logaritmilt

Logaritmilt is a term used in mathematical thought experiments to denote a family of monotone transforms on the positive real numbers parameterized by a real tilt s. It is presented as a generalization of the natural logarithm, obtained by replacing exponential growth with a power-law form in a controlled way. For a real parameter s, the logaritmilt of x with respect to s is defined by logaritmilt_s(x) = ∫_1^x t^(s−1) dt. This integral evaluates to (x^s − 1)/s when s ≠ 0, and by continuity logaritmilt_0(x) = ln x.

The transform is strictly increasing for x > 0 for all real s, and its inverse is logaritmilt_s^−1(y)

Key properties include domain and range (x > 0 maps to all real numbers), pointwise convergence to

History and usage notes indicate logaritmilt is a constructed concept found in teaching examples and speculative