This up-to-date treatment of recent developments in geometric inverse problems introduces graduate students and researchers to an exciting area of research. With an emphasis on the two-dimensional ...

The geometric mean is most appropriate for series that exhibit serial correlation—especially investment portfolios. Most returns in finance are correlated, including yields on bonds, stock ...

Graphs are everywhere. In discrete mathematics, they are structures that show the connections between points, much like a ...

A geometric sequence goes from one term to the next by always multiplying or dividing by the same value. The number multiplied (or divided) at each stage of a geometric sequence is called the ...

But we don’t know one another exist, for sure. In fact, we have no definitive proof that anything is conscious beyond ...

In the second part of our series ... equations to geometric theorems, understanding these key topics is essential for ...

The classic CFU assay uses a dilution series to measure viable cell concentrations across the many orders of magnitude that exist in nature; but this comes at the expense of time and resources. In ...

Nobody, however, who surveys the conventional working apparatus of courses of study, textbooks, recitations, examinations, and marks can have much doubt that in practice the schools are making the ...

In the same way the iPhone became an essential part of our lives in what seemed like no time, ChatGPT (or whatever generative AI tool leads the way) will alter medical practice in previously ...

The inverse problem for the wave equation is closely related to several inverse problems of geometric nature ... of the input variables conditioned on the observation. In practice, the direct problem ...