Who derived the universal formula for differential equations?

Russian mathematician Ivan Remizov derived the universal formula for solving problems in differential equations.

How long were differential equation problems considered analytically unsolvable?

Problems in differential equations were considered analytically unsolvable for over 190 years before Ivan Remizov's breakthrough.

What fields will benefit from this new mathematical approach?

The new mathematical approach is crucial to fundamental physics and economics and will accelerate computations in these and other sciences.

Home / Science / Russian Mathematician Cracks Unsolvable Differential Equations

Russian Mathematician Cracks Unsolvable Differential Equations

27 Jan

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Summary

A universal formula for differential equations was derived by Ivan Remizov.
This breakthrough solves problems considered analytically unsolvable for 190 years.
The new method simplifies complex processes into manageable, calculable steps.

Russian Mathematician Cracks Unsolvable Differential Equations

A significant mathematical advancement has been achieved by Russian mathematician Ivan Remizov, who has derived a universal formula for solving problems in differential equations. This development addresses issues that have been considered analytically unsolvable for more than 190 years, fundamentally altering the understanding of this foundational area of mathematics. These equations are critical to fields such as fundamental physics and economics.

Remizov's theorem allows complex, time-dependent processes, often described by second-order differential equations, to be divided into an infinite series of simpler, manageable steps. This approach, which builds upon foundational work from 1834 by Joseph Liouville, transforms the problem from an intractable one into a series of approximations. The application of the Laplace transform further enables the translation of these equations into ordinary algebraic calculations.