The Riemann Hypothesis doesn't look that difficult. If the independent variable approaches positive unbounded infinity thereby making the function converge by intervals of 1/2 without deviation by the Mean Value Theorem?
Neither does the Continuum Hypothesis; the rational numbers Q are obviously in between the integers and the real numbers each giving a unique infinite cardinality.
The Hodge Conjecture. Functions only give linear and rational results when the independent variable or the domain is in the real numbers. Here the complex must have a continuous origin. There aren't any manifolds here with deformities.
Neither does the Continuum Hypothesis; the rational numbers Q are obviously in between the integers and the real numbers each giving a unique infinite cardinality.
The Hodge Conjecture. Functions only give linear and rational results when the independent variable or the domain is in the real numbers. Here the complex must have a continuous origin. There aren't any manifolds here with deformities.
