The Christoffel–Darboux formula is a significant result in the theory of orthogonal polynomials. It provides a way to express sums of products of orthogonal polynomials in a concise form. Typically, the formula relates the orthogonal polynomials defined on a specific interval with respect to a weight function.

The continuous dual Hahn polynomials are a family of orthogonal polynomials that arise in the context of special functions and quantum calculus. They are part of the broader family of dual Hahn polynomials and have applications in various areas, including mathematical physics, combinatorics, and approximation theory. The continuous dual Hahn polynomials can be defined in terms of a three-parameter family of polynomials, which can be specified using recurrence relations or generating functions.

Continuous dual \( q \)-Hahn polynomials are a family of orthogonal polynomials that arise in the context of basic hypergeometric series and quantum group theory. They are a part of the \( q \)-Askey scheme, which organizes various families of orthogonal polynomials based on their properties and connections to special functions.

The term "rates" can refer to various concepts depending on the context. Here are some common interpretations: 1. **Interest Rates**: The percentage charged on borrowed money or earned on investments, typically expressed on an annual basis. For example, a bank might offer a savings account with an interest rate of 2% per year. 2. **Exchange Rates**: The value of one currency in terms of another. For instance, if the exchange rate between the U.S.

Favard's theorem is a result in functional analysis and measure theory concerning the Fourier transforms of functions in certain spaces. Specifically, it deals with the conditions under which the Fourier transform of a function in \( L^1 \) space can be represented as a limit of averages of the values of the function.

Jacobi polynomials are a class of orthogonal polynomials that arise in various areas of mathematics, including approximation theory, numerical analysis, and the theory of special functions. They are named after the mathematician Carl Gustav Jacob Jacobi.

The Meixner–Pollaczek polynomials are a class of orthogonal polynomials that arise in various areas of mathematics, particularly in spectral theory, probability, and mathematical physics. They can be defined as a part of the broader family of Meixner polynomials, which are associated with certain types of stochastic processes, especially those arising in the context of random walks and queuing theory.

Q-Bessel polynomials, also known as Bessel polynomials of the first kind, are specific types of orthogonal polynomials that are related to Bessel functions. These polynomials arise in various areas of mathematics and applied sciences, particularly in solutions to differential equations, mathematical physics, and numerical analysis. Q-Bessel polynomials can be defined through their generating function or through a recurrence relation.

The Q-Meixner–Pollaczek polynomials are a family of orthogonal polynomials that arise in the context of certain special functions and quantum mechanics. They are a generalization of both the Meixner and Pollaczek polynomials and are associated with q-analogues, which are modifications of classic mathematical structures that depend on a parameter \( q \).

Sobolev orthogonal polynomials are a generalization of classical orthogonal polynomials that arise in the context of Sobolev spaces. In classical approximation theory, orthogonal polynomials, such as Legendre, Hermite, and Laguerre polynomials, are orthogonal with respect to a weight function over a given interval or domain. Sobolev orthogonal polynomials extend this concept by introducing a notion of orthogonality that involves both a weight function and derivatives.

A cubic function is a type of polynomial function of degree three, which means that the highest power of the variable (usually denoted as \(x\)) is three.

Elliptic rational functions are mathematical functions that arise in the study of elliptic curves and, more generally, in the theory of elliptic functions. They can be thought of as generalizations of rational functions that incorporate properties of elliptic functions. To understand elliptic rational functions, it's helpful to break down the components of the term: 1. **Elliptic Functions:** These are meromorphic functions that are periodic in two directions (often associated with the complex plane's lattice structure).

Sorting is the process of arranging data or elements in a particular order, typically either in ascending or descending order. This can apply to a wide range of data types, including numbers, strings, and records in databases. Sorting is a fundamental operation in computer science and is used in various applications, from organizing data for easy retrieval to optimizing algorithms that rely on sorted data for efficiency.

Yasuo Yuasa is a prominent Japanese philosopher known for his work in the fields of Japanese philosophy, psychology, and religious studies. He is particularly recognized for his contributions to the understanding of the self, consciousness, and Zen Buddhism. Yuasa has blended traditional Japanese thought with contemporary philosophical issues, critically engaging with both Eastern and Western philosophical concepts.