Heterodox
[embedded content]An Introduction to Algebraic Geometry I have been looking for fluke switch points in certain parameter spaces of coefficients for polynomial equations. Bertram Schefold has pointed out to me that I may want to look into algebraic geometry. This may be beyond me. I consider what I have been doing as exploratory mathematics, and I have been relying on numerical algorithms. I started with thinking that there is a parallel to bifurcation theory. But Barkley Rosser convinced me that I should not use that terminology without an explicit dynamic system, presumably of market prices. These two threads on Math Overflow suggest I might want to look at Bertrametti et al. Lectures on Curves, Surfaces and Projective Varieties. I need a physical book for this, I think, not just a
Topics:
Robert Vienneau considers the following as important:
This could be interesting, too:
Robert Vienneau writes Austrian Capital Theory And Triple-Switching In The Corn-Tractor Model
Mike Norman writes The Accursed Tariffs — NeilW
Mike Norman writes IRS has agreed to share migrants’ tax information with ICE
Mike Norman writes Trump’s “Liberation Day”: Another PR Gag, or Global Reorientation Turning Point? — Simplicius
| An Introduction to Algebraic Geometry |
I have been looking for fluke switch points in certain parameter spaces of coefficients for polynomial equations. Bertram Schefold has pointed out to me that I may want to look into algebraic geometry. This may be beyond me. I consider what I have been doing as exploratory mathematics, and I have been relying on numerical algorithms. I started with thinking that there is a parallel to bifurcation theory. But Barkley Rosser convinced me that I should not use that terminology without an explicit dynamic system, presumably of market prices. These two threads on Math Overflow suggest I might want to look at Bertrametti et al. Lectures on Curves, Surfaces and Projective Varieties. I need a physical book for this, I think, not just a PDF.