Artifact 5f3b75db13a15f1ec10250d90456a01f8e83847be9f9d750b44ce8b6c8ed89ea:
- Executable file
r37/packages/scope/scope.tst
— part of check-in
[f2fda60abd]
at
2011-09-02 18:13:33
on branch master
— Some historical releases purely for archival purposes
git-svn-id: https://svn.code.sf.net/p/reduce-algebra/code/trunk/historical@1375 2bfe0521-f11c-4a00-b80e-6202646ff360 (user: arthurcnorman@users.sourceforge.net, size: 6426) [annotate] [blame] [check-ins using] [more...]
- Executable file
r38/packages/scope/scope.tst
— part of check-in
[f2fda60abd]
at
2011-09-02 18:13:33
on branch master
— Some historical releases purely for archival purposes
git-svn-id: https://svn.code.sf.net/p/reduce-algebra/code/trunk/historical@1375 2bfe0521-f11c-4a00-b80e-6202646ff360 (user: arthurcnorman@users.sourceforge.net, size: 6426) [annotate] [blame] [check-ins using]
% Test SCOPE Package. % ================== % NOTE: The SCOPE, GHORNER, GSTRUCTR and GENTRAN packages must be loaded % to run these tests. % Further reading: SCOPE 1.5 manual Section 3, example 1; scope_switches$ % Further reading: SCOPE 1.5 manual Section 3.1, examples 2,3,4 and 5. on priall$ optimize z:=a^2*b^2+10*a^2*m^6+a^2*m^2+2*a*b*m^4+2*b^2*m^6+b^2*m^2 iname s; off priall$ on primat,acinfo$ optimize ghorner <<z:=a^2*b^2+10*a^2*m^6+a^2*m^2+2*a*b*m^4+2*b^2*m^6+b^2*m^2>> vorder m iname s; off exp,primat,acinfo$ q:=a+b$ r:=q+a+b$ optimize x:=a+b,q:=:q^2,p(q)::=:r iname s; on exp$ clear q,r$ % A similar example follows. % operator a$% Not necessary. Some differences between REDUCE 3.5 and REDUCE 3.6 % when dealing with indices. on inputc$ k:=j:=1$ u:=c*x+d$ v:=sin(u)$ optimize {a(k,j):=v*(v^2*cos(u)^2+u), a(k,j)::=:v*(v^2*cos(u)^2+u)} iname s; off exp$ optimize {a(k,j):=v*(v^2*cos(u)^2+u), a(k,j)::=:v*(v^2*cos(u)^2+u)} iname s; off inputc,period$ optlang fortran$ optimize z:=(6*a+18*b+9*c+3*d+6*j+18*f+6*g+5*h+5*k+3)^13 iname s; off ftch$ optimize z:=(6*a+18*b+9*c+3*d+6*j+18*f+6*g+5*h+5*k+3)^13 iname s; optlang c$ optimize z:=(6*a+18*b+9*c+3*d+6*j+18*f+6*g+5*h+5*k+3)^13 iname s; % Note: C code never contains exponentiations. on ftch$ optimize {x:=3*a*p,y:=3*a*q,z:=6*a*r+2*b*p,u:=6*a*d+2*b*q, v:=9*a*c+4*b*d,w:=4*b} iname s; off ftch$ optlang fortran$ optimize {x:=3*a*p,y:=3*a*q,z:=6*a*r+2*b*p,u:=6*a*d+2*b*q, v:=9*a*c+4*b*d,w:=4*b} iname s; on ftch$ setlength 2$ optimize {x:=3*a*p,y:=3*a*q,z:=6*a*r+2*b*p,u:=6*a*d+2*b*q, v:=9*a*c+4*b*d,w:=4*b} iname s; resetlength$ optlang nil$ % Further reading: SCOPE 1.5 manual section 3.1, example 9 and section 3.2. u:=a*x+2*b$ v:=sin(u)$ w:=cos(u)$ f:=v^2*w; off exp$ optimize f:=:f,g:=:f^2+f iname s$ alst:=aresults; restorables; f; arestore f; f; alst; optimize f:=:f,g:=:f^2+f iname s$ alst:=aresults$ optimize f:=:f,g:=:f^2+f iname s$ restoreall$ f; % Further reading: SCOPE 1.5 manual section 3.1, example 8. % See also section 5. % Also recommended: section 9. clear a$ matrix a(2,2)$ a(1,1):=x+y+z$ a(1,2):=x*y$ a(2,1):=(x+y)*x*y$ a(2,2):=(x+2*y+3)^3-x$ on exp$ off fort,nat$ optimize detexp:=:det(a) out "expfile" iname s$ off exp$ optimize detnexp:=:det(a) out "nexpfile" iname t$ in expfile$ in nexpfile$ on nat$ detexp-detnexp; system "rm expfile nexpfile"$ % Further reading: SCOPE 1.5 manual section 4.2, example 15. % Although the output is similar, it is in general equivalent and % not identical when using REDUCE 3.6 in stead of REDUCE 3.5. This % is due to improvements in the simplification strategy. on acinfo$ optimize gstructr<<a;aa:=(x+y)^2;b:=(x+y)*(y+z);c:=(x+2*y)*(y+z)*(z+x)^2>> name v iname s; alst:= algopt(algstructr({a,b=(x+y)^2,c=(x+y)*(y+z),d=(x+2*y)*(y+z)*(z+x)^2},v),s); off acinfo$ % Further reading: SCOPE 1.5 manual section 4.3, example 16. clear a$ procedure taylor(fx,x,x0,n); sub(x=x0,fx)+(for k:=1:n sum(sub(x=x0,df(fx,x,k))*(x-x0)^k/factorial(k)))$ hlst:={f1=taylor(e^x,x,0,4),f2=taylor(cos x,x,0,6)}$ on rounded$ hlst:=hlst; optimize alghorner(hlst,{x}) iname g$ off rounded$ % Further reading: SCOPE 1.5 manual section 3.1, examples 6 and 7. optimize z:=:for j:=2:6 sum a^(1/j) iname s$ optimize z1:=a+sqrt(sin(a^2+b^2)), z2:=b+sqrt(sin(a^2+b^2)), z3:=a+b+(a^2+b^2)^(1/2), z4:=sqroot(a^2+b^2)+(a^2+b^2)^3, z5:=a^2+b^2+cos(a^2+b^2), z6:=(a^2+b^2)^(1/3)+(a^2+b^2)^(1/6) iname s; % Further reading: SCOPE 1.5 manual section 6, examples 18 and 19. optlang fortran$ optimize {x(i+1,i-1):=a(i+1,i-1)+b(i),y(i-1):=a(i-1,i+1)-b(i)} iname s declare <<x(4),a(4,4),y(5):real;b(5):integer>>; optlang c$ optimize {x(i+1,i-1):=a(i+1,i-1)+b(i),y(i-1):=a(i-1,i+1)-b(i)} iname s declare <<x(4),a(4,4),y(5):real;b(5):integer>>; optlang pascal$ optimize {x(i+1,i-1):=a(i+1,i-1)+b(i),y(i-1):=a(i-1,i+1)-b(i)} iname s declare <<x(4),a(4,4),y(5):real;b(5):integer>>; optlang ratfor$ optimize {x(i+1,i-1):=a(i+1,i-1)+b(i),y(i-1):=a(i-1,i+1)-b(i)} iname s declare <<x(4),a(4,4),y(5):real;b(5):integer>>; precision 7$ on rounded, double$ optlang fortran$ optimize x1:=2 *a + 10 *b, x2:=2.00001 *a + 10 *b, x3:=2 *a + 10.00001 *b, x4:=6 *a + 10 *b, x5:=2.0000001 *a + 10.000001 *b iname s declare << x1,x2,x3,x4,x5,a,b:real>>$ % Further reading: SCOPE 1.5 manual section 7, example 20. % Notice the double role of e: In the lhs as identifier. In the rhs as % exponential function. % Further notice that a is expected to be declared operator. This is % due to lower level scope activities. optimize a(1,x+1) := g + h*r^f, b(y+1) := a(1,2*x+1)*(g+h*r^f), c1 := (h*r)/g*a(2,1+x), c2 := c1*a(1,x+1) + sin(d), a(1,x+1) := c1^(5/2), d := b(y+1)*a(1,x+1), a(1,1+2*x):= (a(1,x+1)*b(y+1)*c)/(d*g^2), b(y+1) := a(1,1+x)+b(y+1) + sin(d), a(1,x+1) := b(y+1)*c + h/(g + sin(d)), d := k*e + d*(a(1,1+x) + 3), e := d*(a(1,1+x) + 3) + sin(d), f := d*(3 + a(1,1+x)) + sin(d), g := d*(3 + a(1,1+x)) + f iname s declare << a(5,5),b(7),c,c1,d,e,f,g,h,r:real*8; x,y:integer>>$ % Further reading: SCOPE 1.5 manual section 8, examples 21 and 22. % Also recommended: section 9. optlang nil$ delaydecs$ gentran declare <<a,b,c,d,q,w: real>>$ gentran a:=b+c$ gentran d:=b+c$ gentran <<q:=b+c;w:=b+c>>$ makedecs$ on gentranopt$ delaydecs$ gentran declare <<a,b,c,d,q,w: real>>$ gentran a:=b+c$ gentran d:=b+c$ gentran <<q:=b+c;w:=b+c>>$ makedecs$ off gentranopt$ delayopts$ gentran declare <<a,b,c,d,q,w: real>>$ gentran a:=b+c$ gentran d:=b+c$ gentran <<q:=b+c;w:=b+c>>$ makeopts$ delaydecs$ gentran declare <<a,b,c,d,q,w: real>>$ delayopts$ gentran a:=b+c$ gentran d:=b+c$ gentran <<q:=b+c;w:=b+c>>$ makeopts$ makedecs$ clear a,b,c,d,q,w$ matrix a(2,2)$ a:=mat(((b+c)*(c+d),(b+c+2)*(c+d-3)),((c+b-3)*(d+b),(c+b)*(d+b+4))); gentranlang!*:='c$ delayopts$ gentran aa:=:a$ makeopts$ end;