def mynumerator(x): if parent(x) == R: return x return numerator(x) class fastfrac: def __init__(self,top,bot=1): if parent(top) == ZZ or parent(top) == R: self.top = R(top) self.bot = R(bot) elif top.__class__ == fastfrac: self.top = top.top self.bot = top.bot * bot else: self.top = R(numerator(top)) self.bot = R(denominator(top)) * bot def reduce(self): return fastfrac(self.top / self.bot) def sreduce(self): return fastfrac(I.reduce(self.top),I.reduce(self.bot)) def iszero(self): return self.top in I and not (self.bot in I) def isdoublingzero(self): return self.top in J and not (self.bot in J) def __add__(self,other): if parent(other) == ZZ: return fastfrac(self.top + self.bot * other,self.bot) if other.__class__ == fastfrac: return fastfrac(self.top * other.bot + self.bot * other.top,self.bot * other.bot) return NotImplemented def __sub__(self,other): if parent(other) == ZZ: return fastfrac(self.top - self.bot * other,self.bot) if other.__class__ == fastfrac: return fastfrac(self.top * other.bot - self.bot * other.top,self.bot * other.bot) return NotImplemented def __neg__(self): return fastfrac(-self.top,self.bot) def __mul__(self,other): if parent(other) == ZZ: return fastfrac(self.top * other,self.bot) if other.__class__ == fastfrac: return fastfrac(self.top * other.top,self.bot * other.bot) return NotImplemented def __rmul__(self,other): return self.__mul__(other) def __div__(self,other): if parent(other) == ZZ: return fastfrac(self.top,self.bot * other) if other.__class__ == fastfrac: return fastfrac(self.top * other.bot,self.bot * other.top) return NotImplemented def __pow__(self,other): if parent(other) == ZZ: return fastfrac(self.top ^ other,self.bot ^ other) return NotImplemented def isidentity(x): return x.iszero() def isdoublingidentity(x): return x.isdoublingzero() R. = PolynomialRing(QQ,12,order='invlex') I = R.ideal([ mynumerator((us1^2+uc1^2)-(1)) , mynumerator((ua*us1^2+ud1^2)-(1)) , mynumerator((us1)-(uS1/uZ1)) , mynumerator((uc1)-(uC1/uZ1)) , mynumerator((ud1)-(uD1/uZ1)) , mynumerator((ub)-(ua-1)) , mynumerator((ub2)-(2*ub)) , mynumerator((ub3)-(3*ub)) , mynumerator((ubb2)-(2*ub*ub)) ]) ub2 = fastfrac(ub2) ub3 = fastfrac(ub3) ua = fastfrac(ua) ub = fastfrac(ub) ubb2 = fastfrac(ubb2) uc1 = fastfrac(uc1) ud1 = fastfrac(ud1) us1 = fastfrac(us1) uD1 = fastfrac(uD1) uS1 = fastfrac(uS1) uZ1 = fastfrac(uZ1) uC1 = fastfrac(uC1) uE = ((uS1^2)) uF = ((uC1^2)) uG = ((uE^2)) uH = ((uF^2)) uJ = ((uG^2)) uK = ((uH^2)) uL = (((uE+uF)^2-uH-uG)) uM = ((uL^2)) uN = (((uG+uL)^2-uJ-uM)) uP = (((uH+uL)^2-uK-uM)) uR = ((ubb2*uJ)) uQ = ((ub2*uN)) uT = ((ub3*uM)) uU = ((fastfrac(2)*uP)) uV = ((fastfrac(2)*uK)) uW = ((ua*uU)) uY = ((ua*uQ)) uRV = ((uR-uV)) uRQ = ((uR-uQ)) uUV = ((uU+uV)) uTW = ((uT+uW)) uTY = ((uT-uY)) uRQUV = ((uRQ+uUV)) uS3 = ((uS1*(uRV+uTW-fastfrac(2)*uUV))) uC3 = ((uC1*(uRV-uTY+fastfrac(2)*uRQ))) uD3 = ((uD1*(uTW-uRQUV))) uZ3 = ((uZ1*(uTY-uRQUV))) uc2 = (((uc1*uc1-ud1*us1*us1*ud1)/(uc1^2+(ud1*us1)^2))).reduce() ud2 = (((ud1*ud1-ua*us1*uc1*us1*uc1)/(uc1^2+(ud1*us1)^2))).reduce() us2 = (((uc1*us1*ud1+ud1*us1*uc1)/(uc1^2+(ud1*us1)^2))).reduce() uc3 = (((uc2*uc1-ud1*us2*us1*ud2)/(uc2^2+(ud1*us2)^2))).reduce() ud3 = (((ud1*ud2-ua*us1*uc1*us2*uc2)/(uc2^2+(ud1*us2)^2))).reduce() us3 = (((uc2*us1*ud2+ud1*us2*uc1)/(uc2^2+(ud1*us2)^2))).reduce() print isidentity((us3^2+uc3^2)-(fastfrac(1))) print isidentity((ua*us3^2+ud3^2)-(fastfrac(1))) print isidentity((us3)-(uS3/uZ3)) print isidentity((uc3)-(uC3/uZ3)) print isidentity((ud3)-(uD3/uZ3))