Sparse Recovery via ℓ1 Minimization

J. Stillwell
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Abstract

This chapter prepares the reader's mind for reverse mathematics. As its name suggests, reverse mathematics seeks not theorems but the right axioms to prove theorems already known. Reverse mathematics began as a technical field of mathematical logic, but its main ideas have precedents in the ancient field of geometry and the early twentieth-century field of set theory. In geometry, the parallel axiom is the right axiom to prove many theorems of Euclidean geometry, such as the Pythagorean theorem. Set theory offers a more modern example: base theory called ZF, a theorem that ZF cannot prove (the well-ordering theorem) and the “right axiom” for proving it—the axiom of choice. From these and similar examples one can guess at a base theory for analysis, and the “right axioms” for proving some of its well-known theorems.
基于最小化的稀疏恢复
本章为读者准备逆向数学知识。顾名思义,反向数学寻求的不是定理,而是证明已知定理的正确公理。逆向数学最初是数学逻辑的一个技术领域,但它的主要思想在古老的几何领域和20世纪初的集合论领域都有先例。在几何中,平行公理是证明欧几里得几何中许多定理的正确公理,例如勾股定理。集合论提供了一个更现代的例子:称为ZF的基础理论,一个ZF不能证明的定理(良序定理)和证明它的“正确公理”——选择公理。从这些和类似的例子中,人们可以猜测出分析的基本理论,以及证明一些著名定理的“正确公理”。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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