JP13 Chapter 13　Steady State and Degrowth Economics

Note that most of works on MVIs are traditionally de- voted to the case where G possesses certain strict (strong) monotonicity properties, which enable one to present various

Then, we prove the model admits periodic traveling wave solutions connect- ing this periodic steady state to the uniform steady state u = 1 by applying center manifold reduction and

Finally, we investigate existence of weak solutions in Lebesgue spaces (Theorem 5.7) and the decay of continuous solutions (Theorem 5.8). All presented results are important

[9, 28, 38] established a Hodge- type decomposition of variable exponent Lebesgue spaces of Clifford-valued func- tions with applications to the Stokes equations, the

Condition (1.2) and especially the monotonicity property of K suggest that both the above steady-state problems are equivalent with respect to the existence and to the multiplicity

We have introduced this section in order to suggest how the rather sophis- ticated stability conditions from the linear cases with delay could be used in interaction with

We formulated successive bifurcation conditions and illustrated the various flow behaviors and their steady-state attractors affected by the thermal field functions and

Existence and regularity of the RLC fractional diffusion model In this section we investigate the existence and regularity of the solution of the steady state RLC fractional