+ idx i(symbol("i"), 3), j(symbol("j"), 3), k(symbol("k"), 3), l(symbol("l"), 3);
+ symbol A("A"), B("B");
+ ex e;
+
+ result += check_equal(indexed(A, sy_symm(), i, j), indexed(A, sy_symm(), j, i));
+ result += check_equal(indexed(A, sy_anti(), i, j) + indexed(A, sy_anti(), j, i), 0);
+ result += check_equal(indexed(A, sy_anti(), i, j, k) - indexed(A, sy_anti(), j, k, i), 0);
+ e = indexed(A, sy_symm(), i, j, k) *
+ indexed(B, sy_anti(), l, k, i);
+ result += check_equal_simplify(e, 0);
+ e = indexed(A, sy_symm(), i, i, j, j) *
+ indexed(B, sy_anti(), k, l); // GiNaC 0.8.0 had a bug here
+ result += check_equal_simplify(e, e);
+
+ symmetry R = sy_symm(sy_anti(0, 1), sy_anti(2, 3));
+ e = indexed(A, R, i, j, k, l) + indexed(A, R, j, i, k, l);
+ result += check_equal(e, 0);
+ e = indexed(A, R, i, j, k, l) + indexed(A, R, i, j, l, k);
+ result += check_equal(e, 0);
+ e = indexed(A, R, i, j, k, l) - indexed(A, R, j, i, l, k);
+ result += check_equal(e, 0);
+ e = indexed(A, R, i, j, k, l) + indexed(A, R, k, l, j, i);
+ result += check_equal(e, 0);
+
+ e = indexed(A, i, j);
+ result += check_equal(symmetrize(e) + antisymmetrize(e), e);
+ e = indexed(A, sy_symm(), i, j, k, l);
+ result += check_equal(symmetrize(e), e);
+ result += check_equal(antisymmetrize(e), 0);
+ e = indexed(A, sy_anti(), i, j, k, l);
+ result += check_equal(symmetrize(e), 0);
+ result += check_equal(antisymmetrize(e), e);
+
+ return result;
+}
+
+static unsigned scalar_product_check(void)
+{
+ // check scalar product replacement
+
+ unsigned result = 0;
+
+ idx i(symbol("i"), 3), j(symbol("j"), 3);
+ symbol A("A"), B("B"), C("C");
+ ex e;
+
+ scalar_products sp;
+ sp.add(A, B, 0); // A and B are orthogonal
+ sp.add(A, C, 0); // A and C are orthogonal
+ sp.add(A, A, 4); // A^2 = 4 (A has length 2)