Global bifurcations in the basins of attraction in noninvertible maps and economic applications

A class of globally coupled one dimensional maps is studied. For the uncoupled one dimensional map it is possible to Ž compute the spectrum of Liapunov exponents exactly, and there is a natural equilibrium measure Sinai-Ruelle-Bowen . measure , so the corresponding 'typical' Liapunov exponent may al

The behaviour of dissipative non-linear systems is studied in the instability region of the trivial (zero) solution. The study is motivated by the classical problem of stability of an initially flat elastic panel subjected to the combination of a supersonic gas flow and a quasistatic compression tha

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

Ninety percent of projected global urbanization will be concentrated in low income countries (United-Nations, 2004). This will have considerable environmental, economic and public health implications for those populations. Objective and efficient methods of delineating urban extent are a cross-secto

Management of river basins involves the making of informed choices about the desired levels of economic activities and ecosystem functioning in the catchment. Information on the economic and ecological effects of measures as well as their spatial distribution is therefore needed. This paper proposes