理解
The Langlands program is a framework for understanding the unity of mathematics.
The arithmetic of modular forms is a key to understanding the deeper structures of number theory.
The Langlands program is a vision of how mathematics could be understood as a whole.
The Langlands program is a challenge to our understanding of the fundamental nature of mathematics.
The study of automorphic representations is a key to understanding the Langlands conjectures.
The Langlands program is a framework for understanding the deeper structures of mathematics.
The arithmetic of modular forms is a gateway to understanding higher-dimensional objects.
The study of L-functions is not just about proving theorems but about understanding patterns.
To understand the arithmetic of algebraic varieties is to understand the symmetries hidden within them.
Mathematics is not just about numbers, equations, computations, or algorithms: it is about understanding.
The goal of mathematics is to understand the patterns of the universe.
When you solve a mathematical problem, you don't just get the answer - you understand why it's the answer.
In science, we try to explain what we don't understand. In mathematics, we try to understand what we can't explain.
Mathematics is not just about numbers and equations; it's about understanding the deep patterns and connections in the universe.
The goal of mathematics is to understand the structures that underlie the phenomena we observe.
Mathematics is not about numbers, equations, computations, or algorithms: it is about understanding.
In mathematics, you don't understand things. You just get used to them.
The goal of mathematics is not to solve problems, but to understand them.
The most important thing in mathematics is to understand the concepts, not just to memorize the formulas.
Geometry is not just about shapes; it is about understanding the space we live in and the relationships within it.