|  |  D.15.12.30 derivationFromList Procedure from librarydifform.lib(see  difform_lib).
 
Example:Usage:
derivation phi = derivationFromList(L); L list
Return:
the derivation defined by the list L
Remarks:
The structure of L is checked and L is sorted,
then it is set as structure list of phi
 
Note:
the structure of L must follow the rules:
- L[1] is a list of all degree-1 generators: all dx_i must occur once and no other
differential forms are allowed. The order of the list is not important
- L[2] is the list of images of the dx_i: these must be polynomials
Since the map is linear, it is enough to store the images of the dx_i
 
 See also:
 derivationCheckList;
 derivationConstructor;
 derivationFromPoly.|  | LIB "difform.lib";
ring R = 11,(u,v,w,x),lp;
diffAlgebra();
==> // The differential algebra Omega_R was constructed and the differential \
   forms dDu, dDv, dDw, dDx, du, dv, dw, dx are available.
/////////////////////////////////////
// Construction of structure lists //
/////////////////////////////////////
list L_1;
L_1[1] = list(du,dv,dw,dx);
L_1[2] = list(u,v,w,x);
list L_2;
L_2[1] = list(dx,dw,du,dv);
L_2[2] = list(x2,w2,u2,v-wu);
/////////////////////////////////
// Construction of derivations //
/////////////////////////////////
derivation phi = derivationFromList(L_1); phi;
==>  Omega_R^1 --> R
==>        du |--> u
==>        dv |--> v
==>        dw |--> w
==>        dx |--> x
==> 
==> 
derivation psi = derivationFromList(L_2); psi;
==>  Omega_R^1 --> R
==>        du |--> u2
==>        dv |--> -uw+v
==>        dw |--> w2
==>        dx |--> x2
==> 
==> 
kill Omega_R,du,dv,dw,dx,phi,psi,L_1,L_2;
 | 
 
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