The Eden growth model, also known as the Eden process or the Eden model, is a concept in statistical physics and mathematical modeling that describes the growth of clusters or patterns in a stochastic (random) manner. It was first introduced by the physicist E. D. Eden in 1961.

Carlo Miranda can refer to a few different things, depending on the context. It could be a person's name, possibly someone notable in a specific field such as art, sports, or academics. However, without more specific context, it's challenging to provide a detailed answer.

Charles Anthony Micchelli is a highly respected mathematician known for his contributions to the field of mathematics, particularly in areas such as mathematical analysis and approximation theory.

A Frölicher space is a concept in the field of differential geometry and topology, particularly in the study of differentiable manifolds and structures. Specifically, a Frölicher space is a type of topological space that supports a frölicher structure, which is a way of formalizing the notion of differentiability. In more detail, a Frölicher space is defined as a topological space equipped with a sheaf of differentiable functions that resembles the structure of smooth functions on a manifold.

The Kaup–Kupershmidt equation is a type of nonlinear partial differential equation that arises in the context of integrable systems and the study of wave phenomena, particularly in fluid dynamics and mathematical physics. It is named after mathematicians, B. Kaup and B. Kupershmidt, who contributed to its development.

The Half-Range Fourier Series is a mathematical tool used to represent a function defined in a limited interval (typically \([0, L]\)) in terms of simpler trigonometric functions. It is particularly useful for functions that are defined only on half of the standard periodic interval, such as \([0, L]\) instead of the full interval \([-L, L]\).

The Identity Theorem for Riemann surfaces is a result in complex analysis that concerns holomorphic functions defined on Riemann surfaces, which are essentially one-dimensional complex manifolds. The theorem states that if two holomorphic functions defined on a connected Riemann surface agree on a set that has a limit point within that surface, then the two functions must be equal everywhere on the connected component of that Riemann surface.

Khinchin's theorem, a fundamental result in probability theory, pertains to the factorization of certain types of distributions, specifically those that possess a "stable" structure. While there are several results attributed to the mathematician Aleksandr Khinchin, one crucial aspect relates to the factorization of distributions in the context of characteristic functions.

The Vivanti–Pringsheim theorem is a result in the field of complex analysis, specifically in the study of analytic functions. It deals with the behavior of a function that is analytic within a disk but may have singularities on the boundary of that disk.

The Volkenborn integral is a type of integral used in the context of p-adic analysis and number theory. It is named after the mathematician Helmut Volkenborn who introduced it. Essentially, it serves as an analogue to the classical Riemann or Lebesgue integrals, but it is defined over the p-adic numbers rather than the real numbers.

The Suita conjecture is a mathematical conjecture related to the field of complex analysis and geometry, specifically concerning the properties of certain types of holomorphic functions. More specifically, it pertains to the relationship between the hyperbolic area of a domain in the complex plane and the capacity of certain sets.

Thiele's interpolation formula is a method used for interpolating values of a function based on a set of known data points—specifically, it is particularly useful for interpolating values for unequally spaced data points. This method employs divided differences, which facilitate polynomial interpolation based on the data points.

PDE theorists are researchers and mathematicians who specialize in the study of partial differential equations (PDEs). PDEs are equations that involve functions of several variables and their partial derivatives. They are fundamental in various fields of science and engineering because they can describe a wide range of physical phenomena, including heat transfer, fluid dynamics, wave propagation, and electromagnetism.

Probability theorists are mathematicians or researchers who specialize in the study of probability theory, which is a branch of mathematics dealing with the analysis of random events and the likelihood of various outcomes. Probability theory provides the mathematical framework to model uncertain situations, helping to quantify the likelihood of events and to make predictions based on observed data. Key areas in the study of probability theory include: 1. **Random Variables**: Understanding the behavior of variables that can take on different values based on chance.

Alessandro Faedo is a name that could refer to several individuals, but without additional context, it is difficult to determine who you might be referring to. If you are asking about a specific person, such as a researcher, artist, or a public figure, please provide more information, and I'll be happy to help!

Charles B. Morrey Jr. was a renowned American mathematician, particularly known for his contributions to functional analysis and partial differential equations. Born in 1916 and passing away in 2015, Morrey made significant advancements in the theory of distributions and Sobolev spaces. He is particularly recognized for Morrey's theorem, which addresses embeddings of certain function spaces and has implications in the study of regularity for solutions to elliptic and parabolic partial differential equations.

Charles Fefferman is a prominent American mathematician known for his work in various areas of mathematics, particularly in analysis, partial differential equations, and mathematical physics. He was born on December 18, 1947, and has made significant contributions to several fields, including harmonic analysis and complex analysis. Fefferman is a professor at Princeton University and has received numerous accolades for his work, including the Fields Medal in 1978, which is one of the highest honors in mathematics.

Djairo Guedes de Figueiredo does not appear to be a widely recognized public figure, event, or term as of my last knowledge update in October 2023. It is possible that he could be a private individual, a less well-known figure, or that you might be referring to someone who has gained prominence after that date.

Dmitrii Menshov is not widely recognized in popular media or notable references available up to my knowledge cutoff in October 2023. It is possible that he is an individual known in a specific field or context, but without additional context, it's difficult to provide precise information.

Einar Hille (born 1884, died 1954) was a prominent Norwegian mathematician known for his contributions to real analysis and functional analysis. He is particularly noted for his work on functional spaces, measure theory, and integral equations. Hille's legacy includes significant publications in mathematics, and he is remembered for his influence on the field, including his collaborations with other mathematicians. His work has continued to be of relevance in various areas of mathematics.