The notion of weakly relatively prime and W-Grbner basis in K[x1,x2,..., xn] are given. The following results are obtained: for polynomials f1, f2 , . . ., fm
Let H2 =(-△)2 +V2 be the Schrodinger type operator,where V satisfies reverse Holder inequality.In this paper,we establish the LP boundedness for V2H2-1,H2-1V2,VH
In this note we consider Wentes type inequality on the Lorentz-Sobolev space.If▽f∈L~p1,q1(R~n),G ∈ L~(p2,q2)(R~n) and div G≡0 in the sense of distribution where(1/p1)+(1/P2)=(1/q1)+(1/q2)=1,1
We implemented accurate FFD in terms of triangular Bézier surfaces as matrix multiplications in CUDA and rendered them via Open GL. Experimental results sh