Perhaps the most beautiful aspect of mathematics is that it applies to literally everything, even things that do not exist in ...

Hardy spaces, originally devised to characterise the boundary behaviour of holomorphic functions, have evolved into a comprehensive framework within real-variable harmonic analysis. Their study has ...

The study of function spaces represents a cornerstone in modern analysis, providing the framework necessary for investigating the smoothness, integrability and localised behaviour of functions. These ...

Mathematicians used “magic functions” to prove that two highly symmetric lattices solve a myriad of problems in eight- and 24-dimensional space. The points could be an infinite collection of electrons ...

This is a preview. Log in through your library . Abstract This paper concerns the isometric theory of the Lebesgue-Bochner function space $L^p (\mu, X)$ where $1 < p ...

Functions generated by blocks were introduced by M. Taibleson and G. Weiss in the setting of the one-dimensional torus $T \lbrack TW1 \rbrack$. They showed that these ...

Researchers uncover the mathematical structure behind mesmerizing tiling patterns, linking their visual appeal to the ...