Period doubling and multifractals in 1-D interative maps

A new critical criterion of period-doubling bifurcations is proposed for high dimensional maps. Without the dependence on eigenvalues as in the classical bifurcation criterion, this criterion is composed of a series of algebraic conditions under which period-doubling bifurcation occurs. The proposed

The response of an isolated cardiac cell to a periodic stimulus has traditionally been studied in terms of the duration of the action potential (APD) immediately following each stimulus. The APD approach offers explanations of several experimental observations, including the stability of the so-call

Star products in symbolic dynamics of 1D quadri-modal maps are presented, the complexity of substitution rules is discussed besides their inherent cyclic and dual properties. Feigenbaum's metric universalities in bifurcations of periodn-tupling sequences are calculated by the new numerical method of

The levels with \(v \leqslant 14,27 \leqslant J \leqslant 57\) in the \((6 d)^{\prime} \Delta_{g}\) and \((7 d)^{\prime} \Delta_{g}\) Rydberg states of \(\mathrm{Na}_{2}\) have been observed using optical-optical double resonance (OODR) fluorescence excitation spectroscopy. The intermediate levels i