space + + """ + return self._K + + + def e1(self): + """ + Return player one's interior point. + + Returns + ------- + + matrix + The point interior to :meth:`K` affiliated with player one. + + Examples + -------- + + >>> from dunshire import * + >>> K = NonnegativeOrthant(3) + >>> L = [[1,-5,-15],[-1,2,-3],[-12,-15,1]] + >>> e1 = [1,1,1] + >>> e2 = [1,2,3] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> print(SLG.e1()) + [ 1] + [ 1] + [ 1] + + + """ + return self._e1 + + + def e2(self): + """ + Return player two's interior point. + + Returns + ------- + + matrix + The point interior to :meth:`K` affiliated with player one. + + Examples + -------- + + >>> from dunshire import * + >>> K = NonnegativeOrthant(3) + >>> L = [[1,-5,-15],[-1,2,-3],[-12,-15,1]] + >>> e1 = [1,1,1] + >>> e2 = [1,2,3] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> print(SLG.e2()) + [ 1] + [ 2] + [ 3] + + + """ + return self._e2 + + + def payoff(self, strategy1, strategy2): + r""" + Return the payoff associated with ``strategy1`` and ``strategy2``. + + The payoff operator takes pairs of strategies to a real + number. For example, if player one's strategy is :math:`x` and + player two's strategy is :math:`y`, then the associated payoff + is :math:`\left\langle L\left(x\right),y \right\rangle` \in + \mathbb{R}. Here, :math:`L` denotes the same linear operator as + :meth:`L`. This method computes the payoff given the two + players' strategies. + + Parameters + ---------- + + strategy1 : matrix + Player one's strategy. + + strategy2 : matrix + Player two's strategy. + + Returns + ------- + + float + The payoff for the game when player one plays ``strategy1`` + and player two plays ``strategy2``. + + Examples + -------- + + The value of the game should be the payoff at the optimal + strategies:: + + >>> from dunshire import * + >>> from dunshire.options import ABS_TOL + >>> K = NonnegativeOrthant(3) + >>> L = [[1,-5,-15],[-1,2,-3],[-12,-15,1]] + >>> e1 = [1,1,1] + >>> e2 = [1,1,1] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> soln = SLG.solution() + >>> x_bar = soln.player1_optimal() + >>> y_bar = soln.player2_optimal() + >>> abs(SLG.payoff(x_bar, y_bar) - soln.game_value()) < ABS_TOL + True + + """ + return inner_product(self.L()*strategy1, strategy2) + + + def dimension(self): + """ + Return the dimension of this game. + + The dimension of a game is not needed for the theory, but it is + useful for the implementation. We define the dimension of a game + to be the dimension of its underlying cone. Or what is the same, + the dimension of the space from which the strategies are chosen. + + Returns + ------- + + int + The dimension of the cone :meth:`K`, or of the space where + this game is played. + + Examples + -------- + + The dimension of a game over the nonnegative quadrant in the + plane should be two (the dimension of the plane):: + + >>> from dunshire import * + >>> K = NonnegativeOrthant(2) + >>> L = [[1,-5],[-1,2]] + >>> e1 = [1,1] + >>> e2 = [1,4] + >>> SLG = SymmetricLinearGame(L, K, e1, e2) + >>> SLG.dimension() + 2 + + """ + return self.K().dimension() + + def _zero(self): """ Return a column of zeros that fits ``K``. @@ -360,7 +560,7 @@ class SymmetricLinearGame: ------- matrix - A ``K.dimension()``-by-``1`` column vector of zeros. + A ``self.dimension()``-by-``1`` column vector of zeros. Examples -------- @@ -378,7 +578,7 @@ class SymmetricLinearGame: """ - return matrix(0, (self._K.dimension(), 1), tc='d') + return matrix(0, (self.dimension(), 1), tc='d') def _A(self): @@ -397,7 +597,7 @@ class SymmetricLinearGame: ------- matrix - A ``1``-by-``(1 + K.dimension())`` row vector. Its first + A ``1``-by-``(1 + self.dimension())`` row vector. Its first entry is zero, and the rest are the entries of ``e2``. Examples @@ -414,7 +614,7 @@ class SymmetricLinearGame: """ - return matrix([0, self._e2], (1, self._K.dimension() + 1), 'd') + return matrix([0, self._e2], (1, self.dimension() + 1), 'd') @@ -434,7 +634,7 @@ class SymmetricLinearGame: ------- matrix - A ``2*K.dimension()``-by-``1 + K.dimension()`` matrix. + A ``2*self.dimension()``-by-``(1 + self.dimension())`` matrix. Examples -------- @@ -455,8 +655,8 @@ class SymmetricLinearGame: """ - I = identity(self._K.dimension()) - return append_row(append_col(self._zero(), -I), + identity_matrix = identity(self.dimension()) + return append_row(append_col(self._zero(), -identity_matrix), append_col(self._e1, -self._L)) @@ -476,7 +676,7 @@ class SymmetricLinearGame: ------- matrix - A ``K.dimension()``-by-``1`` column vector. + A ``self.dimension()``-by-``1`` column vector. Examples -------- @@ -544,7 +744,7 @@ class SymmetricLinearGame: ------- matrix - A ``2*K.dimension()``-by-``1`` column vector of zeros. + A ``2*self.dimension()``-by-``1`` column vector of zeros. Examples -------- @@ -568,13 +768,19 @@ class SymmetricLinearGame: return matrix([self._zero(), self._zero()]) - def _b(self): + + @staticmethod + def _b(): """ Return the ``b`` vector used in our CVXOPT construction. The vector ``b`` appears on the right-hand side of :math:`Ax = b` in the statement of the CVXOPT conelp program. + This method is static because the dimensions and entries of + ``b`` are known beforehand, and don't depend on any other + properties of the game. + .. warning:: It is not safe to cache any of the matrices passed to @@ -667,24 +873,48 @@ class SymmetricLinearGame: >>> norm(s1.player2_optimal() - s2.player2_optimal()) < ABS_TOL True + This game cannot be solved with the default tolerance, but it + can be solved with a weaker one:: + + >>> from dunshire import * + >>> from dunshire.options import ABS_TOL + >>> L = [[ 0.58538005706658102767, 1.53764301129883040886], + ... [-1.34901059721452210027, 1.50121179114155500756]] + >>> K = NonnegativeOrthant(2) + >>> e1 = [1.04537193228494995623, 1.39699624965841895374] + >>> e2 = [0.35326554172108337593, 0.11795703527854853321] + >>> SLG = SymmetricLinearGame(L,K,e1,e2) + >>> print(SLG._try_solution(ABS_TOL / 10)) + Traceback (most recent call last): + ... + dunshire.errors.GameUnsolvableException: Solution failed... + >>> print(SLG._try_solution(ABS_TOL)) + Game value: 9.1100945 + Player 1 optimal: + [-0.0000000] + [ 8.4776631] + Player 2 optimal: + [0.0000000] + [0.7158216] + """ try: - solvers.options['show_progress'] = options.VERBOSE - solvers.options['abs_tol'] = tolerance + opts = {'show_progress': options.VERBOSE, 'abstol': tolerance} soln_dict = solvers.conelp(self._c(), self._G(), self._h(), self._C().cvxopt_dims(), self._A(), - self._b()) - except ValueError as e: - if str(e) == 'math domain error': + self._b(), + options=opts) + except ValueError as error: + if str(error) == 'math domain error': # Oops, CVXOPT tried to take the square root of a # negative number. Report some details about the game # rather than just the underlying CVXOPT crash. raise PoorScalingException(self) else: - raise e + raise error # The optimal strategies are named ``p`` and ``q`` in the # background documentation, and we need to extract them from @@ -695,7 +925,7 @@ class SymmetricLinearGame: p1_value = -soln_dict['primal objective'] p2_value = -soln_dict['dual objective'] p1_optimal = soln_dict['x'][1:] - p2_optimal = soln_dict['z'][self._K.dimension():] + p2_optimal = soln_dict['z'][self.dimension():] # The "status" field contains "optimal" if everything went # according to plan. Other possible values are "primal @@ -798,9 +1028,14 @@ class SymmetricLinearGame: return self._try_solution(options.ABS_TOL / 10) except (PoorScalingException, GameUnsolvableException): - # Ok, that didn't work. Let's try it with the default - # tolerance, and whatever happens, happens. - return self._try_solution(tolerance = options.ABS_TOL) + # Ok, that didn't work. Let's try it with the default tolerance.. + try: + return self._try_solution(options.ABS_TOL / 10) + except (PoorScalingException, GameUnsolvableException) as error: + # Well, that didn't work either. Let's verbosify the matrix + # output format before we allow the exception to be raised. + printing.options['dformat'] = options.DEBUG_FLOAT_FORMAT + raise error def condition(self):