Undergrad What Is the Genus of One-Dimensional Curves?

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The discussion centers on the concept of genus as it applies to one-dimensional curves, particularly in the context of anharmonic oscillators. The classification of cubic and quartic anharmonic oscillators as "genus one potentials" is highlighted, with higher-order oscillators categorized as "higher genus potentials." The inquiry seeks clarification on how to define and count the genus for one-dimensional curves, referencing a helpful resource on the genus-degree formula. The conversation emphasizes the intersection of physics and differential geometry in understanding these classifications. Understanding the genus in this context is essential for further exploration in topology and its applications in physics.
detre
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Hello,

In a physics paper, I have encountered an expression about genus of one dimensional anharmonic oscillators. More specifically, they classify cubic and quartic anharmonic oscillator as "genus one potentials" and higher order anharmonic oscillators as "higher genus potentials".

I am new in differential geometry and topology but I know basic notion of genus in Riemann surfaces. My question is how is a genus defined for a one dimensional curve and how should I count them?

Thanks in advanced!
 
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