Movimento bidirecional no transporte intracelular mediado por motores moleculares / Bidirectional movement in the intracellular transport mediated by molecular motors

AUTOR(ES)
DATA DE PUBLICAÇÃO

2007

RESUMO

In this work we present a theoretical model to describe aspects of the bidirectional movement performed by intracellular structures (vesicles, organelles, viruses etc, to which we refer here simply as "vesicles"), observed essentially at in vivo experiments. This nondifusive movement is characterized by rapid inversions in direction and is capable of creating concentration gradients of the transported cargo. The phenomenon of intracellular transport is known to be mediated by motor proteins (such as kinesins and dyneins) whose own unidirectional motion along protein laments is well characterized (kinesins moves to the plus-end direction while dyneins moves to the minus-end direction of the microtubules) and is usually modeled by a stochastic dynamics describing the behavior of a Brownian particle in the presence of a time dependent asymmetrical potential held (see Astumian [26], Adjari and Prost [22], Magnasco [23]). More recently, it appeared in the literature works attempting to describe the movement of interacting motor proteins, since it was realized that collective e_ects emerging from this situation may be relevant to the transport phenomena along microtubules. An approach to describe the behavior of such interacting motor particles is based on existing models for \driven di_usive systems". In particular, the continuum versions of the totally asymmetric exclusion processes" (TASEP) or the asymmetric exclusion processes" (ASEP) have been used to study the behavior of motors density along microtubules by analyzing the steady state solutions to the corresponding Burgers equation (Parmeggiani et al. [33]). Up to now, however, there are no attempts in the literature to approach in this context the questions related to the bidirecionality of vesicles transported by these interacting motors. The idea we present here is to associate this odd movement to the movement of shock waves presented by the transient solutions of Burgers equation for certain initial conditions. Accordingly, the vesicles accompanying (sur_ng) the shocks fronts would play the role of their microscopic analogous \particles of second class" introduced long ago in the literature [36], [37], [38] to study the kinetics of the shocks that are also present in the discrete versions of the TASEP and ASEP. In this regard, it is natural to think that the considered initial conditions, namely perturbations to the motor density with respect to a steady state, can be created in the real systems simply by the interaction with the vesicle. It might then be the case also to propose that the geometry of the vesicle plays an important role to direct its own movement within intracellular environment. This seems to be, for example, an attractive alternative for explaining aspects of virus movement inside the cell.

ASSUNTO(S)

bidirectional movement movimento bidirecional intracellular transport transporte intracelular motores moleculares molecular motors

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