The Lunghua Civilian Assembly Centre, often referred to as the Lunghua Internment Camp, was a facility located near Shanghai, China, that served as an internment camp during World War II. It was established by the Japanese military in 1943 and primarily held civilians, including Westerners and Chinese, who were living in Shanghai. The camp was part of the Japanese occupation efforts during the war, which included the internment of foreign nationals.

"Huajing" (华景) can refer to different contexts, depending on the area of interest. One possibility is that it refers to a place or district in China. For example, Huajing is a neighborhood in Shanghai, known for its residential areas and local amenities. Another context could involve cultural or artistic references, where "Huajing" could refer to specific concepts, works, or practices within Chinese literature, art, or philosophy.

Shanghai Chest Hospital, officially known as Shanghai Chest Hospital Affiliated to Shanghai Jiao Tong University, is a prominent medical institution in Shanghai, China. It specializes in diseases related to the chest, particularly pulmonary and cardiovascular conditions. The hospital is recognized for its expertise in thoracic surgery, respiratory medicine, and related fields. As a teaching hospital, it is affiliated with Shanghai Jiao Tong University, which allows it to play a significant role in medical education and research.

The Shanghai Corniche is a scenic waterfront promenade located along the Huangpu River in Shanghai, China. It is part of a larger urban development project aimed at enhancing public spaces and improving access to the riverfront. The Corniche offers visitors panoramic views of the city's iconic skyline, including landmarks like the Oriental Pearl Tower, the Jin Mao Tower, and the Shanghai World Financial Center. The promenade is designed for pedestrians and cyclists, featuring walking paths, parks, and recreational areas.

Shanghai Singapore International School (SSIS) is a private international school located in Shanghai, China. Established in 1996, the school offers an international curriculum primarily based on the Singaporean education system, which is renowned for its rigorous academic standards and emphasis on mathematics and science. SSIS serves students from nursery through to high school, providing a supportive environment for both local and expatriate families. The school is known for its diverse student body, with students from various cultural backgrounds.

St. Ignatius Cathedral, also known as St. Ignatius of Loyola Cathedral, is a prominent Roman Catholic cathedral located in various cities around the world, but it is particularly well-known in places like San Francisco, California, and in other regions where Catholicism has a significant presence. In San Francisco, the cathedral is an important spiritual center for the Jesuit community and was established as part of the Archdiocese of San Francisco.

The Riemann–Siegel theta function is a special function that arises in number theory, particularly in the study of the distribution of prime numbers and the Riemann zeta function. It is named after Bernhard Riemann and Carl Ludwig Siegel, who contributed to its development and application. The Riemann–Siegel theta function is often denoted as \( \theta(x) \) and is defined in terms of a specific series that resembles the exponential function.

Dirichlet's theorem on arithmetic progressions states that if \( a \) and \( d \) are two coprime integers (that is, their greatest common divisor \( \gcd(a, d) = 1 \)), then there are infinitely many prime numbers of the form \( a + nd \), where \( n \) is a non-negative integer.

As of my last knowledge update in October 2021, there isn't any widely recognized individual or topic named Josip Globevnik in common knowledge or cultural references. It's possible that he could be a private person, a local figure, or someone who has gained recognition after that date.

The Zeta function, often referred to in the context of mathematics, most famously relates to the Riemann Zeta function, which is a complex function denoted as \( \zeta(s) \). It has significant implications in number theory, particularly in relation to the distribution of prime numbers.

The Artin–Mazur zeta function is a function associated with a dynamical system, particularly in the context of number theory and arithmetic geometry. It is primarily used in the study of iterative processes and can also be applied to understand the behavior of various types of mathematical objects, such as algebraic varieties and their associated functions over finite fields.

In number theory and representation theory, an automorphic L-function is a type of complex analytic function that encodes significant arithmetic information about automorphic forms, which are certain types of functions defined on algebraic groups over global fields (like the rational numbers) that exhibit certain symmetries and transformation properties. ### Key Concepts: 1. **Automorphic Forms**: These are generalizations of modular forms, defined on the quotient of a group (often the general linear group) over a number field.

The Matsumoto zeta function is a mathematical function that arises in the study of certain types of number-theoretic problems, particularly those related to generalizations of classical zeta functions. It is typically associated with an extension of the classical Riemann zeta function and can be defined for various types of number systems.

The Rankin-Selberg method is a powerful technique in analytic number theory, used primarily to study L-functions attached to modular forms and automorphic forms. It is named after the mathematicians Robert Rankin and A. Selberg, who developed the theory in the mid-20th century. The method involves the construction of an "intertwining" integral that relates two L-functions.

The Feller–Tornier constant is a constant that arises in the context of probability theory, particularly in relation to random walks and certain types of stochastic processes. It is named after the mathematicians William Feller and Joseph Tornier, who studied the asymptotic behavior of random walks.

A functional equation is a relation that defines a function in terms of its value at different points, typically revealing symmetries or properties of the function. In the context of L-functions, these are complex functions arising in number theory and are particularly important in areas such as analytic number theory and the theory of modular forms. ### L-functions L-functions are certain complex functions that encode deep arithmetic properties of numbers.

The Generalized Riemann Hypothesis (GRH) is a conjecture in number theory that extends the famous Riemann Hypothesis (RH) beyond the critical line of the Riemann zeta function to other Dirichlet L-functions.

The Langlands–Deligne local constant is a fundamental concept in the theory of automorphic forms and number theory, particularly in the context of the Langlands program. It arises in the study of the local Langlands correspondence, which connects representations of p-adic groups to Galois representations.

The Shintani zeta function is a special type of zeta function that arises in the context of number theory, particularly in the study of algebraic integers in number fields and certain functions related to modular forms and Galois representations. It is named after Kiyoshi Shintani, who introduced it in the 1970s as part of his work on generalized zeta functions associated with algebraic number fields and the theory of modular forms.

Turing's method, commonly associated with the work of the British mathematician and logician Alan Turing, generally refers to concepts and techniques related to his contributions in computation, mathematics, and artificial intelligence. Although he is best known for the Turing machine and its significance in theoretical computer science, the term could also refer to various approaches and ideas he developed.