The conjugate of a product of linear relations

C˘adariu and Radu applied the fixed point method to the investigation of Cauchy and Jensen functional equations.. In this paper, we will adopt the idea of C˘adariu and Radu to prove

The Implicit Function Theorem asserts that there exists a ball of nonzero radius within which one can express a certain subset of variables, in a system of analytic equations,

In this note we prove that for each in the open interval (-/2,/2) there is a corresponding function F(z) that should be regarded as close-to-convex, but would not be in CL if

Nonlinear operator equation in a Banach space, a priori boundedness principle, functional differential equation, periodic solution.... Then the equation (1)

We remark that Theorem A.1, Corollary A.2 and Theorem A.3 are results on p-hyponormal operators for p (0, 1], and Theorem A.4 is a result on n-hyponormal operators for positive

As we can see, this definition is based on the Definition 2.3 and the previous one is based on the characterization, in the univariate case, in terms of the hazard rate function. In

SAS ∗ with some invertible bounded linear or conjugate-linear operator S on H pre- serves Lebesgue decompositions in both directions, we see that the transformation in (2.5) is

However, if both groups are absolutely irreducible, then there may be several different choices of normal subgroup that can be embedded in GL(n/s, q s ), so the loop in Step 4(d) is