Odd perfect polynomials over ${\mathbb{F}_2}$

Using the relationship between a vector optimization problem and its corresponding individual scalar problems, we derive other second-order necessary optimality conditions for a

Wheeden, Some weighted norm inequalities for the Fourier transform of functions with vanishing moments, Trans.. Sagher, Integrability conditions for the Fourier

In this work, we are interested in extending the previous work [10], in order to prove the existence of solutions and to get a convergence result of the scheme in the case of

Moreover every pseudo-solution of (I.. The Invariance of Condition I. Since every solution is decomposable into a sum of satisfactory solutions, the sum of the

Without it, the theo- rem is a well-known consequence of the theorem of Thue about the approximation of algebraic numbers b y rationals which was subsequently

[1] AGMON, DOUGLIS, NIRENBERG : Estimates near boundary for solutions of elliptic partial differential equations satisfying general boundary conditions I, II. Pure

In two dimension we give a compactness result showing that the continuous problem approximating this difference scheme is still defined on special functions with bounded hessian, and

Thus, software systems (like, e.g., AProVE, CiME, or TTT) which are able to generate constraints for obtaining polynomial interpretations over the naturals which prove termination