Help file for CONLAW versions 1,2,3 ___________________________________ Thomas Wolf, Oct. 1997 Purpose: -------- The procedures CONLAW1, CONLAW2, CONLAW3 try to find conservation laws for a given single/system of differential equation(s) (ODEs or PDEs) df(ui,...) = wi(x,uj,...,df(uj,...),...) (1) CONLAW1 tries to find the conserved current p_i by solving df(p_t,t) + df(p_x,x) [+ ...] = 0 modulo (1) (2) directly. CONLAW2 tries to solve determining equations for characteristic functions q_i such that df(p_t,t) + df(p_x,x) [+ ...] = sum_i q_i*( df(ui,...) - wi ) (3) holds. CONLAW3 tries to find p_i and q_j by solving (3) directly. All three procedures have the same syntax. They have two parameters, both are lists. The first parameter specifies the equations (1), the second specifies the computation to be done. One can either specify an ansatz for p_i, q_j or investigate a general situation, only specifying the order of the characteristic functions or the conserved current. For a more detailed description see the file conlaw.tex. Syntax: ------- CONLAWi(problem,runmode); where i=1,2,3 problem ~ {equations, ulist, txlist} equations ... list of equations, each has the form df(ui,..) = ... where the LHS (left hand side) df(ui,..) is selected such that - The RHS (right h.s.) of an equations must not include the derivative on the LHS nor a derivative of it. - The LHS of any equation must not occur in any other equation nor any derivative of the LHS. - Each of the unknown functions occurs on the LHS of exactly one equation ulist ... list of function names, which can be chosen freely txlist ... list of variable names, which can be chosen freely runmode ~ {mindensord, maxdensord, expl, flist, inequ} mindensord ... the minimum of the highest order of derivatives in u in p_x1 for CONLAW1 in q_j for CONLAW2,CONLAW3 maxdensord ... the maximum of the highest order of derivatives in u in p_x1 for CONLAW1 in q_j for CONLAW2,CONLAW3 expl ... (t/nil) whether or not the charac. functions q_i or conserved current may depend explicitly on the variables of txlist flist ... unknown functions in any expressions p_i, q_j which have been assigned before calling CONLAW in order to investigate a special ansatz for the p_i or q_j, also all parameters and parametric functions in the equation that are to be calculated such that conservation laws exist, if there are no such unknown functions then input the empty list: {} inequ ... inequ is a list of expressions non of which may be identically zero for the conservation law to be found, if there is no such expression then input an empty list: {} How to formulate an ansatz: --------------------------- An ansatz for a conservation law can be formulated by specifying one or more of the functions p_i for CONLAW1, one or more of the functions q_i for CONLAW2, one or more of p_i,q_i for CONLAW3. The `i' in p_i stands for a variable name, the `i' in q_i stands for an index - the number of the equation in the input system of equations with which q_i is multiplied to give the RHS of (1). There is a restriction in the structure of all the expressions for p_i, q_j that are specified: they must be homogeneous linear in some unknown function or constant. All such functions and constants must be listed in flist (see above). The dependencies of such functions must be defined before calling CONLAWi. This is done with the command DEPEND, e.g. DEPEND f,t,x,u$ to specify f=f(t,x,u). If one wants to have f as a function of derivatives of u(t,x), say f depending on df(u,t,x,2), then one can *not* write DEPEND f,df(u,t,x,2)$ % wrong but instead DEPEND f,u!`1!`2!`2$ % correct if txlist has been specified as {t,x}. As t is the first variable and x is the second variable in txlist and u is differentiated ones wrt. t and two times wrt. x we therefore get u!`1!`2!`2. The character ! is the exempt character to allow special characters like ` to occur in an identifier name. Comments: --------- 1. The input to CONLAW1, CONLAW2, CONLAW3 is the same apart from: - an ansatz for q_i is ignored in CONLAW1 - an ansatz for p_i is ignored in CONLAW2 - the meaning of mindensord, maxdensord is different in CONLAW1 on one hand and CONLAW2,CONLAW3 on the other (see above). 2. It matters how the differential equations are input, i.e. which derivatives are eliminated. For example, the Korteweg - de Vries equation if input in the form df(u,x,3)=-u*df(u,x)-df(u,t) instead of df(u,t)=-u*df(u,x)-df(u,x,3) in CONLAW1 and choosing maxdensord=1 then P_i will be of at most first order, Div P of second order and df(u,x,3) will not be substituted and no non-trival conservation laws can be found. This does not mean that one will not find low order conservation laws at all with the substitution df(u,x,3)=..., one only has to go to maxdensord=2 with longer computations as a consequence compared to the input df(u,t)=-u*df(u,x)-df(u,x,3) where maxdensord=0 is enough to find non-trivial conservation laws. 3. It is not the case, that for any conserved current p_i, satisfying (2), there must exist characteristic function(s) q_i such that they satisfy (3). One can therefore not specify a known density p_t for CONLAW3 and hope to calculate the remaining p_i and the corresponding q_i with CONLAW3. What one can do is to use CONLAW1 to calculate the other components of p_i. But this restriction for CONLAW3 does not imply that it misses conservation laws. If (1) is a totally non-degenerate system then for each current p_i satisfying (2) there exists a current P_i differing from p_i only by a curl (-> trivial conservation law) such that P_i satisfies (3) for some suitable q_i. 4. The q_i are uniquely determined only modulo the original equations (1). If one makes an ansatz for q_i then this freedom should be removed by having the q_i independent of the LHS's of the equations (1) and independent of derivatives of the LHS's of (1). If the q_i were allowed to depend on anything, (3) could be solved for one q_i in terms of arbitrary p_j and other q_j, giving a triviality and not a conservation law. Also, these q_i would be singular for solutions of the differential equations as the expression of the differential equation would appear in the denominator. 5. Any ansatz for p_i made for CONLAW1 or p_i,q_j made for CONLAW2 should as well be independent of the LHS's of the equations (1) and independent of derivatives of the LHS's of (1). Flags: ------ LISP (PRINT_:= NIL/0/1/ ...)$ print_=nil suppresses all CRACK output, if print_=n (an integer) then CRACK prints only equations with at most n terms LISP (LOGOPRINT_:=t/nil)$ print of a logo at the start of CONLAWi or not CRACKHELP()$ for other flags regarding the solution of the overdetermined PDE-system OFF BATCH_MODE$ to solve the system of conditions with CRACK interactively Requirements: ------------- REDUCE 3.5 or higher and the files crack.red, conlaw0.red and one of the files conlaw1.red, conlaw2.red, conlaw3.red depending which program should be used Either read in files with IN "crack.red","conlaw0.red","conlaw1.red"$ (and appropriate paths) or compile them before with FASLOUT "crack"$ IN "crack"$ FASLEND$ FASLOUT "conlaw0"$ IN "conlaw0.red"$ FASLEND$ FASLOUT "conlaw1"$ IN "conlaw1.red"$ FASLEND$ BYE$ and load them later with LOAD crack,conlaw0,conlaw1$ conlaw2, conlaw3 are treated like conlaw1. Examples: (see also conlaw.tst) --------- (A CRACK-procedure nodepnd is used to clean up after each run and delete all dependencies of each function in the list of functions in the argument of nodepnd.) lisp(print_:=nil); % to suppress output from CRACK - a single PDE: depend u,x,t$ conlaw1({{df(u,t)=-u*df(u,x)-df(u,x,3)}, {u}, {t,x}}, {0, 1, t, {}, {}})$ nodepnd {u}$ - a system of equations: depend u,x,t$ depend v,x,t$ conlaw1({{df(u,t)=df(u,x,3)+6*u*df(u,x)+2*v*df(v,x), df(v,t)=2*df(u,x)*v+2*u*df(v,x) }, {u,v}, {t,x}}, {0, 1, t, {}, {}})$ nodepnd {u,v}$ - a system of equations with ansatz: depend u,x,t$ depend v,x,t$ depend r,t,x,u,v,u!`2,v!`2$ q_1:=r*df(u,x,2)$ conlaw2({{df(u,t)=df(v,x), df(v,t)=df(u,x) }, {u,v}, {t,x}}, {2, 2, t, {r}, {r}})$ nodepnd {u,v,r}$ - for the determination of parameters, such that conservation laws exist: depend u,x,t; conlaw1({{df(u,t)=-df(u,x,5)-a*u**2*df(u,x)-b*df(u,x)*df(u,x,2) -c*u*df(u,x,3)}, {u}, {t,x}}, {0, 1, t, {a,b,c}, {}}); nodepnd {u}; - for first integrals of an ODE-system including the determination of parameter values s,b,r such that conservation laws exist: depend x,t; depend y,t; depend z,t; depend a1,x,t; depend a2,y,t; depend a3,z,t; p_t:=a1+a2+a3; conlaw2({{df(x,t) = - s*x + s*y, df(y,t) = x*z + r*x - y, df(z,t) = x*y - b*z}, {x,y,z},{t} }, {0,0,t,{a1,a2,a3,s,r,b},{}}); nodepnd {x,y,z,a1,a2,a3};