Results:The succeed rate of ovulation and pregnancy in therapy group and control group were 86.0%,62.2% and 74.4%,43.8% respectively,the difference between two groups was statistically dinstinct.

After two treatment courses,the therapeutic effect was evaluated. 【Results】The comprehensive effect and pain relief in group A were better than those in group B(P<0.05 or P<0.01).

Results The complete resolution rate was 80.2% in the treatment group and 45.0% in the control group; there was a significant difference between the two groups (P<0.01).

[Result] After 3~4 months of menstruation periodic treatment,for the treatment group,28 cases had full birth,occupying 62.2%,2 abortion,4.4%; 15 un-pregnant,33.3%.

Result:In the treatment group,29 cases were markedly effective,9 cases were effective,2 cases were inffective and the total effective rate was 95.0%(95%CI=82.9%～99.4%).

Results The total effective rate of the treatment group was 92.86%,and the total effective rate of the control group was 60.98%, in which, there was significant difference between the two groups (P<0.05). Conclusion It is quite effective to treat CPI with ITWM.

Results: Compared with the healthy cases,the ratio of CD4+ CD4+/CD8+ and NK-cell cytoactivity declined while CD8+ rised in the patients with CA before treatment. It showed difference in statistics (P<0.05).

The result: Unless these 185 groups example, after treating Chinese and Western medicine,it fully recover by 133 example(account for 71.9%),it is the effective 35 examples(account for 18.6%), Invalid 9 example(account for 4. 9%).

The results showed that in WM group the recurrence rate was 11.8%,23.5%,35.3% at 6,12,47 months after the PNS was remitted,while in TCM-WM group,it was 0,3.3%, 13.3% respectively.

It was found that in ITWMG the marked effective rate was 64. 3%, total effective rate was 92. 9%, elimination rate of ascites in weeks was 55. 5 % font 37. 5 %, 75. 0%, 22% in WDE (P<0.05).

The result: Unless these 185 groups example, after treating Chinese and Western medicine,it fully recover by 133 example(account for 71.9%),it is the effective 35 examples(account for 18.6%), Invalid 9 example(account for 4. 9%).

The result showed that,in 60 cases of treatment group,7 cases were completely cured,35 cases were obviously effective,18 cases were effective and the total effective rate was 100%;

The result showed that the obvious effective rate and total effective rate are 52. 8% and 83. 3% respec- tively in the cured, but 25. 0% and 56. 2% in the con- troled.

In the second example, we obtain a proof of the Chalyh-Veselov conjecture that the Calogero-Moser system with integer parameter is algebraically integrable, using the results of Felder and Varchenko.

As an application of the results we prove a generalization of Chevalley's restriction theorem for the classical Lie algebras.

We apply these results to intersection theory on varieties with group actions, especially to Schubert calculus and its generalizations.

In this paper, we prove three types of rigidity results related to CAT(-1) spaces, namely the rigidity of the isometric actions on CAT(-1) spaces under the commensurability subgroups, the higher rank lattices and certain ergodic cocycles.

This extends the results and simplifies the proof for the classical orbit structure description of [10] and [11], which applies whenF=Z.

In the case of 4-dimensional anticommutative algebras a construction is given that links the associated cubic surface and the 27 lines on it with the structure of subalgebras of the algebra.

Such an action is called linearizable if it is equivalent to the restriction of a linear orthogonal action in the ambient affine space of the quadric.

In general the group ring of ann-valued group is not ann-Hopf algebra but it is for ann-coset group constructed from an abelian group.

From it, we recover Joseph and Letzter's result by a kind of "quantum duality principle".

It is well-known that the ring of invariants associated to a non-modular representation of a finite group is Cohen-Macaulay and hence has depth equal to the dimension of the representation.

A basis is calledmonomial if each of its elements is the result of applying to a (fixed) highest weight vector a monomial in the Chevalley basis elementsYα, α a simple root, in the opposite Borel subalgebra.

The result generalizes and implies the classical "branching rules" that describe the restriction of an irreducible representation of the symmetric groupSn toSn-1.

Implementing this point of view, Poisson Summation Formulas are proved in several spaces including integrable functions of bounded variation (where the result is known) and elements of mixed norm spaces.

We use interpolation methods to prove a new version of the limiting case of the Sobolev embedding theorem, which includes the result of Hansson and Brezis-Wainger for Wnk/k as a special case.

The weighted inequalities allow us to transfer the result to the ergodic case, when the operator is induced by a mean bounded, invertible, positive groups.