On a New Analysis of the Problem of the Planck Constant

A new analysis of the problem of Planck constant is proposed. The analysis is based on the formal logic. It is shown [1] that well-known formula $E_n \;\equiv \;h\nu _n $ (where $E_n $, $h$, and $\nu _n $ are energy, Planck constant (i.e. quantum of action), and the frequency of the periodic process of mutual transformation of the internal and external motions, respectively) is correct if $\nu _n $ is the frequency of oscillation of Planck constant. In other words, multiplication of the quantities $h$ and $\nu _n $ is permitted by logic law of identity if $h$ is an oscillating quantity. Ref.: [1] T.Z. Kalanov, ``The correct theoretical analysis of the foundations of classical thermodynamics,'' Bull. of Pure and Applied Sciences, Vol. 26D, No 2 (2007), pp. 109-118.