Zhi-Wei Sun

What is he best known for?

The fields of study he is best known for:

• Combinatorics
• Algebra
• Number theory

Zhi-Wei Sun mainly investigates Combinatorics, Prime, Discrete mathematics, Congruence relation and Binomial coefficient. His work on Integer, Conjecture and Identity as part of general Combinatorics research is often related to Legendre symbol, thus linking different fields of science. His study looks at the relationship between Prime and fields such as Congruence, as well as how they intersect with chemical problems.

The Discrete mathematics study combines topics in areas such as Cubic form, Euler number and Arithmetic. His studies in Congruence relation integrate themes in fields like Bernoulli polynomials, Legendre polynomials and Bernoulli number. Zhi-Wei Sun has included themes like Catalan number and Jacobi symbol in his Binomial coefficient study.

His most cited work include:

• Super congruences and Euler numbers (149 citations)
• Congruences concerning Bernoulli numbers and Bernoulli polynomials (120 citations)
• Open Conjectures on Congruences (75 citations)

What are the main themes of his work throughout his whole career to date?

Combinatorics, Discrete mathematics, Prime, Integer and Congruence relation are his primary areas of study. Conjecture, Binomial coefficient, Modulo, Congruence and Bernoulli number are subfields of Combinatorics in which his conducts study. The various areas that Zhi-Wei Sun examines in his Discrete mathematics study include Abelian group, Lucas sequence and Euler number.

Zhi-Wei Sun combines subjects such as Bernoulli polynomials and Fibonacci number with his study of Prime. His Integer research is multidisciplinary, incorporating perspectives in Ring and Triangular number. The study incorporates disciplines such as Trinomial and Legendre polynomials in addition to Congruence relation.

He most often published in these fields:

• Combinatorics (79.17%)
• Discrete mathematics (40.63%)
• Prime (38.28%)

What were the highlights of his more recent work (between 2013-2021)?

• Combinatorics (79.17%)
• Integer (32.03%)
• Prime (38.28%)

In recent papers he was focusing on the following fields of study:

Zhi-Wei Sun mostly deals with Combinatorics, Integer, Prime, Discrete mathematics and Congruence relation. Combinatorics is frequently linked to Square in his study. His work deals with themes such as Ring, Natural number and Fermat's Last Theorem, which intersect with Integer.

His work carried out in the field of Prime brings together such families of science as Bernoulli polynomials, Bernoulli number, Divisibility rule, Congruence and Function. Zhi-Wei Sun interconnects Legendre polynomials and Prime power in the investigation of issues within Discrete mathematics. His Congruence relation research is multidisciplinary, incorporating elements of Harmonic number, Trinomial, Apéry's constant, Series and Lucas sequence.

Between 2013 and 2021, his most popular works were:

• Generalized Legendre polynomials and related supercongruences (56 citations)
• Congruences involving generalized central trinomial coefficients (31 citations)
• A result similar to Lagrange's theorem (28 citations)

In his most recent research, the most cited papers focused on:

• Combinatorics
• Number theory
• Algebra

His primary areas of study are Combinatorics, Prime, Discrete mathematics, Congruence relation and Integer. His work is dedicated to discovering how Combinatorics, Euler number are connected with Proof of the Euler product formula for the Riemann zeta function and Pure mathematics and other disciplines. His studies deal with areas such as Bernoulli polynomials, Divisibility rule, Modulo and Identity as well as Prime.

His work in Discrete mathematics tackles topics such as Prime power which are related to areas like Finite set and Product. He has researched Congruence relation in several fields, including Trinomial, Quadratic residue, Class number and Series. His Integer study combines topics from a wide range of disciplines, such as Primitive root modulo n, Conjecture, Function, Lagrange's theorem and Octagonal number.

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