92 research outputs found
A Full Balance Sheet Two-modes Optimal Switching problem
We formulate and solve a finite horizon full balance sheet two-modes optimal
switching problem related to trade-off strategies between expected profit and
cost yields. Given the current mode, this model allows for either a switch to
the other mode or termination of the project, and this happens for both sides
of the balance sheet. A novelty in this model is that the related obstacles are
nonlinear in the underlying yields, whereas, they are linear in the standard
optimal switching problem. The optimal switching problem is formulated in terms
of a system of Snell envelopes for the profit and cost yields which act as
obstacles to each other. We prove existence of a continuous minimal solution of
this system using an approximation scheme and fully characterize the optimal
switching strategy.Comment: 23 pages. To appear in Stochastic
A Functional Hodrick Prescott Filter
We propose a functional version of the Hodrick-Prescott filter for functional
data which take values in an infinite dimensional separable Hilbert space. We
further characterize the associated optimal smoothing parameter when the
associated linear operator is compact and the underlying distribution of the
data is Gaussian
Mean-Field-Type Games in Engineering
A mean-field-type game is a game in which the instantaneous payoffs and/or
the state dynamics functions involve not only the state and the action profile
but also the joint distributions of state-action pairs. This article presents
some engineering applications of mean-field-type games including road traffic
networks, multi-level building evacuation, millimeter wave wireless
communications, distributed power networks, virus spread over networks, virtual
machine resource management in cloud networks, synchronization of oscillators,
energy-efficient buildings, online meeting and mobile crowdsensing.Comment: 84 pages, 24 figures, 183 references. to appear in AIMS 201
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