File r38/packages/specfn/recsimpl.red from the latest check-in


module recsimpl; % Simplification of expressions involving recursions
		 % for special functions.

% Wolfram Koepf, ZIB Berlin , May 1994

% Reduce version (developed from the Maple version) by Winfried Neun.
% Examples can be found in $reduce/xmpl/specfmor.tst

fluid '(spec_nnnnn);

flag ('(spec_check_n),'boolean);

algebraic procedure trim (u);

  if u = {} then {} else
      if member(first u,rest u) then trim rest u 
         else first u . trim rest u;

algebraic procedure adelete (v,u);

  if u = {} then {} else
      if v = first u then adelete(v, rest u)
         else first u . adelete(v, rest u);

algebraic procedure RecursionSimplify (ex);

begin scalar eqq,L1,L2,L3,L4,L5,F,Nargs,n,a,x,kern;

  eqq := ex;
  lisp (kern := union (kernels !*q2f  (numr simp eqq ./ 1),
			kernels !*q2f (denr simp eqq ./ 1)));

  L1 := 'list . lisp  foreach k in kern join if atom k then nil else
				list k;
  L2 := 'list . lisp foreach k in kern join if atom k then nil else
				list (car k , -1 + length k);

  while not(l2 = {}) do <<

	F:=  first l2; L2 := rest L2;
        Nargs := first l2; L2 := rest L2;
        L3 := foreach kk in L1 join
		 if part(kk,0) = F  and
                         lisp equal(-1 + length (prepsq cadr kk),Nargs)
		 then list kk else list ('list);
       L4:= foreach kk in L3 collect lisp ('list . cddr prepsq cadr kk);
       L4 := trim L4;
       foreach kkk in L4 do  <<
	  L5 := foreach kkkk in L3 join 
		if kkk = lisp ('list . cddr prepsq cadr kkkk)
		then lisp list('list , cadr prepsq cadr kkkk)
			else {};
         while length L5 > 2 do <<
		n := max(L5);
                if member(n-1,L5) and member(n-2,L5) then
                   <<   spec_nnnnn:= n;
                        let Spec_recrules;
			eqq := eqq;
			spec_nnnnn:= nil;
			clearrules Spec_recrules;
		   >>;
                L5 := adelete(n,L5); 
       
		>>; >>; >>;
return eqq;
  end;

algebraic procedure spec_check_n(n);
   if n = spec_nnnnn then t else nil;


algebraic ( 
Spec_Recrules :={
% AS (9.1.27)

BesselJ(~n,~z) => - BesselJ(n-2,z) + (2*(n-1)/z)*BesselJ(n-1,z)
when spec_check_n(n),
% AS (9.1.27)

BesselY(~n,~z) => - BesselY(n-2,z) + (2*(n-1)/z)*BesselY(n-1,z)
when spec_check_n(n),
% AS (9.6.26)

BesselI(~n,~z) => BesselI(n-2,z) - (2*(n-1)/z)*BesselI(n-1,z)
when spec_check_n(n),
% AS (9.6.26)

BesselK(~n,~z) => BesselK(n-2,z) + (2*(n-1)/z)*BesselK(n-1,z)
when spec_check_n(n),
% AS (9.1.27)

Hankel1(~n,~z) => - Hankel1(n-2,z) + (2*(n-1)/z)*Hankel1(n-1,z)
when spec_check_n(n),
% AS (9.1.27)

Hankel2(~n,~z) => - Hankel2(n-2,z) + (2*(n-1)/z)*Hankel2(n-1,z)
when spec_check_n(n),
% AS (13.4.2)

KummerM(~a,~b,~z) => 1/(a-1)*
        ((b-a+1)*KummerM(a-2,b,z) + (2*a-2-b+z)*KummerM(a-1,b,z))
when spec_check_n(a),

% AS (13.4.15)
KummerU(~a,~b,~z) => -1/((a-1)*(a-b))*
	(KummerU(a-2,b,z) + (b-2*a+2-z)*KummerU(a-1,b,z))
when spec_check_n(a),
% AS (13.4.29)

WhittakerM(~n,~m,~z) => 1/(2*m+2*n-1)*
	((3+2*m-2*n)*WhittakerM(n-2,m,z)
	   + (4*n-4-2*z)*WhittakerM(n-1,m,z))
when spec_check_n(n),
% AS (13.4.31)

WhittakerW(~n,~m,~z) => 1/4*
((-9+4*m^2+12*n-4*n^2)*WhittakerW(n-2,m,z)
    - (8*n-8-4*z)*WhittakerW(n-1,m,z))
when spec_check_n(n),
% AS (8.5.3)

LegendreP(~a,~b,~z) => 1/(a-b)*
	(-(a-1+b)*LegendreP(a-2,b,z) + (2*a-1)*z*LegendreP(a-1,b,z))
when spec_check_n(a),

LegendreQ(~a,~b,~z) => 1/(a-b)*
        (-(a-1+b)*LegendreQ(a-2,b,z) + (2*a-1)*z*LegendreQ(a-1,b,z))
when spec_check_n(a),
% AS (22.7)

JacobiP(~n,~a,~b,~z) => 1/(2*n*(a + b + n)*(-2 + a + b + 2*n))*
((2*(1-a-n)*(-1+b+n)*(a+b+2*n)*JacobiP(n-2,a,b,z)) +
((a^2-b^2)*(-1+a+b+2*n)+(-2+a+b+2*n)*(-1+a+b+2*n)*(a+b+2*n)*z)*
JacobiP(n-1,a,b,z)) when spec_check_n(n),

GegenbauerP(~n,~a,~z) => 1/n*(
     -(n+2*a-2)*GegenbauerP(n-2,a,z) + 2*(n-1+a)*z*GegenbauerP(n-1,a,z))
when spec_check_n(n),

ChebyshevT(~n,~z) => - ChebyshevT(n-2,z) +2*z*ChebyshevT(n-1,z)
when spec_check_n(n),

ChebyshevU(~n,~z) => - ChebyshevU(n-2,z) +2*z*ChebyshevU(n-1,z)
when spec_check_n(n),

% Two arguments version:
 LegendreP(~n,~z) =>
 1/n*(-(n-1)*LegendreP(n-2,z)+(2*n-1)*z*LegendreP(n-1,z))
 when spec_check_n(n),

LaguerreP(~n,~a,~z) => 1/n*
	(-(n-1+a)*LaguerreP(n-2,a,z) + (2*n+a-1-z)*LaguerreP(n-1,a,z))
when spec_check_n(n),

LaguerreP(~n,~z) => 1/n*
        (-(n-1)*LaguerreP(n-2,z) + (2*n-1-z)*LaguerreP(n-1,z))
when spec_check_n(n),

HermiteP(~n,~z) => -2*(n-1)*HermiteP(n-2,z) + 2*z*HermiteP(n-1,z)
when spec_check_n(n) ,

struveH(~nnnnn,~x)=>
((x^2*struveH(-3 + nnnnn,x) + 5*x*struveH(-2 + nnnnn,x) -
        4*nnnnn*x*struveH(-2 + nnnnn,x) + 2*struveH(-1 + nnnnn,x) -
	6*nnnnn*struveH(-1 + nnnnn,x) + 4*nnnnn^2*struveH(-1 + nnnnn,x)
	+ x^2*struveH(-1 + nnnnn,x))/(-x + 2*nnnnn*x))
  when spec_check_n(nnnnn),

%(* AS (12.2.4)-(12.2.5) *)

struveL(~nnnnn,~x) => ((-(x*struveL(-3 + nnnnn, x)) +
(-1 + 4*(-1 + nnnnn))*struveL(-2 + nnnnn, x) +
((-2*(-1 + nnnnn) - 4*(-1 + nnnnn)^2 + x^2)*struveL(-1 + nnnnn, x))/x)/
(1 + 2*(-1 + nnnnn))) when spec_check_n(nnnnn) } )$

% can be locally applied with where.

endmodule;

end;





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