Analytic inequalities with applications to special functions

We establish some inequalities for the Bessel functions of the first kind J x Ž . Ž . and for the modified Bessel functions I x and K x . Some of these results are obtained using the method of Giordano and Laforgia which is based essentially on the arithmetic᎐geometric mean inequality. Other result

We introduce new methods of complex analysis (inequalities of Bernstein type) to study projections of analytic sets. These techniques are applied to problems of bifurcations of periodic orbits of differential equations such as the local Hilbert's 16 th problem. 1997 Academic Press ## I. INTRODUCTI

A function which is homogeneous in x y z of degree n and satisfies V xx + V yy + V zz = 0 is called a spherical harmonic. In polar coordinates, the spherical harmonics take the form r n f n , where f n is a spherical surface harmonic of degree n. On a sphere, f n satisfies f n + n n + 1 f n = 0, whe

The best known upper bound on the permanent of a O-l matrix relies on the knowledge of the number of nonzero entries per row. In certain applications only the total number of nonzero entries is known. In order to derive bounds in this situation we prove that the function f:( -1, co) + l%, defined by